%Paper: hep-th/9210125
%From: Andreas Honecker <UNP06B@IBM.rhrz.uni-bonn.de>
%Date: Thu, 22 Oct 92 20:51:05 MEZ

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\begin{document}
\begin{titlepage}
\null   \begin{center}   \vskip 1cm
{\LARGE {\bf Multi-particle structure in the $\BZED_n$-chiral Potts models}}
\vskip 1.5cm     {\Large G.\ von Gehlen $\!{}^{*}$~and~
                         A.\ Honecker $\!{}^{**}$ }    \zeile{1}
{\large Physikalisches Institut der Universit\"{a}t Bonn \\
Nu{\ss}allee 12, D 5300 Bonn 1, Germany} \\    \zeile{3}   \end{center}
{\large \bf Abstract :}
We calculate the lowest translationally invariant levels of the
$\Zed_3$- and $\Zed_4$-symmetrical chiral Potts quantum chains,
using numerical diagonalization of the hamiltonian for
$N \leq 12$ and $N \leq 10$ sites, respectively, and extrapolating $\NIF$.
In the high-temperature massive phase we find that the pattern of the low-lying
zero momentum levels can be explained assuming the existence of $n-1$ particles
carrying $\Zed_n$-charges $Q\!=\!1, \ \dots, \ \! n-1$ (mass $m_Q$), and their
scattering states. In the superintegrable case the masses of the $n-1$
particles become proportional to their respective charges: $m_Q = Q m_1$.
Exponential convergence in $N$ is observed for the single particle gaps,
while power convergence is seen for the scattering levels.
We also verify that qualitatively the same pattern
appears for the self-dual and integrable cases.
For general $\Zed_n$ we show that the energy-momentum relations of the
particles show a parity non-conservation asymmetry which for
very high temperatures is exclusive due to the presence of
a macroscopic momentum $P_m=(1-2Q/n)/\phi$, where $\phi$ is the chiral angle
and $Q$ is the $\Zed_n$-charge of the respective particle. \vfill
\noindent
\noindent   BONN-HE-92-32        \hspace{88mm}  October 1992 \\
\noindent   hep-th/9210125 \\
${}^{*}$ \hspace*{1mm}   e-mail-address: unp02f@ibm.rhrz.uni-bonn.de \\
${}^{**}$  e-mail-address: unp06b@ibm.rhrz.uni-bonn.de
\end{titlepage}
\section{Introduction}     \par The $\Zed_3$-chiral
Potts model has been introduced in 1981 by Ostlund and Huse in order to
describe incommensurate phases of physisorbed systems \cite{Os81,Hu81}, e.g.
monolayer krypton on a graphite surface \cite{Ein}.
The phase structure of several versions of the model has been studied
by various methods: Mean field, Monte-Carlo, renormalization group,
transfer-matrix partial diagonalization and finite-size scaling of quantum
chains \cite{denis,sel,geh2,evr}. In the following we shall focus mostly
on the quantum chain version of the model. \par  In 1981-82 quantum chain
hamiltonians for the chiral Potts model were obtained \cite{MRR,cent}
via the $\tau$-continuum limit \cite{FrS,Kog}
from the Ostlund-Huse two-dimensional model.
These were not self-dual, so that the location of the critical manifold
was possible only by finite-size scaling \cite{geh2,ves}. In 1983
Howes, Kadanoff and DenNijs \cite{how} introduced a self-dual
$\Zed_3$-symmetrical chiral quantum chain, which, however, does not correspond
to a two-dimensional model with positive Boltzmann weigths. Therefore
in the self-dual model the immediate
connection to realistic physisorbed systems is lost, but its
peculiar mathematical structure has attracted much interest: Howes {\em et al.}
found that the lowest gap of the self-dual model is linear in the inverse
temperature, and subsequently in ref.\ \cite{geh} it was shown that the model
fulfils the Dolan-Grady integrability conditions \cite{dol}.
(now usually called "superintegrability" \cite{coy}). A whole series of
$\Zed_n$-symmetrical quantum chains has been defined, which satisfy the
superintegrability conditions \cite{geh}. The Dolan-Grady integrability
conditions have been shown to be equivalent to the Onsager algebra
\cite{ons,dav,rr}, which entails that all eigenvalues of the hamiltonian
have a simple Ising-type form. The well-known Ising quantum chain in a
transverse field is the $\Zed_2$-version of the superintegrable chiral Potts
models.
\par Much work has been done in the past few years in order to obtain
analytic expressions for the complete spectrum of the
$\Zed_3$-superintegrable model \cite{coy,ba1}. In the next Section we shall
quote some of these results. The aim of the present paper is not
to add to the analytic
calculations of the special superintegrable case, but rather to use numerical
finite-size analysis in order to investigate, how the integrable model is
embedded in the more general
versions of the chiral $\Zed_3$- and $\Zed_4$-models. We shall study the
low-lying levels of the excitation spectrum and investigate the possibility of
a particle interpretation.  \par
In the neighbourhood of conformal points of isotropic theories, very
simple particle patterns have been found by Zamolodchikov's perturbation
expansion \cite{zamo}, which is applicable to the non-chiral limit of
the chiral Potts-models. We shall follow these particle patterns by
varying the chiral angles, and try to find out which
special properties of the spectrum lead, for particular
parameter values, to superintegrability. Since for this purpose we have to
study the spectrum through a large probably non-integrable
parameter range, at present there is no alternative to numerical methods.
It turns out that even in those cases which can be solved analytically,
some basic features can be discovered rather easily through a numerical
calculation, because the exact formulae are quite involved.
\par The plan of this paper is as follows: In Sec.2 we start with the basic
definitions of the chiral Potts model for general $\Zed_n$-symmetry, which
then are specialized to the $\Zed_3$- and $\Zed_4$-cases.
Sec.3 collects some basic analytic results which are available for the generic
$\Zed_n$-symmetric model. In Sec.4 we give our detailed finite-size
numerical results which confirm the two-particle interpretation of the
low-lying spectrum of the self-dual version of the $\Zed_3$-model.
Sec.5 discusses the analogous results for the self-dual version of the
$\Zed_4$-model and shows that the low-lying spectrum is well described in terms
of three elementary particles. While up to this point, we consider
translationally invariant states only, in Sec.6 we present observations on the
energy-momentum dispersion relations of the elementary particles and the
effects of parity-violation on the spectrum. Finally, Sec.7 collects our
conclusions.

\section{The chiral $\ZED_n$-Potts quantum chain}
\par The chiral $\Zed_n$-symmetric Potts spin quantum chain \cite{geh} with $N$
sites is defined by the hamiltonian
\BEQ
H^{(n)} = -\sum_{j=1}^{N} \sum_{k=1}^{n-1} \left\{ \bar{\alpha}_k \, \sig_{j}^k
    + \la \, \alpha_k \, \Ga_{j}^k \, \Ga_{j+1}^{n-k} \right\}.    \label{H}
\EEQ
Here $\sig_j$ and $\Ga_j$ are $n\times n$-matrices acting at site $j$,
which satisfy the relations
\BEQ \sig_j\,\Ga_{j'} =\Ga_{j'}\,\sig_j~ \omega^{\delta_{j,j'}}, \hspace{18mm}
\sig_j^n=\Ga_j^n={\bf 1},\hspace{18mm}\omega =\exp(2\pi i/n).   \label{om} \EEQ
A convenient representation for $\sig$ and $\Ga$ in terms of diagonal and
lowering matrices, respectively, is given by
\BEQ  (\,\sig\,)_{l,m} = \delta_{l,m} \omega^{l-1},~~~~~~~~~~~~
 (\,\Ga\,)_{l,m} = \delta_{l+1,m}~~({\textstyle mod}~n). \label{sgr} \EEQ
We shall assume periodic boundary conditions: $\Ga_{N+1} = \Ga_1$.
\par
The model contains $2n-1$ parameters: the real inverse temperature $\la$
and the complex constants $\alpha_k$ and $\bar{\alpha}_k$. We shall only
consider the case of $H^{(n)}$ being hermitian:
$\alpha_k = \alpha_{n-k}^{\star}$
and $\bar{\alpha}_k = \bar{\alpha}_{n-k}^{\star}$.
For $n > 2$ and generic complex $\alpha_k$ and $\bar{\alpha}_k$, the
Perron-Frobenius theorem does not apply and the spectrum of $H^{(n)}$
may show ground-state level crossings.
$H^{(n)}$ commutes with the $\Zed_n$ charge operator
$\tilde{Q} = \prod_{j=1}^N \sig_j$.   The eigenvalues of $\tilde{Q}$ have the
form $\exp(2\pi i Q/n)$ with $Q$ integer. We shall refer to the $n$ charge
sectors of the spectrum of $H^{(n)}$ by $Q=0,\ldots,n-1$, respectively.
Parity is not a
good quantum number, but $H^{(n)}$ is translational invariant, so that
each eigenstate of $H^{(n)}$ can be labelled by its momentum eigenvalue $p$.
\par For $\alpha_k = \bar{\alpha}_k$ the model is self-dual
with respect to the reflection $\la \ra \la^{-1}$. If we choose \cite{geh}
\BEQ  \alpha_k = \bar{\alpha}_k = 1 - i \cot(\pi k/n)    \label{aint} \EEQ
then the model is "superintegrable" \cite{al2}, i.e. it fulfils the Dolan-Grady
\cite{dol}
conditions and therefore the $\la$-dependence of all eigenvalues $E(\la)$
of $H^{(n)}$ has the special Ising-like form \cite{dav,al2}:
\BEQ  E(\la) = a + b\la + \sum_j 4m_j\sqrt{1 +
 2\la\cos\theta_j +\la^2}.    \label{Isi}  \EEQ  Here $a, b$ and $\theta_j$
are real numbers. The $m_j$ take the values $m_j =-s_j,-s_j+1,\ldots,s_j$,
where $s_j$ is a finite integer. For details concerning formula (\ref{Isi}),
see \cite{dav,al2}.
\par Albertini {\em et al.} \cite{al2,au2} have obtained a spin chain of the
form (\ref{H}) with
\BEQ    \alpha_k = e^{i(2k/n-1)\phi}/\sin(\pi k/n),~~~~~~~
  \bar{\alpha}_k = e^{i(2k/n-1)\vph}/\sin(\pi k/n)           \label{alpha} \EEQ
\BEQ  \cos \vph = \la \cos \phi                         \label{int}   \EEQ
as a limiting case of an integrable two-dimensional lattice model. The
Boltzmann weights of their two-dimensional model do not have the usual
difference property \cite{au2} and satisfy a new type of
Yang-Baxter equations which involve spectral parameters defined on
Riemann surfaces of higher genus. So a quantum chain (\ref{H}) with
coefficients (\ref{alpha}), (\ref{int}) is integrable. The superintegrable
case is contained in (\ref{alpha}) for $\SD$.   \par
A number of analytic results is available for the superintegrable case.
Some of these will be reviewed in the next Section. Starting 1987, the
Stony-Brook-group has published a series of papers \cite{coy,al2,au2} which
give analytic calculations of the spectrum of the
$\Zed_3$-superintegrable quantum chain.
Recently, the completeness of the analytic
expressions for the levels of the superintegrable $\Zed_3$-model
has been shown by Dasmahapatra {\em et al.} \cite{DKCoy}.
\par   In the non-chiral limiting case $\NC$ of the hamiltonian (\ref{H}) with
coefficients (\ref{alpha}) we obtain the lattice version of the parafermionic
$\Zed_n$-symmetrical Fateev-Zamolodchikov-models $\WA$ \cite{fateev}.
These quantum chains are self-dual. At the self-dual point $\la=1$ and for
$\NIF$ they show an extended conformal symmetry
with central charge $c=2(n-1)/(n+2)$.
Exact solutions of these $\WA$-hamiltonian chains \cite{Al86,Alc,AlLi,FaLy}
have been obtained
through Bethe-ansatz techniques \cite{AlLi,Tsv88}. Very recently,
Cardy \cite{JC} has shown that a particular integrable perturbation of the
critical $\WA$-models leads to self-dual chiral Potts models.
\par  Since later we shall mostly study the $\Zed_3$- and $\Zed_4$-versions of
(\ref{H}), we now list how $H^{(n)}$ specializes for these cases. If we
keep insisting on hermiticity, $H^{(3)}$ depends on three parameters apart
from a normalization \cite{how}. In accordance with (\ref{alpha}) we write:
\BEQ    H^{(3)} = -\frac{2}{\sqrt{3}} \sum_{j=1}^{N} \left\{
 e^{-i\vph/3} \sig_{j} + e^{+i\vph/3} \sig^{+}_{j} + \la \left(
 e^{-i\phi/3} \Ga_{j}\Ga^{+}_{j+1} + e^{+i\phi/3}
 \Ga^{+}_{j}\Ga_{j+1} \right) \right\}.               \label{H3}      \EEQ
Here $\sig_{j}$ and $\Ga_{j}$ are $3\times 3$-matrices acting at site $j$:
\BEQ   \sig_j = \left( \BAR{ccc} 1&0&0\\0&\omega&0\\0&0&\omega^2
       \EAR \right)_{j},  \hspace{1cm} \Ga_j =
 \left( \BAR{ccc} 0&0&1\\1&0&0\\0&1&0 \EAR \right)_{j}  \label{sG}    \EEQ
and  $\omega = \exp(2\pi i/3)$.
We shall consider $0 \leq \la \leq \infty$;
$0 \leq \phi,\vph \leq \pi$ (for reflection properties of $H^{(3)}$ see
\cite{how}).        In order not to get
lost in three-dimensional diagrams, often we shall concentrate on
two cases in which there is one relation between the three parameters:
the integrable case (INT), where the three parameters are related by
eq.(\ref{int}), and the self-dual case (SD) where ~$\phi = \vph$. For generic
$\vph$ and $\la$,
the self-dual case is not known to be integrable. The SD case contains
the non-chiral limit $\NC$, in which we obtain the ${\cal WA}_2$-model, which
coincides with the $\Zed_3$-standard Potts model.
It has a second-order phase transition at $\la=1$, which for
$\NIF$ is described by a conformal field theory with central charge
$c=4/5$ \cite{Dot,FQS,GRR}.
\par The phase diagram of the SD-chiral $\Zed_3$-model shows four different
phases \cite{al2,GK,gehlenz3}, see Fig.~1: for small chiral angle $\vph$ we
have
oscillating massive high- and low-temperature phases at $\la<1$ and $\la>1$,
respectively, except for a small incommensurate phase interval around $\la =1$.
The two incommensurate phases appear centered around $\la=1$ and get wider
in $\la$ as $\vph$ increases.      \par The
hermitian $\Zed_4$-symmetric $H^{(4)}$ contains five parameters (again apart
from a normalization), which we denote by $\la$, $\phi$, $\vph$, $\beta$ and
$\tilde{\beta}$:    \BEQ
H^{(4)} = -\wt \sum_{j=1}^N \left\{
    e^{-i\vph/2}\sig_j +\beta\sig_j^2 + e^{i\vph/2}\sig_j^3 \right.
    + \la \left. \left\lbrack e^{-i\phi/2}
\Ga_j\Ga_{j+1}^3 +\tilde{\beta}\Ga_j^2\Ga_{j+1}^2 +e^{i\phi/2}\Ga_j^3 \Ga_{j+1}
    \right\rbrack \right\}        \nonumber       \\     \label{H4}
 \vspace*{3mm}\EEQ
where $\sig_j$ and $\Ga_j$ are now $4\times 4$-matrices
obeying (\ref{sgr}). For simplicity, and in agreement with (\ref{alpha}),
we shall consider only the case $\beta = \tilde{\beta}=1/\wt$, so that we have
again two parameters for the non-self-dual integrable version, and two
parameters $\la$ and $\phi=\vph$ for the self-dual case. For $\NC$ and $\beta=
\tilde{\beta} =1/\sqrt{2}$
the hamiltonian (\ref{H4}) coincides with that of the Ashkin-Teller
quantum chain \cite{kohmoto} for the special value $h= 1/3$ in the notations
of \cite{baake}. From the phase diagram of the Ashkin-Teller quantum chain we
know that in the case $h=1/3$ there is just one critical point at the self-dual
value $\la=1$. This is described by the ${\cal WA}_3$
rational model at $c=1$, which has an extended conformal symmetry with
fields of spin three and four.

\section{General results for the energy gaps of the $\ZED_n$-chiral Potts
model}
\par   Apart from the exact results for the non-chiral limiting case just
mentioned at the end
of the last section, there are many exact results for the superintegrable
case (\ref{H}), (\ref{aint}) (equivalent to (\ref{alpha}) with $\SD$): The
$\Zed_2$-case, which is the standard Ising quantum chain in a transverse field,
has been solved in refs.\ \cite{FrS,Kog,Pf}. Recently, as mentioned above,
also the complete spectrum of the $\Zed_3$-superintegrable quantum chain has
been calculated analytically \cite{DKCoy}. We shall first collect some
important partial results which are available for {\em generic} $\Zed_n$. \par
In order to state these, we shall define all gaps with respect to the lowest
$Q\!=\!0,\, p\!=\!0$-level, which we denote by $E_0(Q=0,p=0)$. Note that
$E_0(Q=0,p=0)$ is not necessarily
the ground state of the hamiltonian. Depending on the parameters chosen, the
ground state may be in any charge sector and may even
have non-zero momentum $p$, since the model contains incommensurate phases.
Nevertheless, in this section let us consider only gaps between
$p=0$-levels.
\par By $\Delta E_{Q,i}$ we denote the energy difference
\BEQ  \Delta E_{Q,i} = E_i(Q,p=0) - E_0(Q=0,p=0)        \label{gap} \EEQ
where $E_i(Q,p=0)$ is the {\em i}-th level $(i = 0,1,\ldots)$ of the charge
$Q$, momentum $p=0$-sector. In the $\Zed_2$-(Ising)-case of (\ref{H}) it is
well-known that the lowest gap $\Delta E_{1,0}$ has the
remarkable property of being linear in $\la$:
\BEQ  \Delta E_{1,0} = 2(1-\la).   \label{1} \EEQ
In 1983 Howes, Kadanoff and DenNijs \cite{how} found that the same is true
also for the self-dual version of the
$\Zed_3$-chiral Potts model, eq.(\ref{H3}) at the special chiral angle
$\SD$. They discovered this by calculating the high-temperature
expansion up to 10th order in $\la$, finding that for these special angles
all higher coefficients in the expansion, starting with the coefficient of
$\la^2$, are zero.
\par In \cite{geh} it was the desire to generalize (\ref{1}) so as to
obtain for {\em all}~ $\Zed_n$ and {\em all}~ $Q$ the simple formula
\BEQ \Delta E_{Q,0} = 2 Q(1-\la) \hspace{15mm} (\la<1,~~Q=1,\ldots,n-1)
                                                      \label{Qa} \EEQ
which lead to choose the values (\ref{aint}) for the coefficients $\alpha_k$
and $\bar{\alpha}_k$ and to find the superintegrability of the model.
In \cite{geh}
the linearity of the gaps was checked through numerical calculations.
The validity of (\ref{1}) for the superintegrable $\Zed_3$-model to all orders
of a perturbation expansion in $\la$ was first shown
in \cite{au2} using a recurrence formula. Later, using analytic methods,
Albertini {\em et al.} \cite{al2,au2} for the superintegrable $\Zed_3$-case,
and then Baxter \cite{ba1} for all superintegrable
$\Zed_n$, have calculated the lowest gaps of the
hamiltonian eq.(\ref{H}) in the thermodynamic limit $N \ra \infty$.
\par Using the definition (\ref{gap}), Baxter's analytic results for the
superintegrable model can be summarized in the form:
\BEA  \Delta E_{Q=1,0} & = & 2 (1-\la) \hspace{17mm} (\la < 1)
      \label{q1} \\   \Delta E_{Q=0,1}
    & = & 2 n (\la-1) \hspace{14mm} (\la > 1)~. \label{q2}    \EEA \par  We now
attempt to interpret the spectrum of (\ref{H}) and the gap formula (\ref{Qa})
in terms of particle excitations. Consider first eq.(\ref{Qa}). This would be
obtained if the model contained only one single particle species with mass
$m_1 = 2(1 -\la)$ and $\Zed_n$-charge $Q\!=\!1$. The lowest
$\Delta Q \neq 1$-gaps would then arise from the thresholds of the scattering
of $Q$ of these $Q\!=\!1$-particles.
\par    In order to check whether it is correct to describe the spectrum
at $\SD$ this way, or whether more fundamental particles must be present,
we shall study the zero momentum part of
the spectrum as a function of the chiral angles, when these
move away from the special superintegrable values. We shall start considering
the spectrum down at $\NC$, where we know the particle structure from the
thermally perturbed $\WA$-models and move then towards higher chiral angles.
\par The scaling regime around $\la=1$ of the $\WA$-models is known to
contain $n-1$ particle species, one in each of the non-zero
$\Zed_n$-charge sectors $Q=1,\ldots,n-1$. The ratios of their masses $m_Q$
are \cite{koeb}: \BEQ \frac{m_Q}{m_1}=\frac{\sin{(\pi Q/n)}}{\sin{(\pi/n)}},
\hspace{1cm} (Q=1,\ldots,n-1).  \label{koeb}  \EEQ      The particles
with masses $m_Q$ and $m_{n-Q}$ form particle-antiparticle-pairs.
Near $\la=1$ the mass scale $m_1$
behaves as  \BEQ  m_1 \sim (1-\la)^{(n+2)/2n}. \EEQ
as it follows from the conformal dimension $x=4/(n+2)$ of the leading
thermal operator of the $\WA$-model.
Looking at (\ref{koeb}), we can see that in the scaling $\WA$-model all
particles are {\em isolated} non-degenerate levels in the spectrum of
their respective charge sector. E.g. for the particle with mass $m_Q$ to be
on the scattering threshold of $Q$ of the lightest particles with mass $m_1$,
we must have $Q \sin{(\pi/n)}= \sin{(Q\pi/n)}$, which is possible only
in the limit $n \ra \infty$. Similarly, e.g. for $n\geq 5$, the $m_4$-particle
is below the threshold $m_2 + m_2$, and approaches this threshold only as
$n \ra \infty$.
\par We now want to follow these single particle levels in $\la$ to outside
the scaling region and as functions of the chiral angles
$\vph$ and $\phi$, in order to get information about what will happen at
$\vph,\phi \ra \pih$. Since near $\la=1$ the gaps can only be calculated
numerically for generic $\phi,\vph$ (we shall report such numerical
calculations
later), it is most simple to consider first the
small-$\la$-expansion for the lowest $p=0$-gaps of the hamiltonian (\ref{H}).
Using the coefficients in the form (\ref{alpha}), but not assuming
(\ref{int}), to first order in $\la$ we get:
\BEA  \Delta E_{Q,0}\!\!&\!=\!&\!\!  \left( \SK \bar{\alpha}_k(1-
 \omega^{Qk}) \right)~~~-\la(\alpha_Q + \alpha_{n-Q}) + \ldots   \nonumber \\
  &\!=\!&\!\! \left(\SK \frac{2 \sin{(\pi kQ/n)}}{\sin{(\pi k/n)}}
     \sin\left((\frac{2k}{n}\!-\!1)\vph+\frac{\pi kQ}{n}\right) \right)
-\frac{2\la}{\sin{(\pi Q/n)}}\cos\left( (\frac{2Q}{n}\!-\!1)\phi\right)
+\ldots   \nonumber    \\  & &  \label{ST}                  \EEA
Eq.(\ref{ST}) fulfils the CP-relation      \BEQ
\Delta E_{Q,i}(\la,\vph,\phi) = \Delta E_{n-Q,i}(\la,-\vph,-\phi)
\hspace*{12mm} (i=0,1,\ldots) \label{CPH} \EEQ     In the sum in
(\ref{ST}), the pairs of terms for $k$ and $n-k$ are equal.
\par For $\vph=0$ and for $\vph=\pih$
it is easy to simplify eq.(\ref{ST})
using the trigonometrical sum formulae \cite{RYG,HeLa}
\BEA  \SK \sin{(k\pi/n)} &\!=\!& \cot{\frac{\pi}{2n}}, \hspace*{1cm}
 \SK\sin^2{(k\pi Q/n)}~=~n/2, \nonumber \\ \SK\sin^3{(k\pi/n)}&\!=\!&
\frac{1}{4}\left(3\cot{\pn}-\cot{\frac{3\pi}{2n}}\right) \hspace*{8mm} etc.
\label{sumf} \EEA       For $\NC$ we obtain:      \BEQ \Delta E_{1,0} =
 2\cot{\pn}-\frac{2\la}{\sin{(\pi/n)}}+\ldots \label{W1} \EEQ
and \BEQ \Delta E_{2,0}=2\cot{\pn}+2\cot{\frac{3\pi}{2n}} - \frac{2\la}
 {\sin{(2\pi/n)}} +\ldots  \label{WAS}  \EEQ         We identify
\BEQ m_Q \equiv \Delta E_{Q,0}, \label{WW} \EEQ and conclude from (\ref{koeb})
and (\ref{WAS}) that the mass ratio $m_2/m_1$ must decrease when going from the
scaling region $\la \approx 1$ to $\la=0$. E.g. for $n=4$, eq.(\ref{koeb})
gives $m_2/m_1 = \sqrt{2}$, whereas at $\la=1$  from (\ref{W1}) and (\ref{WAS})
we get $m_2/m_1 \approx 1.17157$. Observe, that also according (\ref{WAS}),
$m_2$ stays below the $Q=2$-sector threshold at $2 m_1$, and generally, the
lowest levels of each charge sector remain isolated down to $\la=0$.
\par We now look how the perturbation formula (\ref{ST}) behaves in the
superintegrable limit. Inserting $\SD$,
we obtain  \BEQ \Delta E_{Q,0}=2\SK\sin^2{(\pi kQ/n)} -\SK\sin{(2\pi kQ/n)}
 \cot{(\pi k/n)} -2\la +\ldots  \label{zw}  \EEQ
The sums can be calculated explicitly, leading to the simple result
\BEQ \Delta E_{Q,0} = 2(Q -\la) + O(\la^2). \label{fasu}  \EEQ
Comparing (\ref{fasu}) to (\ref{Qa}), we have an apparent contradiction, since
in (\ref{fasu}) the factor $Q$ is {\em not} multiplying $\la$.    \par
Our detailed non-perturbative numerical analysis of the spectrum
for the $\Zed_3$- and $\Zed_4$-cases (to be discussed
in the next Section) shows that the single particle levels vary smoothly
when increasing $\vph$ and $\phi$ starting from $\NC$.
As soon as the chiral angles become non-zero, the
particle-antiparticle-pairs $m_Q$ and $m_{n-Q}$ split: $m_1$
decreases and $m_{n-1}$ increases as $\vph,\phi$ increase. Approaching
$\SD$, $m_2$ becomes twice as large as $m_1$, so that at $\SD$, $m_2$ sits just
at the $m_1+m_1$-scattering threshold. So, our non-degenerate perturbation
theory should break down for the channel $Q=2$ at
$\vph, \phi \ge \pih$ \cite{how}, and, indeed we see this in the calculation of
the $\la^2$-contribution to $\Delta E_{2,0}$. Because for general $\Zed_n$ the
explicit expression for the $\la^2$-term in (\ref{ST}) is too involved, here we
specialize and give the result for the self-dual $\Zed_3$-case. We find
\BEQ  \Delta E_{1,0}(\vph,\la) = 4 \sin\frac{\pi -\vph}{3} -
 \frac{4\la}{\sqrt{3}}\cos\frac{\vph}{3} + \la^2 f(\vph) +O(\la^3).
\label{Q1} \EEQ
where \BEQ f(\vph) =-\frac{1}{3\cos\vph} \left(
 2 \sin {\pi - 4 \vph \over 3}
- 4 \sin {\pi + 2 \vph \over 3} + 3\sqrt{3} \right).  \label{fph} \EEQ
$f(\vph)$ is smooth at $\vph=\pih$ (we have $f(\pih)=-\sqrt{3}/2$),
but it is singular for $\vph \ra -\pih$. Applying (\ref{CPH}), from (\ref{Q1})
we get $\Delta E_{2,0}$:
\BEQ  \Delta E_{2,0}(\vph,\la) = 4 \sin\frac{\pi +\vph}{3} -
\frac{4\la}{\sqrt{3}}\cos\frac{\vph}{3} + \la^2 f(-\vph)
+O(\la^3).\label{Q2}\EEQ
While formula (\ref{Q1}) for $\Delta E_{1,0}$ can be used in the whole range
$0 \le \vph < \pi$ (considering non-negative $\vph$), the corresponding
expression (\ref{Q2}) is valid only for $0 \le \vph < \pih$ and diverges at
$\vph=\phi=\pih$.
The $\la^2$-contribution to the analogous $\Zed_4$-formula
will be given in Sec.5. It shows a similar divergence in the expression
for $m_2$.
\par Since (\ref{Q2}) breaks down at $\vph = \pi/2$, we need further
information in order to decide whether the $Q=2$-particle survives
at and beyond $\vph = \pi/2$. Then this will clarify the question whether the
single particle picture described above makes sense at the superintegrable
line.

\section{Finite-size numerical calculation of the low-lying spectrum
of the $\ZED_3$-chiral quantum chain}
\subsection{Convergence exponent $y$}
\par We shall now describe several detailed numerical checks of the
two-particle picture from
the spectrum in the high-temperature massive region of the $\Zed_3$-model.
For this purpose, we have calculated numerically the eight lowest $p=0$-levels
of each charge sector of the hamiltonian
(\ref{H3}) for $N = 2,\ldots,12$ sites. While in the last Section, we
concentrated on the single particle levels, now we shall also look into the
scattering states and check, whether the corresponding thresholds appear
as expected.
\par   For chains of up to
$N=8$ sites we are able to diagonalize $H^{(3)}$ exactly. Using
Lanczos diagonalization we can use up to $N=12$ sites. We shall
always give the results for periodic boundary conditions, but we have
also partially checked the results with twisted boundary conditions.
The extrapolation to $N \rightarrow \infty$ is done using both the
Van-den-Broeck-Schwartz algorithm \cite{vbs} and rational approximants
\cite{bust} (for details on the application to quantum chains and
error estimation see \cite{HS}).
\par Neighbouring higher levels sometimes cross over
as functions of the number of sites $N$, so that for these there is a danger
of connecting wrong sequences. This can be controlled by calculating the
leading power of the convergence, $y$, defined by
\BEQ   \Delta E(N) - \Delta E(\infty) = N^{-y} + \ldots     \label{y1} \EEQ
and checking the smoothness of the approximants $y_N$:
\BEQ  y_N = - {\textstyle
 \ln (\frac{\Delta E(N)-\Delta E(\infty)}{\Delta E(N-1)-\Delta E(\infty)})
/ \ln (\frac{N}{N-1}) } \label{y2} \EEQ
In (\ref{y1}) and (\ref{y2}), $\Delta E(N)$ is a gap $\Delta E_{Q,i}$
calculated for $N$ sites.
\par   The calculation of $y_N$ is also very useful for distinguishing between
single particle levels and two- or more particle scattering states:
For single particle levels we expect
\BEQ   \Delta E(N) - \Delta E(\infty) = \exp(-N/\xi) +\ldots \label{y3} \EEQ
i.e.\ exponential convergence in $N$ ($\xi$ is a correlation length),
so that for these the $y_N$ should increase very fast with $N$.
In contrast to this, for two-particle states we should have a power behaviour
in $N$, more precisely, we should have
$\lim\limits_{N\rightarrow\infty} y_N = 2$.
\subsection{The spectrum for the superintegrable case $\vph = \pi/2$}
We first discuss our numerical results for
the $\Zed_3$-superintegrable case $\phi = \vph = \pi/2$.
Table~1 lists results for 16 low-lying gaps for $\la = 0.5$
in the high-temperature regime, where from (\ref{1}) we know that
$m_1 \equiv \Delta E_{Q=1,0} = 1$. As we have checked by repeating the
calculation for several other values of $\la<1$, this value $\la=0.5$
is not special regarding the structure of the spectrum. However, there is
the nice feature that because of (\ref{Qa}) for this $\la$ the gaps
should approach integer values in the limit $\NIF$.
\par  In the $Q=1$-sector we see an isolated lowest state at
$m_1 = 2(1-\la)$ followed by a bunch of levels at $4m_1$. Looking into Table~2
which gives the convergence with $N$ as parametrized by $y$ according
to (\ref{y1}), we see that indeed the $m_1$-level ($Q\!=\!1$; column $i=0$)
shows exponential convergence,
whereas the levels $Q\!=\!1$; $i\!=\!1$, $2$ converge as $N^{-3}$ and $N^{-2}$,
respectively. This indicates that the $i=1$-level is due to 3-particle
($m_1+m_1
+m_1$)-scattering, and the $i=2$-level due to
2-particle ($m_2+m_2$)-scattering as written in the bottom line in Table 1.
\par The $Q\!=\!2$-sector shows no isolated ground state, but starts with a
bunch of levels around $\Delta E =2$. There is strong evidence for
another bunch around $\Delta E =5$,
of which Table 1 shows just the first level. The convergence for the further
$\Delta E =5$-levels is poor and we do not give the numbers.
A clue to the nature of the $\Delta E =2$-levels is found through their
convergence for increasing $N$: Table 2 shows clearly that the level labelled
$Q\!=\!2; \ i\!=\!0$ has an $N$-dependence which drastically differs from that
of the other levels, indicating that this is the
level of a single particle with mass $m_2 =4(1-\la)$
(we have checked the $\la$-dependence repeating the calculation for six
other values of $\la$). So, we can answer the question posed at the end of the
last Section: The $m_2$-level can be clearly seen in the superintegrable case,
although it lies at the edge of the scattering threshold.
The power-behaved $Q=2$-states at $\Delta E=2$ should then be interpreted as
$m_1 +m_1$-states. The level $Q=2; \ i=5$ may be $m_1 +m_2 +m_2$, which has the
correct total $\Zed_3$-charge $Q=2$.
\par The pattern at $Q=0$, $\Delta E=3$ is as expected by this picture: There
should be $m_1 +m_2$-states and $m_1 +m_1 +m_1$-states, both distinguished
by different values of $y$, as observed in Tables 1 and 2.
\par For other values of $\la$ ranging from $\la = 0.2$ to $\la = 0.8$
we find precisely the same structure. Not surprisingly, above $\la =0.8$ the
convergence with respect to $N$ is getting poor, since the relevant mass scale
$m_1$ is vanishing as $\la\ra 1$ and so at $\la=0.8$ it is already quite small.
\subsection{The spectrum off the superintegrable line}
\par After having found a simple two-particle pattern in the superintegrable
case, we now check how this structure gets modified for $\vph, \phi \neq \pih$.
In order not to vary too many parameters,
we consider only the INT and SD cases defined at the end of Sec.2.
For the INT-case explicit formulae for the spectrum are not yet available
(for some first attempts, see \cite{roan}).
For the SD-case there may be no integrability at all. So, for the following,
presently there is no alternative to our numerical or perturbative methods.
\par We start with the SD case. In  Sec.3 we discussed already the perturbation
expansion of the lowest gaps to order $\la^2$. This indicated that,
increasing $\vph$ from
the Potts-value $\vph=0$ to $\vph = \pi/2$ for fixed $\la< 1$ the mass
$m_1$ decreases and $m_2$ increases until for $\vph=\pi/2$
we reach the value $m_2/m_1=2$. Above $\vph=\pi/2$
we then should have $m_2/m_1 > 2$ which makes it difficult to isolate the
$Q=2$-particle in the $m_1 +m_1$-continuum (in case it is still there at all).
Fig.2 shows the different patterns
which we expect in the three charge sectors for $\vph <\pi/2$ (left
hand side) and for $\vph > \pi/2$ (right). The extrapolation of the
finite-size numbers reported in
Table~3 confirms all details of these expected patterns. For
$\vph =2\pi/3$, among the three lowest $Q\!=\!2$ levels at $\Delta E = 2m_1$
we see no exponentially converging level. For $\vph > \pi/2$ all thresholds are
determined by $m_1$ alone, these are $3m_1$, $4m_1$ and $2m_1$ for $Q=0$, $1$,
$2$-sectors, respectively. \par In order to see, whether the $Q\!=\!2$-particle
survives in the $\vph > \pi/2$-region, we have to look for more and higher
levels. For {\em small} $\la$ we know from eq.(\ref{Q2}) (supposing this to be
still valid) where to search for $m_2$ at $\vph >\pi/2$, and so we have looked
slightly above the superintegrable line at $\vph = 7\pi/12$, $\la\leq 0.25$
among the 8 lowest levels for a fast converging one. Indeed, as it is shown in
Table~4, the level $i=6$ of the Table converges much faster than its
neighbours.
So, it is a good candidate for the $m_2$-level. However, with increasing
$\la$ this convergence diminishes quite fast
and an even/odd-$N$ hopping takes over. This may be due
to an increasing instability of the $m_2$-particle.
      \par  For $\vph <\pi/2$ the threshold in the $Q=0$-sector
depends also on $m_2$, being $m_1 +m_2$. The left column of Table 3 shows
that the
numerical values for the various thresholds come out very well and that e.g.
$m_2/m_1 = 1.47755$ at $\vph=\pi/4$ and $\la=0.5$. Unfortunately, the
determination of the corresponding values for $y$ is quite unsafe, since
for $\vph\neq\pih$ we have no exact values for $\lim\limits_{\NIF}\Delta E_i$
available as we had in the superintegrable case from (\ref{Qa}).
So the results we obtain for the $y_N$ depend strongly on the very unprecise
extrapolated results which are used for $\Delta E_i(\infty)$.
         \subsection{The integrable case for $\vph \neq \pi/2$}  \par
Turning now to the integrable case INT, our data in Table 5 show
the same pattern as in the SD case, only the convergence is less good
(for the sake of brevity we have omitted the finite-size data). It is
not clear whether the $\Delta E_{Q=2,0}$-level converges exponentially at all.
This result is somewhat surprising, because one might have expected a more
clear particle behaviour in the integrable case. We recall that nothing
is known about the integrability of the general SD case.
%converging level visible in the $Q=2$-sector.
\par
There is not much difference between the SD-case Table 3 and the INT-case
Table 5. E.g. observe that in the right hand part of Table 5, which gives
an example for chiral angles above the superintegrable value,
the low-lying gaps come out clearly as integer multiples of the single scale
$m_1$, as it is expected for threshold values if $m_2 > 2m_1$.
The numerical precision is not very good because in the neighbourhood of the
incommensurate phase the finite-size approximants to e.g.\ $m_1$
first fall with $N$ and then rise again,
a property which is not easy to handle by usual extrapolation procedures.
\par    Apart from the just mentioned non-monotonous behaviour of the gaps
for increasing $N$,
the onset of the IC-phase is not felt in our study of the
$p=0$-levels even at $\vph = \phi = 5\pi/6$, $\la =0.5$. For still larger
angles, it becomes difficult and then practically impossible to arrange the
gaps for various $N$ into plausible sequences. Anyway, it is already
surprising that for $\vph = \pi/2$ and higher,
the low $p=0$-gaps do not seem to take any notice of the incommensurate
phase boundary, and vanish smoothly for $\la \ra 1$.
\par In the low-temperature regime $\la>1$ the pattern of the lowest levels
is the same in all three charge sectors: As expected, in the limit $\NIF$ the
ground state is three-fold degenerate (one isolated level in each charge
sector). Above the ground state we find for $\vph < \pi/2$ a gap which
is $\la( m_1(\la^{-1}) + m_2(\la^{-1}))$. Then we see
a quite dense sequence of levels starting
after a gap of $3\la m_1(\la^{-1})$ (the same gap in all three charge
sectors). If we would have normalized $H^{(3)}$ including a factor $\sqrt{\la}$
in the denominator of (\ref{H3}), the gaps would be just the same as those
in the $Q=0$ sector at the duality reflected value of
$\la$. This is a generalization of
Baxter's result (\ref{q2}) for the superintegrable case to $\vph<\pih$.

\section{Perturbative and finite-size numerical results for the
spectrum of the chiral $\ZED_4$-quantum chain}
\par In the last section we have reported our numerical evidence for a
two-particle picture of the spectrum of the off-critical chiral $\Zed_3$-Potts
quantum chain.
In this Section we shall show analogous numerical evidence
for a three-particle structure in the high-temperature regime of
the chiral $\Zed_4$-Potts quantum chain. \par We start giving
the high-temperature expansion of the lowest gaps of the self-dual
$\Zed_4$-quantum chain up to order $\la^2$. It reads explicitly:
\BEQ  \Delta E_{1,0} = 2 (1 + 2 \sin {\pi -2\vph \over 4} )
   - 2\la \sqrt{2} \cos(\vph/2) + \la^2 g(\vph) + \ldots   \label{z4a} \EEQ
\BEQ  \Delta E_{2,0} = 4 \sqrt{2} \cos(\vph/2)
                 - 2 \la + \la^2 h(\vph) + \ldots    \label{z4b}  \EEQ
\BEQ  \Delta E_{3,0} = 2 (1 + 2 \sin {\pi +2\vph \over 4} )
   - 2\la \sqrt{2} \cos(\vph/2) + \la^2 g(-\vph) + \ldots   \label{z4c} \EEQ
where $g$ and $h$ are the following functions:
\BEQ  g(\vph) =  \frac{1+\sqrt{2}\sin{(\vph/2)}}{2\sin{((2\vph+\pi)/4)}}
 +\frac{4\sin^2\vph +5\sin{\vph}-8\sqrt{2}\cos{(\vph/2)}-1}{4\sqrt{2}\cos{\vph}
  \cos{(\vph/2)}}      \EEQ
\BEQ h(\vph)=-\frac{2}{\cos{\vph}}
 \left(1-\sqrt{2}\cos{(\vph/2)} +2\cos^2{(\vph/2)} \right) \EEQ
The function $h(\vph)$ is singular for $\vph \ra \pih$, similarly, $g(\vph)$
is singular for $\vph \ra -\pih$. Of course, (\ref{z4c}) follows from
(\ref{z4a}) by a CP-transformation, see (\ref{CPH}). At $\NC$ the sectors
$Q=1$ and $Q=3$ are degenerate.   \par   At $\vph=5\pi/6$ and $\la=0$,
according to (\ref{z4a}) the gap $\Delta E_{1,0}$ vanishes, and above
this value of $\vph$ the ground state of the system is in the $Q=1$-sector.
This feature is due to the particular
choice $\beta=1/\sqrt{2}$ which we made after (\ref{H4}).
If we consider more general $\beta$, then this ground-state level
crossing moves to $\vph=\pi/2 + 2\sin^{-1}(\beta/\sqrt{2})$. So, for
$\beta\ge 1$ the ground state remains in the sector $Q=0$ up to $\vph=\pi$.
\par   For $\vph$ above its superintegrable value $\vph=\pih$ (with
$\beta=1/\sqrt{2}$) the scattering thresholds in all sectors are determined
by $m_1\equiv \Delta E_{1,0}$ alone, and
the "single-particle gaps" eqs.(\ref{z4b}) and (\ref{z4c}) move above the
scattering thresholds in the sectors $Q=2$ and $Q=3$, respectively. This
is quite analogous to what happened in the $Q=2$-sector of the $\Zed_3$-model.
\par
For all $\la>0$ the $Q=2$-gap is larger than both the $Q=1$- and $Q=3$-gaps.
For small values of $\la$ both $\Delta E_{1,0}$ and $\Delta E_{2,0}$
decrease with increasing $\vph$, while $\Delta E_{3,0}$ grows.
At $\vph=\pi/2$ the gaps are integer-spaced.
\par The high-temperature-expansion is reliable for small $\la$ and the lowest
levels only. So, for larger values of $\la$, we have calculated the six lowest
$p=0$-levels of each charge sector for the hamiltonian (\ref{H4}) numerically.
In the $\Zed_4$-case we are able to handle up to $N=10$ sites only.
Correspondingly, the extrapolations are less precise than in
the case of $\Zed_3$.                                     \par  First, we
present our results for some low-lying levels in the spectrum for the
superintegrable case of (\ref{H4}): $\SD,~ \beta=\tilde{\beta}=1/\sqrt{2}$.
Table 6 contains the results at $\la=0.5$, where from (\ref{Qa}) we should
have $m_1 = 1$, so that we expect the gaps for $\NIF$ to
approach simple integers. Indeed, this comes out well from our numbers.
As before, we have checked for four other values of $\la$ that
otherwise there is nothing special about choosing $\la = 0.5$.
\par In each of the $Q\neq 0$-sectors we see one level which shows very fast
convergence with $N$, and we identify this with the single-particle
state of mass $m_Q = Q$.       \par
In the charge sector $Q=0$ we can evaluate the four lowest gaps precisely
enough to assign them to $\Delta E = 4$. There should be four different types
of scattering states: $m_1\!+\!m_1\!+\!m_1\!+\!m_1$,~~$m_1\!+\!m_1\!+\!m_2$,~
{}~$m_2\!+\!m_2$ and $m_1\!+\!m_3$. While the exponents determine the first two
types, we would have to move away from $\SD$ in order to
distinguish the two latter states.
In the sector $Q=1$ we
see two excited states in addition to the $m_1$-particle state. They could
be one three-particle- and one two-particle scattering-state, both with
$\Delta E=5$. This is compatible with the expected states $m_1\!+\!m_2\!+\!m_2$
and $m_2\!+\!m_3$. \par The numerical convergence of the scattering levels
and the possibility of ordering the levels into
clear sequences in $N$ gets worse if we consider the sectors $Q=2$ and $Q=3$.
In the bottom line of Table 6 we give a few quite safe assignments.
\par
We now look numerically, how this particle pattern gets modified if we choose
values of the parameters $\phi\ne\pi/2$, $\vph\ne\pi/2$ for which no analytic
results are available.
In \mbox{Table 7} we have collected the first few lowest
energy gaps for three choices of the parameters.
\par   First, we look at values of $\phi = \vph < \pi/2$.
For $\phi = \vph = \pi/4$ (which is half-way to the $\cal W$-point)
and $\la = 0.5$ the masses of the $m_2$- and
$m_3$-states are clearly below the scattering thresholds and the remaining
levels can excellently be explained as multi-particle states. In the
charge-sector $Q=2$ there is one state with $\Delta E = 4.6$ which
seems to be unexplained by this pattern. However, the extrapolation
$\NIF$ is quite delicate and therefore the errors may be
too small. Thus, this state could also be a $2 m_1$-state.
\par  If we choose $\phi=\vph>\pi/2$, the low-lying levels of the
spectrum are given by $m_1$ alone. However, for small values of $\lambda$
and $\phi$ slightly above the super-integrable line the $Q=2$-charge-sector
shows a high level that converges very fast and is not an integral multiple
of $m_1$. The middle part of table 7 contains the explicit values for
$\phi = \vph = 3\pi/5$ and $\la = 0.10$. Here, the $m_2$-particle
is still clearly visible as a high level in the $Q=2$ sector.
Unfortunately, the $m_3$-particle is not visible in the $3 m_1$-continuum.
\par The right column of Table 7 shows that basically the same patterns
can also be observed in the INT case although here the approximation is less
good.     \par
To summarize, our numerical data supports a three-particle interpretation
of the low-lying spectrum for the chiral $\Zed_4$-Potts quantum chain
with $\vph$ in the range from $0$ to slightly above $\pi / 2$.
%
\section{Energy momentum relations for the single particle states}
\par  When interpreting the excitations of the model in terms of particles,
we should also look for their energy-momentum dispersion rule. On a lattice
with $N$ sites and periodic boundary conditions, the momentum $p$ can take
the $N$ values  \BEQ
p =-{\textstyle [\frac{N}{2}]},\ldots,-1,0,1,\ldots,{\textstyle [\frac{N}{2}]}.
        \label{p}     \EEQ
In calculating the limit $\NIF$ we use
\BEQ    P = \frac{2\pi}{N}\,p \hspace{15mm} (-\pi\leq P\leq\pi)  \EEQ  Except
for the $\WA$-case $\phi=\vph=0$ the hamiltonian (\ref{H}) does not conserve
parity, so, in general the curves $E(P)$ will not be symmetrical with respect
to $P \ra -P$.
\par  An expansion to first order in $\la$ gives a first orientation
of the energy-momentum relation near $\la=0$ for generic $\Zed_n$.
In an easy generalization of (\ref{ST}) we find for $Q \neq 0$:
\BEA \Delta E_{Q,0} & = &\left(\SK \bar{\alpha}_k (1-\omega^{Q k})\right)
   - \la (e^{i P} \alpha_Q + e^{-i P} \alpha_{n-Q}) +\ldots \nonumber  \\
   & = &   \left(\SK \bar{\alpha}_k (1-\omega^{Q k})\right)
   -\frac{2\la}{\sin{(\pi Q/n)}}\cos{(P -P_m)} +\ldots,
\label{pexp}    \EEA  where \BEQ P_m = (1 -2 Q/n)\phi. \label{Pmac} \EEQ
In the second line of (\ref{pexp}) we have inserted the definition
(\ref{alpha})
of $\alpha_k$ in the $\la$-dependent term. Since, to first order in $\la$,
the first term of (\ref{pexp}) contains no $P$-dependence, we see that
in the high-temperature limit, the violation of parity in the dispersion
relation of the particle with charge $Q$ is exclusively due to the presence
of a macroscopic momentum $P_m$ as given in (\ref{Pmac}). A particle and its
antiparticle feel macroscopic momenta which are opposite in sign.
\par In the parity conserving case $\NC$ the system can be made isotropic
between space and euclidian time rescaling the hamiltonian
by a suitable $\la$-dependent factor $\xi$.
So, for $\NC$ the particle will have the energy-momentum relation of the
lattice-Klein-Gordon equation
\BEQ    E/\xi = \sqrt{\mu_Q^2 + K^2},   \label{lKG} \EEQ
or \BEQ  E^2 = m_Q^2 + \xi^2 K^2,   \label{LKG}   \EEQ  where
$\xi$ is the rescaling factor, and we write
\BEQ   K=2\sin{(P/2)},      \hspace*{25mm}
m_Q=\mu_Q\xi.\EEQ \par The correct conformal normalization factor $\xi$ for
the $\WA$-quantum chains at the critical point $\la=1$ is
well-known\cite{Alc,GRR}:   \BEQ \xi(\la=1)=n. \label{CN} \EEQ     Using
formulae (\ref{pexp}) and (\ref{W1}),~(\ref{WAS}), the $m_Q$ and the
rescaling factors for the $Q=1$- and $Q=2$-particles of the $\WA$-chains near
$\la=0$ can be calculated explicitly. The $m_Q$ for $Q=1,2$ have been given in
(\ref{W1}), (\ref{WAS}) and (\ref{WW}), from which we find: \BEA
\Delta E_{1,0}\!&=&\!2\cot{(\pn)}-\frac{2\la}{\sin{(\pi/n)}}(1-K^2/2)
+\ldots \label{EP1} \\ \Delta E_{2,0}\!&=&\!2\cot{(\pn)}
  +2\cot{(\frac{3\pi}{2n})}
 -\frac{2\la}{\sin{(2\pi/n)}}(1-K^2/2)+\ldots   \label{EP12}   \EEA
from which we get different rescaling factors for particles
with different charge: Defining
\BEQ   \zeta =n\sqrt{\la} \label{ze} \EEQ
(coinciding for $\la=1$ with (\ref{CN})), for small $\la$ we obtain:  \BEQ
\xi_{Q=1}(\la) = \frac{\sqrt{2}}{n\sin{(\pn)}}~\zeta+\ldots \label{xi1} \EEQ
and \BEQ \xi_{Q=2}(\la) = \frac{\xi_{Q=1}(\la)}{\sqrt{2\cos^2\left(\pn
\right)-\frac{1}{2}}}+\ldots.         \label{xi2} \EEQ
Putting numbers, we find that the main variation of the $\xi_Q$ over the whole
range $0\le\la<1$ is determined (for low values of $n$) up to $10 \ldots 20 \%$
by the factor $\zeta$. E.g. for $\Zed_4$ at $\la\ra 0$ we have
\BEQ \lim_{\la\ra 0} \xi_{Q=1}/\zeta = 0.92388\ldots
\hspace*{15mm}\lim_{\la\ra 0}\xi_{Q=2}/\zeta = 0.84090\ldots
\EEQ similarly for higher $n$. For the Ising case $n=2$ we have exactly
$\xi_{Q=1}=\zeta$ for all $\la$ \cite{GI}.
\par  For $\NC$ the two parameters $\xi$ and $m_Q$
determine the dispersion curve exactly. E.g.\ in the ${\cal WA}_2$-case
($n=3$) we find for  $\la=0.00,~0.25,~0.50,~0.75,~0.90$:
\BEQ m_Q/(1-\la)^{5/6}
= 3.46410162,~3.58582824(1),~3.674214(2),~3.73(3),~3.8(1)
\label{pz1} \EEQ
and
\BEQ \xi/\zeta = 0.9428090,~0.9751702(1),~0.996697(2),~1.008(6),~1.00(1),
\label{pz2} \EEQ
respectively. At $\la=0.75$ and $\la=0.9$ we observe a non-monotonous
behaviour of the levels with $N$ which gives rise to a considerable
uncertainty in the extrapolation $\NIF$. At lower values of $\la$ the
exponential convergence clearly sets in already below $N=12$ sites, so that
there we may trust the extrapolation.
    \par    For $\la\ra 0$ the masses determining the
$N$-convergence go to infinity. So for $\la=0$ there is no $N$-dependence,
once a minimal value of $N$, dictated by the nearest neighbour-interaction, is
reached. This is in agreement with
(\ref{xi1}) and (\ref{xi2}) and shows that the high-temperature expansion
around $\la=0$ at the same time is also a nonrelativistic expansion of
(\ref{lKG}). For the ${\cal WA}_2$-case we have checked that the order
$\la^2$-term of (\ref{EP1}) agrees with the second order expansion term of
(\ref{lKG}): We find                               \BEQ   \Delta E_{1,0} =
\frac{2}{\sqrt{3}}\left(3-\la(2-K^2)-\la^2(1-K^2+K^4/6)+\ldots\right)  \EEQ
which fits to the form \BEQ \Delta E_{1,0}=m_1+(\xi K)^2/(2m_1)
-(\xi K)^4/(8m_1^3)+\ldots \EEQ   So, certainly to this order, the momentum
dependence of the ${\cal WA}_2$-single particle level $m_1$ is that of
the Klein-Gordon equation (\ref{lKG}) or (\ref{LKG}). \par
We have no physical interpretation why for low $n$ the ratio $\xi_Q/\zeta$
varies so little with $\la$ (in the $n=2$-case we have $\xi\equiv\zeta$),
          and we find it strange for the particle
interpretation that in general, $\xi_Q(\la)$ is $Q$-dependent.
\par  For the $\Zed_3$-superintegrable
case Albertini {\em et al.} \cite{al2} have given analytic
formulae and plots of the energy-momentum depencence of the $m_1$-particle
in the high-temperature
range $0 \leq \la < 1$, and for the first $Q\!=\!0$-excitation in the
low-temperature range $\la > 1$. Here we want to give simple approximate
expressions for the dispersion curves of both $Q=1$ and $Q=2$-particles,
not only for the superintegrable, but also for the
general self-dual $\Zed_3$-chiral model at $0\leq \la \leq 1$.
\par For $\vph, \phi>0$ we have no simple analytic form of the dispersion
equation and so we have performed fits to the curves $E(P)$ given by   \BEQ
E(P)= \sum_{m=0}^{3} a_{m}\cos^{m}(P-P_m) +\sum_{m=1,3}b_m\sin^m(P-P_m)
  \label{ex} \EEQ which come out good up to $\la \approx 0.6$.
Table 8 collects some of these fitted coefficients.    \par
For $\la < 0.5$ the convergence in $N$ is excellent for all $p$ if we use
up to $N=12$ sites.
For $\la \leq 0.1$ we can nicely fit
the data for the momentum dispersion of the $Q\!=\!1$-particle
just using eq.(\ref{pexp}).
For larger values of $\la$ inspection of the numerical curves
and the fits in Table~8 shows that
$P_m$ is decreasing with increasing $\la$, and in addition, the curves
start being unsymmetrical with respect to $P = P_m$. The larger the angle
$\vph$, and the larger $\la$ is the more terms in the expansion (\ref{ex})
are needed for a reasonable fit. Figs.3 - 5 show momentum distributions
for various values of $\la$ and $\vph$ together with our fitted curves.
As is seen from Fig.~5, for $\vph=2\pi/3$
and $\la=0.5$ more terms in the expansion would have been needed.
As we approach the incommensurate region, e.g.\ at $\vph=5\pi/6$, $\la=0.3$,
other levels get below the $m_1$ level at $\mid P \mid > \pi/2$, so that the
identification of the $m_1$-dispersion curve gets difficult. It may be that
in this region new particle types will show up.

\section{Conclusions}
We have shown that the low-lying spectrum of the massive high-temperature
regime of the self-dual $\Zed_n$-Potts quantum chain at low chiral
parameter values $\vph~ {}^{<}_{\sim}~ 2\pi/3$
can be described in terms of $n-1$ particles which carry $\Zed_n$-charges
$Q=1,\ldots,n-1$ (we denote their masses by $m_Q$).
This is seen by studying the variation of the single-particle masses from their
K\"{o}berle-Swieca-values at zero chirality $\vph=0$ up to and above the
superintegrable value $\vph=\pi/2$. For low inverse temperatures $\la$ we use
a perturbation expansion. For higher $\la$ we concentrate on the special cases
$n=3$ and $n=4$ and diagonalize the hamiltonian numerically. \par
In the $\Zed_3$-case the
mass ratio $m_2/m_1$ is shown to rise continously from $m_2/m_1=1$
at $\vph=0$ to $m_2/m_1=2$ for the superintegrable case $\vph = \pi/2$.
In the superintegrable case the $Q\!=\!2$-particle appears
precisely at the $m_1 +m_1$-scattering threshold. For $\vph \ra \pi$,
$m_1$ tends to zero. How far the $Q\!=\!2$-particle survives for $\vph >\pi/2$
is not clear. In Table~5 we give evidence that the $Q=2$-single particle level
is still present up to $\la=0.15$ and $\vph=7\pi/12$.
In the superintegrable case we identify two- and three-particle scattering
states through their different power behaviour in the chain
size $N$. The two single particle levels show exponential convergence
in $N$. The perturbation expansion of $m_2$ is shown to diverge at order
$\la^2$
for $\vph \ra \pi/2$.      \par   At small $\la$, the
nonconservation of parity in the model results only in the appearance of a
$Q$-dependent macroscopic momentum $P_m = (1-2Q/n)\phi$
in the energy-momentum dispersion relations of the particles, which is
$P_m=\pm\phi/3$ in the $\Zed_3$-case.
Our numerical data suggest that the average $P_m$ decreases with increasing
$\la$, perhaps $P_m \ra 0$ for $\la \ra 1$, but we have no simple
parametrization of the effects of parity violation at large $\la$ and restrict
ourselves to giving trigonometrical fit coefficients.     \par
Using the same methods we have also verified in detail that the
high-temperature
massive spectrum of the chiral $\Zed_4$-Potts quantum chain can be described
analogously in terms
of three massive particles with $\Zed_4$-charges $Q=1, \ 2$ and $3$.
In the superintegrable case the mass ratio equals the ratio of the charges,
such that now both the $Q=2$ and $Q=3$ particles appear at scattering
thresholds. As before, the scattering states can easily be identified by
their power behaviour in the chain length $N$, while the single particles
show exponential convergence with $N$.
\par
It would be interesting to use L\"{u}scher's \cite{LuW} method to obtain
numerical information on the phase-shifts or the $S$-matrix
from the $N$-dependence of the multi-particle states.
\vskip 2cm
\noindent
{\Large {\bf Figure captions}} \vskip 4mm    \par
Fig.~1:~~Schematic phase diagram of the self-dual $\Zed_3$-chiral Potts-model
as defined in eq.(\ref{H3}).       \\   \par
Fig.~2:~~Level structure for the self-dual $\Zed_3$-chiral Potts-model in the
high-temperature massive region.
Left hand side: for a chiral angle $\vph < \pi/2$ (below the superintegrable
value) and, right hand side: $\vph > \pi/2$ (above the
superintegrable value). In the latter case the thresholds are determined by
$m_1$ alone.                    \\    \par
Fig.~3:~~Energy-momentum relation of particle $m_1$ for the
$\Zed_3$-superintegrable case and various values of the inverse temperature
$\la$ in the high-temperature region. The small crosses and triangles
are finite-size values calculated for $N=6,\ldots,12$ sites. \\      \par
Fig.~4:~~Same as Fig.~3, but for $\vph$ below the superintegrable value
and both for $m_1$ (three dashed curves) and $m_2$ (full curve). \\  \par
Fig.~5:~~Same as Fig.~3, but for several values of $\vph$ above the
superintegrable value (towards the incommensurate region),
for the $Q=1$-particle $m_1$. The shift of the minima of the curves to
the right due to the macroscopic momentum $P_m$ is clearly seen.

\newpage   \noindent
{\LARGE {\bf Tables}}   \\ \vspace*{3mm} \par
\begin{tabular}{|r|ccccccc|} \hline
\multicolumn{1}{|c|}{ } & \multicolumn{7}{c|}{$\Delta E_{Q=0,i}$} \\
        $N$& $i=1$ & 2 & 3 & 4 & 5 & 6 & 7 \\  \hline
%5& 3.3833516& 6.1897599& 5.1831791&          & 6.6406119&
%%&7.1170726\\
%6& 3.2402540& 5.4035327& 4.7691472& 6.4717590& 6.2844859&
%%&6.6499297\\
 7& 3.1598983& 4.8359585& 4.4520381& 5.9303676& 5.9032240&
7.0487030&6.3557797\\
 8& 3.1115649& 4.4240923& 4.2075367& 5.4868664& 5.5496714&
6.3987521&6.0338701\\
 9& 3.0808417& 4.1213280& 4.0168334& 5.1252880& 5.2384091&
5.8572524&5.7243697\\
10& 3.0604137& 3.8954662& 3.8661605& 4.8297326& 4.9700825&
5.4121174&5.4423701\\
11& 3.0463166& 3.7244809& 3.7455652& 4.5867795& 4.7406004&
5.0471104&5.1917195\\
12& 3.0362806& 3.5932058& 3.6478379& 4.3856960& 4.5446740&
4.7471645&4.9714669\\
\hline $\infty$&
 2.9998(3)& 2.986(7) & 3.01(1)  & 3.02(8)  & 3.05(6)  & 2.9(1)   & 2.95(8)   \\
\hline  $y$ &3.0(1)&2.9(2)&2.0(1)&2.1(1)&1.9(1)&2.8(6)&  ?     \\
   & $3m_1$ & $3m_1$ & $m_1+m_2$ & $m_1+m_2$ & $m_1+m_2$ & $3m_1$ & ? \\ \hline
\end{tabular}   \hzeile
\begin{tabular}{|c|ccccc|} \hline
\multicolumn{1}{|c|}{ } & \multicolumn{5}{c|}{$\Delta E_{Q=1,i}$} \\
        $N$& $i=0$ & 1 & 2 & 3 & 4 \\  \hline
%5& 0.9924240& 5.0863458& 6.7408301&          & 6.9888561\\
%6& 0.9963767& 4.7353052& 6.1998192& 7.2942778& 6.5428730\\
 7& 0.9984874& 4.5173085& 5.7905491& 6.6049711& 6.1612566\\
 8& 0.9994289& 4.3760023& 5.4775432& 6.0785242& 5.8456347\\
 9& 0.9998044& 4.2809972& 5.2349161& 5.6757753& 5.5870148\\
10& 0.9999405& 4.2150750& 5.0442562& 5.3652765& 5.3749672\\
11& 0.9999851& 4.1680556& 4.8924532& 5.1235743& 5.2002368\\
12& 0.9999978& 4.1336962& 4.7700872& 4.9335093& 5.0552644\\
\hline $\infty$&
 1.0000000& 3.99(2)  & 4.00(1)  & 4.01(5)  & 4.01(3)     \\
\hline  $y$ &expon.&3.0(2)&2.0(1)&2.9(2)&1.9(1) \\
      & $m_1$ & $2m_1+m_2$ & $2m_2$ & $2m_1+m_2$ & $2m_2$ \\  \hline
\end{tabular}
\hzeile
\begin{tabular}{|r|cccccc|} \hline
\multicolumn{1}{|c|}{ } & \multicolumn{6}{c|}{$\Delta E_{Q=2,i}$} \\
        $N$& $i=0$ & 1 & 2 & 3 & 4 & 5 \\  \hline
%5& 2.0044161& 3.2906514& 5.3061096&          &          & 7.1686873\\
%6& 2.0002000& 2.9975868& 4.8074676& 5.9788475&          & 6.5436728\\
 7& 1.9995726& 2.7901373& 4.3798245& 5.6633417&          & 6.1294869\\
 8& 1.9996761& 2.6389905& 4.0256344& 5.3106885& 6.0425834& 5.8468390\\
 9& 1.9998304& 2.5261089& 3.7351818& 4.9697753& 5.8323103& 5.6487379\\
10& 1.9999247& 2.4399607& 3.4970152& 4.6583108& 5.5766919& 5.5065400\\
11& 1.9999701& 2.3729391& 3.3008958& 4.3808694& 5.3110577& 5.4022604\\
12& 1.9999893& 2.3198948& 3.1384071& 4.1365977& 5.0527923& 5.3242970\\
\hline $\infty$& 2.0001(1)& 2.002(7) & 2.00(5) & 2.0(1) & 2.6(5) & 4.99(1) \\
\hline $y$ &expon.&2.0(1)&1.9(1)&1.9(2)&  ?   &2.9(2)\\
           &$m_2$& $2m_1$ & $2m_1$ & $2m_1$ & ? & $m_1+2m_2$ \\  \hline
\end{tabular}  \hzeile
Table~1: The lowest energy gaps $\Delta E_{Q,i}$, as defined in eq.(\ref{gap}),
for the $\Zed_3$-hamiltonian eq.(\ref{H3}) and the superintegrable case
$\SD$, $\la = 0.50$.
The numbers given in brackets indicate the estimated error in the last
written digit. All calculations of the gaps have been performed to 12 digit
accuracy and using all $N=2,\ldots,12$ sites for the extrapolation $\NIF$.
In order to save space, in the Tables we give less digits and omit the low-$N$-
data. Details on our determination of the exponent of convergence $y$, defined
in (\ref{y1}), (\ref{y2}) is given in Table 2 below. In the last line of each
Table above, we give our particle interpretation of the various levels, as
deduced from the result for $y$.
\newpage   \noindent
\begin{tabular}{|c|cccc|ccc|ccc|} \hline  \multicolumn{1}{|c|}{ } &
        \multicolumn{4}{c|}{$y_N$ for $\Delta E_{Q=0,i}$} &
        \multicolumn{3}{c|}{$y_N$ for $\Delta E_{Q=1,i}$} &
        \multicolumn{3}{c|}{$y_N$ for $\Delta E_{Q=2,i}$} \\
   $N$ & $i=1$ & 2 & 3 & 4 &$i=0$ & 1 & 2 &$i=0$& 1 & 2\\  \hline
% 5& 2.4426 &        & 0.9836 &        & 2.0915  & 1.9555 & 1.0400 &        &
%                                                           1.2844 & 0.6540 \\
% 6& 2.5628 & 1.5522 & 1.1534 &        & 4.0456  & 2.1407 & 1.2060 &        &
%                                                           1.4127 & 0.8967 \\
  7& 2.6413 & 1.7475 & 1.2814 & 1.0998 & 5.6670  & 2.1812 & 1.3354 &        &
                                                            1.5124 & 1.0720 \\
  8& 2.6955 & 1.9024 & 1.3808 & 1.2290 & 7.2946  & 2.3893 & 1.4389 & 2.0775 &
                                                            1.5900 & 1.2068 \\
  9& 2.7348 & 2.0293 & 1.4594 & 1.3340 & 9.0948  & 2.4728 & 1.5230 & 5.4923 &
                                                            1.6503 & 1.3140 \\
 10& 2.7646 & 2.1348 & 1.5222 & 1.4212 & 11.2974 & 2.5376 & 1.5917 & 7.7025 &
                                                            1.6973 & 1.4013 \\
 11& 2.7879 & 2.2232 & 1.5731 & 1.4947 & 14.5079 & 2.5883 & 1.6482 & 9.6994 &
                                                            1.7340 & 1.4733 \\
 12& 2.8067 & 2.2976 & 1.6148 & 1.5573 & 21.8070 & 2.6287 & 1.6948 & 11.7909&
                                                            1.7633 & 1.5334 \\
\hline  $\infty$ &3.0(1)&
 2.9(2)&2.0(1)&2.1(1)&expon.&3.0(2)&2.0(1)&expon.&2.0(1)&1.9(1)\\  \hline
\end{tabular}
\hzeile
Table~2: Exponents $y_N$ of the convergence $N \ra \infty$ as defined in
eq.(\ref{y2}), for the $\Zed_3$-superintegrable case and $\la=0.5$ for the
lower
levels given in Table 1. "expon." means that the fast increasing
sequence of the $y_N$ indicates exponential convergence.
\zeile{1}
\begin{tabular}{|cc|l|l||cc|l|l|} \hline
\multicolumn{4}{|c||}{$\phi = \vph = \pi/4$, $\la = 0.5$} &
\multicolumn{4}{c|}{$\phi = \vph = 2 \pi/3$, $\la = 0.5$} \\ \hline
$Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Particles &
      $Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Particles \\ \hline
$0$ & $1$ & $3.9150(2)$   & $ m_1 + m_2$ &
      $0$ & $1$ & $1.75(1)$    & $3 m_1$    \\
$0$ & $2$ & $3.85(3) $    & $ m_1 + m_2$ &
      $0$ & $2$ & $1.80(5)$    & $3 m_1$    \\
$0$ & $3$ & $3.98(4) $    & $ m_1 + m_2$ &
      $0$ & $3$ & $1.8(1)$     & $3 m_1$    \\
$0$ & $4$ & $4.70(8) $    & $ 3 m_1$     &
      $1$ & $0$ & $0.5868(2)$  & $\equiv m_1$ \\
$0$ & $5$ & $3.90(5) $    & $ m_1 + m_2$ &
      $1$ & $1$ & $2.36(4)$    & $4 m_1$    \\
$1$ & $0$ & $1.5834366(1)$& $ \equiv m_1$  &
      $2$ & $0$ & $1.174(2)$   & $2 m_1$    \\
$1$ & $1$ & $4.68(1)$     & $ 2 m_2   $  &
      $2$ & $1$ & $1.18(2)$    & $2 m_1$    \\
$2$ & $0$ & $2.339607(1)$ & $ \equiv m_2$  &
      $2$ & $2$ & $1.19(5)$    & $2 m_1$    \\
$2$ & $1$ & $3.168(4)$    & $ 2 m_1   $  &
       \  &  \  &  \           &  \           \\
$2$ & $2$ & $3.17(5)$     & $ 2 m_1   $  &
       \  &  \  &  \           &  \           \\
\hline   \end{tabular}    \hzeile
Table~3: The lowest energy gaps $\Delta E_{Q,i}$ (extrapolated $\NIF$) of the
self-dual $\Zed_3$-model (\ref{H3}), for $\la=0.5$ and two values of $\vph$:
$\vph=\pi/4$ (below the superintegrable line), and $\vph=3\pi/2$ (above the
superintegrable line), together with their particle
interpretation.
\zeile{1}
\begin{tabular}{|c|cccc|cccc|} \hline  \multicolumn{1}{|c|}{ }
  &\multicolumn{4}{c|}{$\Delta E_{Q=2,i}\;(\vph=7\pi/12,\;\la=0.10$)} &
   \multicolumn{4}{c|}{$\Delta E_{Q=2,i}\;(\vph=7\pi/12,\;\la=0.15$)} \\
                                       \multicolumn{1}{|c|}{ }
  &\multicolumn{4}{c|}{$m_1=1.50335845$} &
   \multicolumn{4}{c|}{$m_1=1.41131611$} \\
 $N$ & $i=0$ & 5 & 6 & 7 &$i=0$ & 5 & 6 & 7 \\  \hline
%4&3.092249&3.588344&3.902888&8.816744&2.934750 &3.597177 &3.988954 &8.643263\\
%5&3.065421&3.441831&3.887784&8.281078&2.901607 &3.413603 &3.924248 &8.106758\\
%6&3.049449&3.689955&3.895152&8.116899&2.881206 &3.777743 &3.983731 &7.868099\\
 7&3.03919 &3.58623 &3.89205 &7.99416 &2.86777 &3.63650 &3.95076 &7.69924 \\
 8&3.03222 &3.72696 &3.89348 &7.90458 &2.85847 &3.85581 &3.98085 &7.57893\\
 9&3.02727 &3.65640 &3.89285 &7.83788 &2.85177 &3.75262 &3.96189 &7.49035\\
10&3.02363 &3.74332 &3.89313 &7.78699 &2.84678 &3.89547 &3.97910 &7.42310\\
11&3.02088 &3.69394 &3.89301 &7.74732 &2.84297 &3.81857 &3.96735 &7.37073\\
12&3.01875 &3.75171 &3.89306 &7.71579 &2.83999 &3.91801 &3.97795 &7.32905\\
\hline   \end{tabular}   \hzeile
Table~4: Selected $Q=2$-gaps for $\vph = 7\pi/12$ (slightly above the
superintegrable line) of the self-dual $\Zed_3$-model.
The numbering of the levels ($i=0,\ldots$) refers to $N=12$ sites, for a
smaller
number of sites there are less levels between $i=0$ and $i=5$. The values of
$m_1$ are very well determined because of fast convergence.
Observe that the $i=0$-levels converge excellently to $2m_1$. In both cases
level $i=6$ converges much faster with $N$ than the other levels, which may
indicate that this is the $m_2$-level. Non-monotonous behaviour
in $N$ is common in the neighbourhood of the IC-phase.
\newpage
\begin{tabular}{|cc|l|l||cc|l|c|} \hline
\multicolumn{4}{|c||}{$\vph = \pi/ 4$, $\phi = 19.47\ldots^{\circ}$} &
\multicolumn{4}{c|}{$\vph = 2\pi/3$, $\phi=135.58\ldots^{\circ}$} \\
\multicolumn{4}{|c||}{$\la = 0.75$} &
 \multicolumn{4}{c|}{$\la = 0.70$} \\     \hline
$Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Particles &
      $Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Particles \\  \hline
$0$ & $1$ & $1.933(2)$ & $m_1 + m_2$ &
      $0$ & $1$ & $1.50(1)$    & $3 m _1$ \\
$0$ & $2$ & $1.9(2)$   & $m_1 + m_2$ &
      $0$ & $2$ & $1.53(5)$    & $3 m _1$ \\
$0$ & $3$ & $1.8(3)$   & $m_1 + m_2$ &
      $1$ & $0$ & $0.495(2)$   & $\equiv m_1$ \\
$1$ & $0$ & $0.750(1)$ & $\equiv m_1$ &
      $1$ & $1$ & $1.99(1)$    & $4 m _1$ \\
$1$ & $1$ & $2.41(2)$  &$2 m_2$ &
      $2$ & $0$ & $0.995(1)$   & $2 m _1$ \\
$2$ & $0$ & $1.19(2)$  & $\equiv m_2$ &
      $2$ & $1$ & $1.00(1)$    & $2 m _1$ \\
$2$ & $1$ & $1.50(3)$  & $2 m_1$ &
      $2$ & $2$ & $1.04(5)$    & $2 m _1$ \\
 \  & \   &     \      &     \     &
      $2$ & $3$ & $2.52(5)$    & $5 m _1$ \\
\hline  \end{tabular}   \hzeile
Table~5: Lowest energy gaps $\Delta E_{Q,i}$ as in Table 3, but for two
different choices of the parameters in the {\em integrable} $\Zed_3$-model
case,
in which $\vph$ and $\phi$ are related by (\ref{int}).
On the left side we give an example with chiral angles below the
superintegrable
case, on the right hand side $\phi$,$\vph$ are taken above their
superintegrable
values. The pattern observed here is very similar to that of the self-dual case
in Table~3.
\zeile{1}     \noindent
\begin{tabular}{|r|cccc|ccc|} \hline
\multicolumn{1}{|c|}{ } & \multicolumn{4}{c|}{$\Delta E_{Q=0,i}$}
                        & \multicolumn{3}{c|}{$\Delta E_{Q=1,i}$} \\
 $N$ & $i=1$        & $2$          & $3$          & $4$          &
       $i=0$        & $1$          & $2$    \\  \hline
$ 4$ & $ 4.4870349$ & $ 6.6401198$ & $ 6.9386000$ & $ 7.1202527$ &
       $ 0.9782260$ & $ 6.2907501$ & $ 8.8182343$  \\
$ 5$ & $ 4.2443835$ & $ 6.2079844$ & $ 6.3448347$ & $ 6.4390786$ &
       $ 0.9932173$ & $ 5.7339386$ & $ 7.9355672$  \\
$ 6$ & $ 4.1352996$ & $ 5.6907770$ & $ 5.9280172$ & $ 6.0208759$ &
       $ 0.9985794$ & $ 5.4429212$ & $ 7.2245463$  \\
$ 7$ & $ 4.0807817$ & $ 5.3191415$ & $ 5.5469396$ & $ 5.7278875$ &
       $ 0.9999564$ & $ 5.2809826$ & $ 6.8098311$  \\
$ 8$ & $ 4.0511625$ & $ 5.0477033$ & $ 5.2606178$ & $ 5.2880905$ &
       $ 1.0001440$ & $ 5.1860132$ & $ 6.4550409$  \\
$ 9$ & $ 4.0339657$ & $ 4.8460464$ & $ 4.9582447$ & $ 5.0427288$ &
       $ 1.0000927$ & $ 5.1277432$ & $ 6.1875836$  \\
$10$ & $ 4.0234306$ & $ 4.6936534$ & $ 4.7248803$ & $ 4.8744672$ &
       $ 1.0000390$ & $ 5.0905398$ & $ 5.9834045$  \\
\hline
$\infty$&$4.0000(2)$&  $3.89(2)$   &  $ 3.9(9)$   &  $3.7(4)$    &
        $1.0001(1)$ & $4.97(3)$    & $ 5.7(6)$   \\
\hline
$y$  & $4.0(2)$     & $2.1(3)$     & $ 2.9(4)$    & $1.6(1)$     &
       expon.\      & $3.5(3)$     & $ 1.8(1)$   \\
  & $4m_1$ & $2m_2$ or & $2m_1+m_2$ & $2m_2$ or & $m_1$ &  ?  & $m_2+m_3$ \\
     & & $m_1+m_3$ & & $m_1+m_3$ & & & \\
\hline  \end{tabular}    \hzeile
\begin{tabular}{|r|cc|ccc|} \hline
\multicolumn{1}{|c|}{ } & \multicolumn{2}{c|}{$\Delta E_{Q=2,i}$}
                        & \multicolumn{3}{c|}{$\Delta E_{Q=3,i}$} \\
 $N$ & $i=0$       & $1$         & $i=0$       & $1$         & $2$ \\ \hline
$ 4$ & $1.9760981$ & $3.6344881$ & $3.0090309$ & $5.0706873$ & $5.4135243$ \\
$ 5$ & $1.9885583$ & $3.1951141$ & $2.9978592$ & $4.4899244$ & $4.9297443$ \\
$ 6$ & $1.9959972$ & $2.9027708$ & $2.9980224$ & $4.1048393$ & $4.5520862$ \\
$ 7$ & $1.9989351$ & $2.7013088$ & $2.9991277$ & $3.8412387$ & $4.2636142$ \\
$ 8$ & $1.9998278$ & $2.5582804$ & $2.9997209$ & $3.6558602$ & $4.0432463$ \\
$ 9$ & $2.0000213$ & $2.4539476$ & $2.9999379$ & $3.5222475$ & $3.8733462$ \\
$10$ & $2.0000330$ & $2.3759111$ & $2.9999964$ & $3.4237046$ & $3.7406336$ \\
\hline
$\infty$&$2.00001(3)$& $1.9(1)$  & $3.00001(6)$&  $2.8(2)$   & $ 3.02(4)$  \\
\hline
 $y$ & expon.\     & $1.9(1)$    & expon.\     & $2.1(2)$    & $1.7(2)$    \\
     &  $m_2$ & $2m_1$ & $m_3$ & $m_1+m_2$ & $m_1+m_2$ \\
\hline   \end{tabular}   \hzeile
Table~6: The lowest energy gaps $\Delta E_{Q,i}$, as in Table~1, but here
instead of the $\Zed_3$-case now
for the $\Zed_4$-hamiltonian eq.(\ref{H4}). Superintegrable case
$\phi = \vph = \pi/2$ for $\la = 0.5$. Note the overshooting in the
approximants for $m_1$ and $m_2$.
\newpage    \noindent
\begin{tabular}{|cc|l|l||cc|l|l||cc|l|l|} \hline
\multicolumn{4}{|c||}{$\phi = \vph = \pi/4$} &
 \multicolumn{4}{c||}{$\phi = \vph = 3 \pi/5$} &
  \multicolumn{4}{c|}{$\vph = \pi/4$, $\phi = 19.47\ldots^{\circ}$} \\
\multicolumn{4}{|c||}{$\la = 0.50$} &
 \multicolumn{4}{c||}{$\la = 0.10$} &
  \multicolumn{4}{c|}{$\la =0.75$} \\       \hline
$Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Particles &
      $Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Part. &
          $Q$ & $i$ & $\Delta E_{Q,i}(\infty)$ & Particles \\ \hline
$0$ & $1$ & $5.77(2)$     & $m_1 + m_3$  &
      $0$ & $1$ & $5.1(2)$     & $4 m_1$    &
          $0$ & $1$ & $2.767(4)$   & $m_1 + m_3$ \\
$0$ & $2$ & $5.76(8)$     & $m_1 + m_3$  &
      $1$ & $0$ & $1.2116781$  & $\equiv m_1$  &
          $0$ & $2$ & $3.2(1)$   & $2 m_1 + m_2$ \\
$0$ & $3$ & $7.1(2)$      & $2 m_2$      &
      $1$ & $1$ & $6.1(3)$     & $5 m_1$    &
          $1$ & $0$ & $0.8663(1)$ & $\equiv m_1$   \\
$1$ & $0$ & $2.03383(1)$ & $\equiv m_1$   &
      $2$ & $0$ & $2.42334(7)$ & $2 m_1$     &
          $1$ & $1$ & $3.50(1)$ & $2 m_1 + m_3$   \\
$1$ & $1$ & $7.1958(4)$   & $m_2 + m_3$  &
      $2$ & $1$ & $2.430(6)$   & $2 m_1$     &
          $2$ & $0$ & $1.529(2)$ & $\equiv m_2$   \\
$1$ & $2$ & $6.98(7)$     & $m_2 + m_3$  &
      $2$ & $5$ & $3.211450(1)$&$\equiv m_2$ &
          $2$ & $1$ & $1.8(1)$ & $2 m_1$   \\
$2$ & $0$ & $3.4282(1)$  & $\equiv m_2$   &
      $3$ & $0$ & $3.6349(5)$  & $3 m_1$     &
          $3$ & $0$ & $1.786(2)$ & $\equiv m_3$   \\
$2$ & $1$ & $4.15(6)$     & $2 m_1$      &
          & \   &     \        &     \         &
          $3$ & $1$ & $2.52(7)$ & $3 m_1$   \\
$2$ & $2$ & $4.59(1)$     &     ?          &
          & \   &     \        &     \         &
              & \   &     \        &     \         \\
$2$ & $3$ & $7.62(7)$     & $2 m_3$      &
          & \   &     \        &     \         &
              & \   &     \        &     \         \\
$3$ & $0$ & $3.7501(1)$   & $\equiv m_3$       &
          & \   &     \        &     \          &
              & \   &     \        &     \         \\
$3$ & $1$ & $5.458(2)$    & $m_1 + m_2$  &
          & \   &     \        &     \          &
              & \   &     \        &     \         \\
\hline  \end{tabular}   \hzeile
Table~7: The left and middle parts of this Table show a selection of lowest
energy gaps of the self-dual, but not super-integrable
$\Zed_4$-hamiltonian for two different choices of the parameters $\phi = \vph$,
with $\beta=\tilde{\beta}=1/\sqrt{2}$ and different $\la$. The right part of
the Table contains an example of the INT case. For most levels in this Table
the determination of the convergence exponent $y$ is very unsafe due to the
considerable uncertainty in $\Delta E_{Q,i}(\infty)$. So, as also in Tables 3
and 5, the
particle content is inferred almost exclusively from $\Delta E_{Q,i}(\infty)$
alone.     \zeile{2}
\begin{tabular}{|cc|cccccc|c|} \hline
$\vph$&$\la$& $a_0$& $a_1$& $a_2$& $a_3$&  $b_1$& $b_3$&$\vph_m$\\
$[deg]$ & & & & & & &  & $[deg]$ \\     \hline
 45.&0.25& 2.8745 &-0.5924 &-0.0549 &-0.0075  & 0.0033 &        & 39.\\
 45.&0.50& 3.0302 &-1.1653 &-0.2355 &-0.0764  &-0.0134 &        & 30.\\
 45.&0.75& 3.3502 &-1.6702 &-0.6028 &-0.2300  & 0.0864 &-0.2121 & 18.\\
 90.&0.25& 2.0436 &-0.5118 &-0.0412 &-0.0848  &-0.0112 &        & 81.\\
 90.&0.50& 2.2363 &-1.1331 &-0.2381 & 0.0014  &-0.0188 &        & 69.\\
 90.&0.70& 2.4363 &-1.4587 &-0.4244 &-0.1190  &-0.0757 &-0.0112 & 57.\\
 90.&0.85& 2.6161 &-1.5982 &-0.5752 &-0.2791  &-0.1981 &-0.0745 & 39.\\
120.&0.25& 1.4317 &-0.5570 &-0.0552 &-0.0022  &-0.0263 &        &105.\\
120.&0.50& 1.5407 &-0.8112 &-0.0909 &-0.2517  &-0.3291 &        & 57.\\
150.&0.20& 0.7281 &-0.4696 &-0.0028 & 0.0451  & 0.0013 &        &150.\\
171.&0.10& 0.2257 &-0.2260 &-0.0128 &-0.0009  &        &        &171.\\
\hline % Now comes Q=2
 45.&0.50& 3.7927 &-1.1973 &-0.1501 &-0.0874  &-0.3223 &        &-45.\\
\hline  \end{tabular}
\hzeile
Table~8: Coefficients of fits to the energy-momentum relation eq.(\ref{ex}) for
various $\vph$ and $\lambda$, all for the self-dual model. Except for the last
line, which is for the lowest $Q\!=\!2$-gap, all other fits are for the lowest
$Q\!=\!1$-gaps. The quality of the fits can be judged from Figs.~3,~4 and 5.
In the last column we quote $\vph_m$, which we define by $P_m = \vph_m/3$.

\newpage
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\end{document}
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LTa
1000 500 M
4100 500 L
2700 100 M
(phi = pi/4) Cshow
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LTb
1000 500 M
1000 4600 L
970 4500 L
1030 4500 L
1000 4600 L
1000 4800 M
(E) Cshow
920 500 M
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(0) Rshow
920 1200 M
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(1) Rshow
920 1900 M
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(2) Rshow
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(3) Rshow
920 3300 M
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(4) Rshow
920 4000 M
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1300 500 M
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2850 3775 L
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2880 3675 L
2850 3775 L
2920 3300 M
(2 m2) Lshow
% m2
3300 2138 M
4100 2138 L
3550 500 M
3550 2138 L
3520 2038 L
3580 2038 L
3550 2138 L
3480 1319 M
(m2) Rshow
% 2 m1
3300 2716 M
4100 2716 L
3300 2746 M
4100 2746 L
3300 2776 M
4100 2776 L
3850 500 M
3850 2716 L
3820 2616 L
3880 2616 L
3850 2716 L
3920 2400 M
(2 m1) Lshow
%%%%%%%%%%%%%%%%%%%%%%%%%%%%
LTa
5000 500 M
8100 500 L
6700 100 M
(phi = 2pi/3) Cshow
%
LTb
5000 500 M
5000 4600 L
4970 4500 L
5030 4500 L
5000 4600 L
5000 4800 M
(E) Cshow
4920 500 M
5080 500 L
4850 500 M
(0) Rshow
4920 1200 M
5080 1200 L
4850 1200 M
(0.5) Rshow
4920 1900 M
5080 1900 L
4850 1900 M
(1) Rshow
4920 2600 M
5080 2600 L
4850 2600 M
(1.5) Rshow
4920 3300 M
5080 3300 L
4850 3300 M
(2) Rshow
4920 4000 M
5080 4000 L
4850 4000 M
(2.5) Rshow
5300 500 M
6100 500 L
5700 350 M
(Q=0) Cshow
%6300 500 M
%7100 500 L
6700 350 M
(Q=1) Cshow
%7300 500 M
%8100 500 L
7700 350 M
(Q=2) Cshow
% 3 m1
5300 2965 M
6100 2965 L
5300 2995 M
6100 2995 L
5300 3025 M
6100 3025 L
5700 500 M
5700 2965 L
5670 2865 L
5730 2865 L
5700 2965 L
5630 1732 M
(3 m1) Rshow
% m1
6300 1322 M
7100 1322 L
6550 500 M
6550 1322 L
6520 1222 L
6580 1222 L
6550 1322 L
6480 911 M
(m1) Rshow
% 4 m1
6300 3786 M
7100 3786 L
6300 3816 M
7100 3816 L
6300 3846 M
7100 3846 L
6850 500 M
6850 3786 L
6820 3686 L
6880 3686 L
6850 3786 L
6920 2554 M
(4 m1) Lshow
% 2 m1
7300 2143 M
8100 2143 L
7300 2173 M
8100 2173 L
7300 2203 M
8100 2203 L
7700 500 M
7700 2143 L
7670 2043 L
7730 2043 L
7700 2143 L
7770 1321 M
(2 m1) Lshow


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%%Trailer

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15320 PD 8426 15347 PD 8385 15375 PD 8343 15403 PD 8301 15430 PD 8259 15458 PD
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PD 5950 10500 PD 6000 10500 PD 6050 10500 PD 6100 10500 PD 6115 10500 PD 6282
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PD 6948 10500 PU 6950 10500 PD 7000 10500 PD 7050 10500 PD 7100 10500 PD 7150
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PD 7850 10500 PD 7900 10500 PD 7950 10500 PD 8000 10500 PD 8050 10500 PD 8100
10500 PD 8113 10500 PD 8280 10500 PU 8300 10500 PD 8350 10500 PD 8400 10500 PD
8450 10500 PD 8500 10500 PD 8550 10500 PD 8600 10500 PD 8650 10500 PD 8700
10500
PD 8750 10500 PD 8779 10500 PD 8946 10500 PU 8950 10500 PD 9000 10500 PD 9050
10500 PD 9100 10500 PD 9150 10500 PD 9200 10500 PD 9250 10500 PD 9300 10500 PD
9350 10500 PD 9400 10500 PD 9445 10500 PD 9612 10500 PU 9650 10500 PD 9700
10500
PD 9750 10500 PD 9800 10500 PD 9850 10500 PD 9900 10500 PD 9900 10500 PD 9950
10500 PD 10000 10500 PD 10050 10500 PD 10100 10500 PD 10111 10500 PD 10278
10500
PU 10300 10500 PD 10350 10500 PD 10400 10500 PD 10450 10500 PD 10500 10500 PD
10550 10500 PD 10600 10500 PD 10650 10500 PD 10700 10500 PD 10750 10500 PD
10777
10500 PD 10944 10500 PU 10950 10500 PD 11000 10500 PD 11050 10500 PD 11100
10500
PD 11150 10500 PD 11200 10500 PD 11250 10500 PD 11300 10500 PD 11350 10500 PD
11400 10500 PD 11443 10500 PD 11610 10500 PU 11650 10500 PD 11700 10500 PD
11750
10500 PD 11800 10500 PD 11850 10500 PD 11900 10500 PD 11950 10500 PD 12000
10500
PD 12050 10500 PD 12100 10500 PD 12109 10500 PD 12276 10500 PU 12300 10500 PD
12350 10500 PD 12400 10500 PD 12450 10500 PD 12500 10500 PD 12550 10500 PD
12600
10500 PD 12650 10500 PD 12700 10500 PD 12750 10500 PD 12775 10500 PD 12942
10500
PU 12950 10500 PD 13000 10500 PD 13050 10500 PD 13100 10500 PD 13150 10500 PD
13200 10500 PD 13250 10500 PD 13300 10500 PD 13350 10500 PD 13400 10500 PD
13441
10500 PD 13608 10500 PU 13650 10500 PD 13700 10500 PD 13750 10500 PD 13800
10500
PD 13850 10500 PD 13900 10500 PD 13950 10500 PD 14000 10500 PD 14050 10500 PD
14100 10500 PD 14107 10500 PD 14274 10500 PU 14300 10500 PD 14350 10500 PD
14400
10500 PD 14450 10500 PD 14500 10500 PD 14550 10500 PD 14600 10500 PD 14650
10500
PD 14700 10500 PD 14750 10500 PD 14773 10500 PD 14940 10500 PU 14950 10500 PD
15000 10500 PD 15050 10500 PD 15100 10500 PD 15150 10500 PD 15200 10500 PD
15250
10500 PD 15300 10500 PD 15350 10500 PD 15400 10500 PD 15439 10500 PD 15606
10500
PU 15650 10500 PD 15700 10500 PD 15750 10500 PD 15800 10500 PD 15850 10500 PD
15900 10500 PD 15950 10500 PD 16000 10500 PD 16050 10500 PD 16100 10500 PD
16105
10500 PD 16272 10500 PU 16300 10500 PD 16350 10500 PD 16400 10500 PD 16450
10500
PD 16500 10500 PD 16550 10500 PD 16600 10500 PD 16650 10500 PD 16700 10500 PD
16750 10500 PD 16771 10500 PD 16937 10500 PU 16950 10500 PD 17000 10500 PD
17050
10500 PD 17100 10500 PD 17150 10500 PD 17200 10500 PD 17250 10500 PD 17300
10500
PD 17350 10500 PD 17400 10500 PD 17437 10500 PD 17603 10500 PU 17650 10500 PD
17700 10500 PD 17750 10500 PD 17800 10500 PD 17850 10500 PD 17900 10500 PD
17950
10500 PD 18000 10500 PD 18050 10500 PD 18100 10500 PD 18103 10500 PD 18269
10500
PU 18300 10500 PD 18350 10500 PD 18400 10500 PD 18450 10500 PD 18500 10500 PD
18550 10500 PD 18600 10500 PD 18650 10500 PD 18700 10500 PD 18750 10500 PD
18769
10500 PD 18935 10500 PU 18950 10500 PD 19000 10500 PD 19050 10500 PD 19100
10500
PD 19150 10500 PD 19200 10500 PD 19250 10500 PD 19300 10500 PD 19350 10500 PD
19400 10500 PD 19435 10500 PD 19601 10500 PU 19650 10500 PD 19700 10500 PD
19750
10500 PD 19800 10500 PD 19800 10500 PD 19850 10500 PD 19900 10500 PD 19950
10500
PD 20000 10500 PD 20050 10500 PD 20100 10500 PD 20101 10500 PD 20267 10500 PU
20300 10500 PD 20350 10500 PD 20400 10500 PD 20450 10500 PD 20500 10500 PD
20550
10500 PD 20600 10500 PD 20650 10500 PD 20700 10500 PD 20750 10500 PD 20767
10500
PD 20933 10500 PU 20950 10500 PD 21000 10500 PD 21050 10500 PD 21100 10500 PD
21150 10500 PD 21200 10500 PD 21250 10500 PD 21300 10500 PD 21350 10500 PD
21400
10500 PD 21433 10500 PD 21599 10500 PU 21600 10500 PD 21650 10500 PD 21700
10500
PD 21750 10500 PD 21800 10500 PD 21850 10500 PD 21900 10500 PD 21950 10500 PD
22000 10500 PD 22050 10500 PD 22099 10500 PD 22265 10500 PU 22300 10500 PD
22350
10500 PD 22400 10500 PD 22450 10500 PD 22500 10500 PD 22550 10500 PD 22600
10500
PD 22650 10500 PD 22700 10500 PD 22750 10500 PD 22765 10500 PD 22931 10500 PU
22949 10500 PD 22999 10500 PD 23049 10500 PD 23099 10500 PD 23149 10500 PD
23199
10500 PD 23249 10500 PD 23299 10500 PD 23349 10500 PD 23399 10500 PD 23431
10500
PD 23597 10500 PU 23599 10500 PD 23649 10500 PD 23699 10500 PD 23749 10500 PD
23799 10500 PD 23849 10500 PD 23899 10500 PD 23949 10500 PD 23999 10500 PD
24049
10500 PD 24097 10500 PD 24263 10500 PU 24299 10500 PD 24349 10500 PD 24399
10500
PD 24449 10500 PD 24499 10500 PD 24549 10500 PD 24599 10500 PD 24649 10500 PD
24699 10500 PD 24749 10500 PD 24750 10500 PD ST 2 SP NP 4776 2948 PU 4705 3019
PD 4562 3019 PD 4491 2948 PD 4491 2591 PD 4562 2520 PD 4705 2520 PD 4776 2591
PD
4776 2948 PD 14781 2877 PU 14906 3019 PD 14906 2520 PD 24946 2823 PU 25018 2752
PD 25018 2645 PD 24946 2574 PD 24857 2574 PD 24697 2823 PD 24607 2823 PD 24536
2752 PD 24536 2645 PD 24607 2574 PD 24697 2574 PD 24857 2823 PD 24946 2823 PD
4281 3788 PU 4210 3859 PD 4067 3859 PD 3996 3788 PD 3996 3431 PD 4067 3360 PD
4210 3360 PD 4281 3431 PD 4281 3788 PD 3366 10681 PU 3741 10681 PD 3651 10360
PU
3651 10681 PD 3473 10681 PU 3437 10360 PD 3901 10360 PU 4187 10859 PD 4418
10735
PU 4418 10788 PD 4490 10859 PD 4615 10859 PD 4686 10788 PD 4686 10699 PD 4401
10360 PD 4704 10360 PD 3960 17541 PU 4335 17541 PD 4245 17220 PU 4245 17541 PD
4067 17541 PU 4031 17220 PD 8130 8820 PU 8255 8820 PD 8318 8857 PD 8368 8920 PD
8368 9070 PD 8318 9132 PD 8255 9170 PD 8130 9170 PD 8130 8820 PD 8530 9170 PU
8655 9170 PD 8593 9170 PU 8593 8820 PD 8530 8820 PU 8655 8820 PD 9055 9132 PU
9017 9170 PD 8867 9170 PD 8830 9132 PD 8830 9032 PD 8867 8995 PD 9017 8995 PD
9055 8957 PD 9055 8857 PD 9017 8820 PD 8867 8820 PD 8830 8857 PD 9404 9107 PU
9342 9170 PD 9242 9170 PD 9179 9107 PD 9179 8882 PD 9242 8820 PD 9342 8820 PD
9404 8882 PD 9404 9107 PD 9666 8995 PU 9754 8820 PD 9542 8820 PU 9542 9170 PD
9666 9170 PD 9716 9157 PD 9754 9120 PD 9754 9045 PD 9716 9007 PD 9666 8995 PD
9542 8995 PD 9879 8820 PU 10004 8820 PD 10066 8857 PD 10116 8920 PD 10116 9070
PD 10066 9132 PD 10004 9170 PD 9879 9170 PD 9879 8820 PD 10453 8820 PU 10228
8820 PD 10228 9170 PD 10453 9170 PD 10228 8995 PU 10391 8995 PD 10715 8995 PU
10803 8820 PD 10590 8820 PU 10590 9170 PD 10715 9170 PD 10765 9157 PD 10803
9120
PD 10803 9045 PD 10765 9007 PD 10715 8995 PD 10590 8995 PD 11152 8820 PU 10928
8820 PD 10928 9170 PD 11152 9170 PD 10928 8995 PU 11090 8995 PD 11277 8820 PU
11402 8820 PD 11465 8857 PD 11514 8920 PD 11514 9070 PD 11465 9132 PD 11402
9170
PD 11277 9170 PD 11277 8820 PD 8157 8267 PU 8095 8330 PD 7995 8330 PD 7932 8267
PD 7932 8042 PD 7995 7980 PD 8095 7980 PD 8157 8042 PD 8157 8267 PD 8507 8292
PU
8469 8330 PD 8320 8330 PD 8282 8292 PD 8282 8192 PD 8320 8155 PD 8469 8155 PD
8507 8117 PD 8507 8017 PD 8469 7980 PD 8320 7980 PD 8282 8017 PD 8869 8042 PU
8807 7980 PD 8694 7980 PD 8632 8042 PD 8632 8267 PD 8694 8330 PD 8807 8330 PD
8869 8267 PD 9031 8330 PU 9156 8330 PD 9094 8330 PU 9094 7980 PD 9031 7980 PU
9156 7980 PD 9344 8330 PU 9344 7980 PD 9568 7980 PD 9693 8330 PU 9693 7980 PD
9918 7980 PD 10018 7980 PU 10143 8330 PD 10268 7980 PD 10068 8105 PU 10218 8105
PD 10367 8330 PU 10617 8330 PD 10492 8330 PU 10492 7980 PD 10780 8330 PU 10904
8330 PD 10842 8330 PU 10842 7980 PD 10780 7980 PU 10904 7980 PD 11079 7980 PU
11079 8330 PD 11304 7980 PD 11304 8330 PD 11566 8130 PU 11666 8130 PD 11666
8042
PD 11604 7980 PD 11491 7980 PD 11429 8042 PD 11429 8267 PD 11491 8330 PD 11604
8330 PD 11666 8267 PD 19047 9107 PU 18985 9170 PD 18885 9170 PD 18822 9107 PD
18822 8882 PD 18885 8820 PD 18985 8820 PD 19047 8882 PD 19047 9107 PD 19309
8995
PU 19397 8820 PD 19185 8820 PU 19185 9170 PD 19309 9170 PD 19359 9157 PD 19397
9120 PD 19397 9045 PD 19359 9007 PD 19309 8995 PD 19185 8995 PD 19522 8820 PU
19647 8820 PD 19709 8857 PD 19759 8920 PD 19759 9070 PD 19709 9132 PD 19647
9170
PD 19522 9170 PD 19522 8820 PD 20096 8820 PU 19871 8820 PD 19871 9170 PD 20096
9170 PD 19871 8995 PU 20034 8995 PD 20358 8995 PU 20446 8820 PD 20234 8820 PU
20234 9170 PD 20358 9170 PD 20408 9157 PD 20446 9120 PD 20446 9045 PD 20408
9007
PD 20358 8995 PD 20234 8995 PD 20795 8820 PU 20571 8820 PD 20571 9170 PD 20795
9170 PD 20571 8995 PU 20733 8995 PD 20920 8820 PU 21045 8820 PD 21108 8857 PD
21158 8920 PD 21158 9070 PD 21108 9132 PD 21045 9170 PD 20920 9170 PD 20920
8820
PD 18255 8267 PU 18193 8330 PD 18093 8330 PD 18030 8267 PD 18030 8042 PD 18093
7980 PD 18193 7980 PD 18255 8042 PD 18255 8267 PD 18605 8292 PU 18567 8330 PD
18418 8330 PD 18380 8292 PD 18380 8192 PD 18418 8155 PD 18567 8155 PD 18605
8117
PD 18605 8017 PD 18567 7980 PD 18418 7980 PD 18380 8017 PD 18967 8042 PU 18905
7980 PD 18792 7980 PD 18730 8042 PD 18730 8267 PD 18792 8330 PD 18905 8330 PD
18967 8267 PD 19129 8330 PU 19254 8330 PD 19192 8330 PU 19192 7980 PD 19129
7980
PU 19254 7980 PD 19441 8330 PU 19441 7980 PD 19666 7980 PD 19791 8330 PU 19791
7980 PD 20016 7980 PD 20116 7980 PU 20241 8330 PD 20366 7980 PD 20166 8105 PU
20316 8105 PD 20465 8330 PU 20715 8330 PD 20590 8330 PU 20590 7980 PD 20878
8330
PU 21002 8330 PD 20940 8330 PU 20940 7980 PD 20878 7980 PU 21002 7980 PD 21177
7980 PU 21177 8330 PD 21402 7980 PD 21402 8330 PD 21664 8130 PU 21764 8130 PD
21764 8042 PD 21702 7980 PD 21589 7980 PD 21527 8042 PD 21527 8267 PD 21589
8330
PD 21702 8330 PD 21764 8267 PD 9355 16030 PU 9480 16030 PD 9417 16030 PU 9417
15680 PD 9355 15680 PU 9480 15680 PD 9655 15680 PU 9655 16030 PD 9879 15680 PD
9879 16030 PD 10241 15742 PU 10179 15680 PD 10067 15680 PD 10004 15742 PD 10004
15967 PD 10067 16030 PD 10179 16030 PD 10241 15967 PD 10579 15967 PU 10516
16030
PD 10416 16030 PD 10354 15967 PD 10354 15742 PD 10416 15680 PD 10516 15680 PD
10579 15742 PD 10579 15967 PD 10691 15680 PU 10691 16030 PD 10816 15842 PD
10941
16030 PD 10941 15680 PD 11041 15680 PU 11041 16030 PD 11166 15842 PD 11290
16030
PD 11290 15680 PD 11628 15680 PU 11403 15680 PD 11403 16030 PD 11628 16030 PD
11403 15855 PU 11565 15855 PD 11752 15680 PU 11752 16030 PD 11977 15680 PD
11977
16030 PD 12327 15992 PU 12289 16030 PD 12140 16030 PD 12102 15992 PD 12102
15892
PD 12140 15855 PD 12289 15855 PD 12327 15817 PD 12327 15717 PD 12289 15680 PD
12140 15680 PD 12102 15717 PD 12452 16030 PU 12452 15742 PD 12514 15680 PD
12614
15680 PD 12676 15742 PD 12676 16030 PD 12939 15855 PU 13026 15680 PD 12814
15680
PU 12814 16030 PD 12939 16030 PD 12989 16017 PD 13026 15980 PD 13026 15905 PD
12989 15867 PD 12939 15855 PD 12814 15855 PD 13138 15680 PU 13263 16030 PD
13388
15680 PD 13188 15805 PU 13338 15805 PD 13488 16030 PU 13738 16030 PD 13613
16030
PU 13613 15680 PD 14075 15680 PU 13850 15680 PD 13850 16030 PD 14075 16030 PD
13850 15855 PU 14013 15855 PD 15704 16030 PU 15829 16030 PD 15767 16030 PU
15767
15680 PD 15704 15680 PU 15829 15680 PD 16004 15680 PU 16004 16030 PD 16229
15680
PD 16229 16030 PD 16591 15742 PU 16529 15680 PD 16416 15680 PD 16354 15742 PD
16354 15967 PD 16416 16030 PD 16529 16030 PD 16591 15967 PD 16928 15967 PU
16866
16030 PD 16766 16030 PD 16703 15967 PD 16703 15742 PD 16766 15680 PD 16866
15680
PD 16928 15742 PD 16928 15967 PD 17041 15680 PU 17041 16030 PD 17165 15842 PD
17290 16030 PD 17290 15680 PD 17390 15680 PU 17390 16030 PD 17515 15842 PD
17640
16030 PD 17640 15680 PD 17977 15680 PU 17752 15680 PD 17752 16030 PD 17977
16030
PD 17752 15855 PU 17915 15855 PD 18102 15680 PU 18102 16030 PD 18327 15680 PD
18327 16030 PD 18676 15992 PU 18639 16030 PD 18489 16030 PD 18452 15992 PD
18452
15892 PD 18489 15855 PD 18639 15855 PD 18676 15817 PD 18676 15717 PD 18639
15680
PD 18489 15680 PD 18452 15717 PD 18801 16030 PU 18801 15742 PD 18864 15680 PD
18964 15680 PD 19026 15742 PD 19026 16030 PD 19288 15855 PU 19376 15680 PD
19163
15680 PU 19163 16030 PD 19288 16030 PD 19338 16017 PD 19376 15980 PD 19376
15905
PD 19338 15867 PD 19288 15855 PD 19163 15855 PD 19488 15680 PU 19613 16030 PD
19738 15680 PD 19538 15805 PU 19688 15805 PD 19838 16030 PU 20087 16030 PD
19962
16030 PU 19962 15680 PD 20424 15680 PU 20200 15680 PD 20200 16030 PD 20424
16030
PD 20200 15855 PU 20362 15855 PD 19285 7359 PU 19195 7270 PD 19195 6949 PD
19285
6860 PD 19606 7359 PU 19784 7359 PD 19695 7359 PU 19695 6860 PD 19606 6860 PU
19784 6860 PD 20105 7359 PU 20194 7270 PD 20194 6949 PD 20105 6860 PD 9187 7359
PU 9097 7270 PD 9097 6949 PD 9187 6860 PD 9508 7359 PU 9686 7359 PD 9597 7359
PU
9597 6860 PD 9508 6860 PU 9686 6860 PD 10007 7359 PU 10185 7359 PD 10096 7359
PU
10096 6860 PD 10007 6860 PU 10185 6860 PD 10507 7359 PU 10596 7270 PD 10596
6949
PD 10507 6860 PD 16013 14919 PU 15924 14830 PD 15924 14509 PD 16013 14420 PD
16334 14919 PU 16513 14919 PD 16423 14919 PU 16423 14420 PD 16334 14420 PU
16513
14420 PD 16834 14919 PU 17012 14919 PD 16923 14919 PU 16923 14420 PD 16834
14420
PU 17012 14420 PD 17333 14919 PU 17511 14919 PD 17422 14919 PU 17422 14420 PD
17333 14420 PU 17511 14420 PD 17833 14919 PU 17922 14830 PD 17922 14509 PD
17833
14420 PD 12357 14919 PU 12268 14830 PD 12268 14509 PD 12357 14420 PD 12678
14919
PU 12857 14919 PD 12767 14919 PU 12767 14420 PD 12678 14420 PU 12857 14420 PD
13089 14919 PU 13267 14420 PD 13445 14919 PD 13677 14919 PU 13766 14830 PD
13766
14509 PD 13677 14420 PD 9499 1829 PU 9677 1829 PD 9588 1829 PU 9588 1330 PD
9499
1330 PU 9677 1330 PD 9927 1330 PU 9927 1829 PD 10248 1330 PD 10248 1829 PD
10408
1829 PU 10587 1330 PD 10765 1829 PD 11247 1330 PU 10926 1330 PD 10926 1829 PD
11247 1829 PD 10926 1580 PU 11158 1580 PD 11621 1580 PU 11746 1330 PD 11443
1330
PU 11443 1829 PD 11621 1829 PD 11693 1812 PD 11746 1758 PD 11746 1651 PD 11693
1598 PD 11621 1580 PD 11443 1580 PD 12246 1776 PU 12192 1829 PD 11978 1829 PD
11925 1776 PD 11925 1633 PD 11978 1580 PD 12192 1580 PD 12246 1526 PD 12246
1384
PD 12192 1330 PD 11978 1330 PD 11925 1384 PD 12745 1330 PU 12424 1330 PD 12424
1829 PD 12745 1829 PD 12424 1580 PU 12656 1580 PD 13405 1829 PU 13762 1829 PD
13584 1829 PU 13584 1330 PD 14244 1330 PU 13923 1330 PD 13923 1829 PD 14244
1829
PD 13923 1580 PU 14155 1580 PD 14404 1330 PU 14404 1829 PD 14583 1562 PD 14761
1829 PD 14761 1330 PD 14939 1330 PU 14939 1829 PD 15118 1829 PD 15189 1812 PD
15243 1758 PD 15243 1651 PD 15189 1598 PD 15118 1580 PD 14939 1580 PD 15742
1330
PU 15421 1330 PD 15421 1829 PD 15742 1829 PD 15421 1580 PU 15653 1580 PD 16117
1580 PU 16242 1330 PD 15938 1330 PU 15938 1829 PD 16117 1829 PD 16188 1812 PD
16242 1758 PD 16242 1651 PD 16188 1598 PD 16117 1580 PD 15938 1580 PD 16402
1330
PU 16581 1829 PD 16759 1330 PD 16474 1508 PU 16688 1508 PD 16902 1829 PU 17258
1829 PD 17080 1829 PU 17080 1330 PD 17419 1829 PU 17419 1419 PD 17508 1330 PD
17651 1330 PD 17740 1419 PD 17740 1829 PD 18115 1580 PU 18240 1330 PD 17936
1330
PU 17936 1829 PD 18115 1829 PD 18186 1812 PD 18240 1758 PD 18240 1651 PD 18186
1598 PD 18115 1580 PD 17936 1580 PD 18739 1330 PU 18418 1330 PD 18418 1829 PD
18739 1829 PD 18418 1580 PU 18650 1580 PD 19417 1794 PU 19470 1829 PD 19542
1829
PD 19756 1330 PD 19631 1615 PU 19417 1330 PD 2683 7554 PU 2772 7464 PD 2772
7304
PD 2683 7215 PD 2362 7215 PD 2273 7304 PD 2273 7464 PD 2362 7554 PD 2772 7714
PU
2273 7714 PD 2273 8035 PU 2772 8035 PD 2522 7714 PU 2522 8035 PD 2273 8285 PU
2273 8463 PD 2273 8374 PU 2772 8374 PD 2772 8285 PU 2772 8463 PD 2522 8909 PU
2772 9034 PD 2772 8731 PU 2273 8731 PD 2273 8909 PD 2290 8981 PD 2344 9034 PD
2451 9034 PD 2504 8981 PD 2522 8909 PD 2522 8731 PD 2772 9195 PU 2273 9373 PD
2772 9552 PD 2594 9266 PU 2594 9480 PD 2273 9730 PU 2772 9730 PD 2772 10051 PD
2772 10693 PU 2273 10872 PD 2772 11050 PD 2594 10765 PU 2594 10979 PD 2772
11211
PU 2273 11211 PD 2772 11532 PD 2273 11532 PD 2558 11906 PU 2558 12049 PD 2683
12049 PD 2772 11960 PD 2772 11799 PD 2683 11710 PD 2362 11710 PD 2273 11799 PD
2273 11960 PD 2362 12049 PD 2273 12227 PU 2772 12227 PD 2772 12548 PD 2772
13030
PU 2772 12709 PD 2273 12709 PD 2273 13030 PD 2522 12709 PU 2522 12941 PD 2451
13761 PU 2522 13690 PD 2665 13690 PD 2736 13797 PD 2736 13940 PD 2665 14047 PD
2522 14047 PD 2451 13976 PD 2451 13922 PD 2504 13868 PD 2897 13868 PD ST 2 SP
NP
997 280 PU 997 480 PD 1126 480 PD 997 380 PU 1090 380 PD 1247 466 PU 1247 480
PD
1261 480 PD 1261 466 PD 1247 466 PD 1233 408 PU 1261 408 PD 1261 280 PD 1225
280
PU 1297 280 PD 1518 380 PU 1489 408 PD 1432 408 PD 1404 380 PD 1404 323 PD 1432
294 PD 1489 294 PD 1518 323 PD 1518 408 PU 1518 259 PD 1489 230 PD 1432 230 PD
1404 251 PD 1668 280 PU 1646 280 PD 1646 301 PD 1668 301 PD 1668 280 PD 1825
423
PU 1875 480 PD 1875 280 PD ST CL
%%  GEHLEN   92/10/22 17:40:24 PLOTOUT  PAGE=  2  V3L3;
21000 RO NP 0 0 PU 29700 0 PD 29700 21000 PD 0 21000 PD IW 1 SP NP 0 0 PU 29700
0 PD 29700 21000 PD 0 21000 PD 0 0 PD 4950 17500 PU 4950 3500 PD 24750 3500 PD
24750 17500 PD 4950 17500 PD 4950 16833 PU 4600 16833 PD 4950 15167 PU 4750
15167 PD 4950 13500 PU 4600 13500 PD 4950 11833 PU 4750 11833 PD 4950 10167 PU
4600 10167 PD 4950 8500 PU 4750 8500 PD 4950 6833 PU 4600 6833 PD 4950 5167 PU
4750 5167 PD 4950 3500 PU 4600 3500 PD 4950 3500 PU 4950 3150 PD 5940 3500 PU
5940 3300 PD 6930 3500 PU 6930 3300 PD 7920 3500 PU 7920 3300 PD 8910 3500 PU
8910 3300 PD 9900 3500 PU 9900 3150 PD 10890 3500 PU 10890 3300 PD 11880 3500
PU
11880 3300 PD 12870 3500 PU 12870 3300 PD 13860 3500 PU 13860 3300 PD 14850
3500
PU 14850 3150 PD 15840 3500 PU 15840 3300 PD 16830 3500 PU 16830 3300 PD 17820
3500 PU 17820 3300 PD 18810 3500 PU 18810 3300 PD 19800 3500 PU 19800 3150 PD
20790 3500 PU 20790 3300 PD 21780 3500 PU 21780 3300 PD 22770 3500 PU 22770
3300
PD 23760 3500 PU 23760 3300 PD 24750 3500 PU 24750 3150 PD 24750 3500 PU 24400
3500 PD 24750 5167 PU 24550 5167 PD 24750 6833 PU 24400 6833 PD 24750 8500 PU
24550 8500 PD 24750 10167 PU 24400 10167 PD 24750 11833 PU 24550 11833 PD 24750
13500 PU 24400 13500 PD 24750 15167 PU 24550 15167 PD 24750 16833 PU 24400
16833
PD 24750 17500 PU 24750 17150 PD 23760 17500 PU 23760 17300 PD 22770 17500 PU
22770 17300 PD 21780 17500 PU 21780 17300 PD 20790 17500 PU 20790 17300 PD
19800
17500 PU 19800 17150 PD 18810 17500 PU 18810 17300 PD 17820 17500 PU 17820
17300
PD 16830 17500 PU 16830 17300 PD 15840 17500 PU 15840 17300 PD 14850 17500 PU
14850 17150 PD 13860 17500 PU 13860 17300 PD 12870 17500 PU 12870 17300 PD
11880
17500 PU 11880 17300 PD 10890 17500 PU 10890 17300 PD 9900 17500 PU 9900 17150
PD 8910 17500 PU 8910 17300 PD 7920 17500 PU 7920 17300 PD 6930 17500 PU 6930
17300 PD 5940 17500 PU 5940 17300 PD 4950 17500 PU 4950 17150 PD 4167 17050 PU
4013 16725 PD 4338 16725 PD 4229 16617 PU 4229 16880 PD 4044 13655 PU 4106
13716
PD 4229 13716 PD 4291 13655 PD 4291 13577 PD 4229 13515 PD 4106 13515 PD 4229
13515 PD 4291 13454 PD 4291 13345 PD 4229 13284 PD 4106 13284 PD 4044 13345 PD
4059 10275 PU 4059 10321 PD 4121 10383 PD 4229 10383 PD 4291 10321 PD 4291
10244
PD 4044 9950 PD 4307 9950 PD 4090 6926 PU 4198 7050 PD 4198 6617 PD 4291 3655
PU
4229 3716 PD 4106 3716 PD 4044 3655 PD 4044 3345 PD 4106 3284 PD 4229 3284 PD
4291 3345 PD 4291 3655 PD 14756 8593 PU 14944 8405 PD 14944 8593 PU 14756 8405
PD 18716 9006 PU 18904 8818 PD 18904 9006 PU 18716 8818 PD 22676 11257 PU 22864
11069 PD 22864 11257 PU 22676 11069 PD 6836 12165 PU 7024 11977 PD 7024 12165
PU
6836 11977 PD 10796 10746 PU 10984 10559 PD 10984 10746 PU 10796 10559 PD 14756
8593 PU 14944 8406 PD 14944 8593 PU 14756 8406 PD 18056 8713 PU 18244 8526 PD
18244 8713 PU 18056 8526 PD 21356 10533 PU 21544 10346 PD 21544 10533 PU 21356
10346 PD 24656 12000 PU 24844 11812 PD 24844 12000 PU 24656 11812 PD 8156 11927
PU 8344 11740 PD 8344 11927 PU 8156 11740 PD 11456 10354 PU 11644 10166 PD
11644
10354 PU 11456 10166 PD 4856 12000 PU 5044 11812 PD 5044 12000 PU 4856 11812 PD
14756 8594 PU 14944 8406 PD 14944 8594 PU 14756 8406 PD 17585 8549 PU 17772
8362
PD 17772 8549 PU 17585 8362 PD 20413 9965 PU 20601 9778 PD 20601 9965 PU 20413
9778 PD 23242 11520 PU 23429 11332 PD 23429 11520 PU 23242 11332 PD 6271 12182
PU 6458 11995 PD 6458 12182 PU 6271 11995 PD 9099 11599 PU 9286 11411 PD 9286
11599 PU 9099 11411 PD 11928 10065 PU 12115 9878 PD 12115 10065 PU 11928 9878
PD
14756 8594 PU 14944 8406 PD 14944 8594 PU 14756 8406 PD 17231 8454 PU 17419
8267
PD 17419 8454 PU 17231 8267 PD 19706 9543 PU 19894 9356 PD 19894 9543 PU 19706
9356 PD 22181 11001 PU 22369 10814 PD 22369 11001 PU 22181 10814 PD 24656 12000
PU 24844 11812 PD 24844 12000 PU 24656 11812 PD 7331 12108 PU 7519 11920 PD
7519
12108 PU 7331 11920 PD 9806 11278 PU 9994 11091 PD 9994 11278 PU 9806 11091 PD
12281 9849 PU 12469 9662 PD 12469 9849 PU 12281 9662 PD 4856 12000 PU 5044
11812
PD 5044 12000 PU 4856 11812 PD 14756 8594 PU 14944 8406 PD 14944 8594 PU 14756
8406 PD 16956 8400 PU 17144 8212 PD 17144 8400 PU 16956 8212 PD 19156 9234 PU
19344 9046 PD 19344 9234 PU 19156 9046 PD 21356 10533 PU 21544 10346 PD 21544
10533 PU 21356 10346 PD 23556 11649 PU 23744 11462 PD 23744 11649 PU 23556
11462
PD 5956 12169 PU 6144 11982 PD 6144 12169 PU 5956 11982 PD 8156 11927 PU 8344
11740 PD 8344 11927 PU 8156 11740 PD 10356 10992 PU 10544 10805 PD 10544 10992
PU 10356 10805 PD 12556 9683 PU 12744 9496 PD 12744 9683 PU 12556 9496 PD 14756
8594 PU 14944 8406 PD 14944 8594 PU 14756 8406 PD 16736 8368 PU 16924 8181 PD
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PD 20696 10137 PU 20884 9949 PD 20884 10137 PU 20696 9949 PD 22676 11257 PU
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PU
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PU 23756 11538 PD 5756 12152 PU 5944 11965 PD 5944 12152 PU 5756 11965 PD 7556
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PU 16406 8154 PD 18056 8713 PU 18244 8526 PD 18244 8713 PU 18056 8526 PD 19706
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PU 6694 11994 PD 6694 12181 PU 6506 11994 PD 8156 11927 PU 8344 11740 PD 8344
11927 PU 8156 11740 PD 9806 11278 PU 9994 11091 PD 9994 11278 PU 9806 11091 PD
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9174 PD 13294 9362 PU 13106 9174 PD 4856 12000 PU 5044 11812 PD 5044 12000 PU
4856 11812 PD ST 1 SP NP 4950 11906 PU 4998 11921 PD 5046 11935 PD 5095 11950
PD
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PD 5432 12039 PD 5445 12042 PD 5494 12053 PD 5543 12064 PD 5593 12074 PD 5642
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PD 6189 12153 PD 6239 12157 PD 6289 12159 PD 6339 12161 PD 6389 12163 PD 6435
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PD 7029 12130 PD 7078 12124 PD 7128 12117 PD 7177 12110 PD 7226 12102 PD 7276
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PD 7813 11971 PD 7861 11957 PD 7910 11943 PD 7920 11940 PD 7967 11926 PD 8015
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PD 8554 11721 PD 8601 11703 PD 8647 11685 PD 8694 11666 PD 8740 11647 PD 8786
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PD 9321 11394 PD 9367 11373 PD 9405 11355 PD 9450 11334 PD 9495 11313 PD 9495
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PD 10034 11052 PD 10079 11029 PD 10124 11007 PD 10168 10985 PD 10213 10962 PD
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PD 10706 10710 PD 10750 10687 PD 10795 10664 PD 10839 10640 PD 10883 10617 PD
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10378
PD 11375 10355 PD 11385 10349 PD 11429 10326 PD 11473 10302 PD 11516 10278 PD
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PD 12011 10005 PD 12054 9980 PD 12098 9956 PD 12141 9931 PD 12185 9907 PD 12229
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PD 12722 9601 PD 12766 9576 PD 12809 9551 PD 12853 9526 PD 12870 9516 PD 12913
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PD 13409 9210 PD 13453 9185 PD 13497 9161 PD 13540 9137 PD 13584 9113 PD 13628
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PD 14083 8848 PD 14128 8825 PD 14173 8803 PD 14217 8781 PD 14262 8759 PD 14307
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PD 14814 8514 PD 14850 8500 PD 14897 8482 PD 14945 8464 PD 14992 8447 PD 15040
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8284
PD 15589 8273 PD 15638 8262 PD 15687 8253 PD 15736 8244 PD 15785 8235 PD 15834
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PD 16385 8186 PD 16435 8186 PD 16485 8187 PD 16535 8189 PD 16585 8192 PD 16634
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PD 17223 8286 PD 17272 8297 PD 17321 8310 PD 17325 8311 PD 17373 8323 PD 17420
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PD 17959 8519 PD 18005 8537 PD 18051 8556 PD 18097 8575 PD 18097 8575 PU 18144
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PD 18675 8842 PD 18720 8865 PD 18765 8888 PD 18810 8911 PD 18810 8911 PD 18854
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9174
PD 19349 9198 PD 19392 9222 PD 19436 9246 PD 19480 9271 PD 19523 9295 PD 19567
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PD 20061 9597 PD 20105 9621 PD 20149 9646 PD 20192 9670 PD 20236 9695 PD 20279
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9972
PD 20775 9996 PD 20790 10004 PD 20834 10028 PD 20878 10052 PD 20922 10076 PD
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10322
PD 21417 10346 PD 21461 10370 PD 21505 10393 PD 21549 10417 PD 21593 10441 PD
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10680
PD 22090 10703 PD 22134 10726 PD 22179 10749 PD 22223 10772 PD 22223 10772 PU
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PD 22720 11026 PD 22765 11049 PD 22770 11051 PD 22815 11074 PD 22860 11096 PD
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PD 23356 11338 PD 23401 11359 PD 23447 11380 PD 23492 11402 PD 23537 11423 PD
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PD 24083 11661 PD 24129 11680 PD 24175 11698 PD 24221 11717 PD 24255 11730 PD
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PD 24750 11906 PD ST 1 SP NP 14850 6933 PU 14742 6746 PD 14958 6746 PD 14850
6933 PD 18810 8271 PU 18702 8084 PD 18918 8084 PD 18810 8271 PD 22770 12617 PU
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PD 14850 6946 PU 14742 6759 PD 14958 6759 PD 14850 6946 PD 18150 7578 PU 18042
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PD
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PD
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13060
PD 6364 14123 PU 6256 13935 PD 6472 13935 PD 6364 14123 PD 9193 13019 PU 9085
12832 PD 9301 12832 PD 9193 13019 PD 12021 10106 PU 11913 9918 PD 12130 9918 PD
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19908 9236 PD 19800 9424 PD 22275 12166 PU 22167 11979 PD 22383 11979 PD 22275
12166 PD 24750 13854 PU 24642 13667 PD 24858 13667 PD 24750 13854 PD 7425 13962
PU 7317 13775 PD 7533 13775 PD 7425 13962 PD 9900 12427 PU 9792 12239 PD 10008
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6770
PD 14958 6770 PD 14850 6958 PD 17050 6726 PU 16942 6539 PD 17158 6539 PD 17050
6726 PD 19250 8776 PU 19142 8589 PD 19358 8589 PD 19250 8776 PD 21450 11328 PU
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PD
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8088 PD 18810 8275 PD 20790 10591 PU 20682 10403 PD 20898 10403 PD 20790 10591
PD 22770 12613 PU 22662 12426 PD 22878 12426 PD 22770 12613 PD 24750 13855 PU
24642 13668 PD 24858 13668 PD 24750 13855 PD 6930 14077 PU 6822 13890 PD 7038
13890 PD 6930 14077 PD 8910 13225 PU 8802 13038 PD 9018 13038 PD 8910 13225 PD
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8864 PD 12978 8864 PD 12870 9051 PD 4950 13855 PU 4842 13668 PD 5058 13668 PD
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PU 16542 6366 PD 16758 6366 PD 16650 6553 PD 18450 7886 PU 18342 7699 PD 18558
7699 PD 18450 7886 PD 20250 9959 PU 20142 9772 PD 20358 9772 PD 20250 9959 PD
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PD
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PU 9342 12631 PD 9558 12631 PD 9450 12818 PD 11250 11020 PU 11142 10833 PD
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PD 16608 6324 PD 16500 6511 PD 18150 7583 PU 18042 7396 PD 18258 7396 PD 18150
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PD 6600 14116 PU 6492 13929 PD 6708 13929 PD 6600 14116 PD 8250 13625 PU 8142
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8648 PU 13092 8461 PD 13308 8461 PD 13200 8648 PD 4950 13855 PU 4842 13668 PD
5058 13668 PD 4950 13855 PD ST 1 SP NP 4950 13730 PU 4999 13744 PD 5030 13753
PD
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13851
PD 5445 13852 PD 5495 13862 PD 5517 13866 PD 5681 13891 PU 5693 13893 PD 5742
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13932
PD 6485 13930 PD 6511 13929 PD 6678 13919 PU 6684 13918 PD 6734 13914 PD 6761
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13794
PD 7473 13781 PD 7496 13775 PD 7656 13728 PU 7663 13726 PD 7711 13711 PD 7736
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13439
PD 8415 13420 PD 8426 13414 PD 8573 13337 PU 8589 13328 PD 8632 13304 PD 8646
13296 PD 8790 13212 PU 8805 13202 PD 8849 13175 PD 8860 13168 PD 9000 13078 PU
9032 13056 PD 9069 13031 PD 9205 12935 PU 9236 12913 PD 9273 12886 PD 9405
12785
PU 9443 12755 PD 9470 12734 PD 9600 12629 PU 9634 12600 PD 9663 12575 PD 9789
12466 PU 9825 12434 PD 9851 12411 PD 9974 12298 PU 10007 12267 PD 10035 12241
PD
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11556
PD 10728 11523 PD 10839 11398 PU 10867 11366 PD 10890 11340 PD 10894 11336 PD
11002 11209 PU 11018 11191 PD 11051 11153 PD 11056 11146 PD 11164 11019 PU
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PD 11375 10762 PD 11480 10632 PU 11509 10595 PD 11532 10567 PD 11636 10437 PU
11665 10400 PD 11687 10372 PD 11790 10241 PU 11820 10202 PD 11841 10175 PD
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9407
PD 12453 9385 PD 12555 9254 PU 12560 9248 PD 12590 9209 PD 12606 9188 PD 12709
9057 PU 12714 9051 PD 12744 9012 PD 12760 8992 PD 12864 8861 PU 12868 8856 PD
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PD 13072 8601 PD 13177 8472 PU 13187 8461 PD 13218 8423 PD 13230 8408 PD 13337
8281 PU 13345 8272 PD 13365 8248 PD 13391 8217 PD 13500 8091 PU 13532 8055 PD
13555 8028 PD 13666 7904 PU 13698 7868 PD 13722 7843 PD 13835 7721 PU 13860
7695
PD 13893 7661 PD 14009 7542 PU 14040 7511 PD 14068 7483 PD 14189 7368 PU 14220
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6847
PD 14834 6844 PD 14974 6754 PU 14982 6750 PD 15025 6724 PD 15046 6712 PD 15193
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PD 15903 6405 PU 15940 6400 PD 15985 6395 PD 16152 6388 PU 16190 6388 PD 16235
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6562
PD 17111 6632 PU 17145 6649 PD 17185 6670 PD 17329 6753 PU 17366 6775 PD 17400
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17803 7091 PD 17931 7198 PU 17968 7230 PD 17994 7253 PD 18117 7365 PU 18152
7398
PD 18177 7422 PD 18296 7538 PU 18300 7542 PD 18315 7557 PD 18349 7591 PD 18355
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18656 7916 PD 18690 7954 PD 18697 7962 PD 18807 8086 PU 18810 8089 PD 18842
8126
PD 18862 8149 PD 18971 8275 PU 18971 8275 PD 19003 8313 PD 19025 8338 PD 19131
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PD 19499 8918 PD 19602 9049 PU 19616 9066 PD 19647 9106 PD 19654 9114 PD 19757
9245 PU 19772 9264 PD 19800 9300 PD 19808 9311 PD 19911 9442 PU 19923 9457 PD
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PD 20218 9835 PU 20231 9852 PD 20262 9891 PD 20270 9901 PD 20372 10032 PU 20388
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10288
PD 20579 10293 PD 20683 10423 PU 20699 10444 PD 20730 10483 PD 20735 10488 PD
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PD 21212 11066 PD 21320 11192 PU 21352 11229 PD 21375 11255 PD 21485 11380 PU
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11927
PU 22027 11958 PD 22055 11986 PD 22174 12103 PU 22203 12131 PD 22234 12161 PD
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PU 22930 12762 PD 22970 12792 PD 22993 12809 PD 23127 12908 PU 23130 12911 PD
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PU 23760 13310 PD 23805 13334 PD 23832 13349 PD 23980 13425 PU 23985 13427 PD
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PD 24674 13707 PU 24678 13708 PD 24725 13723 PD 24750 13730 PD 24750 13730 PD
ST
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PU 18695 8156 PD 22770 13932 PU 22770 13667 PD 22655 13733 PU 22885 13865 PD
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15643 PD 7045 15511 PU 6815 15643 PD 10890 12313 PU 10890 12048 PD 10775 12115
PU 11005 12247 PD 11005 12115 PU 10775 12247 PD 14850 5579 PU 14850 5314 PD
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PD 18035 6938 PU 18265 7071 PD 18265 6938 PU 18035 7071 PD 21450 12242 PU 21450
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PU 24750 15117 PD 24635 15184 PU 24865 15316 PD 24865 15184 PU 24635 15316 PD
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PD 11550 11184 PU 11550 10919 PD 11435 10985 PU 11665 11118 PD 11665 10985 PU
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PD 17793 6242 PU 17564 6374 PD 20507 10846 PU 20507 10581 PD 20392 10647 PU
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PD 6250 15457 PU 6479 15589 PD 6479 15457 PU 6250 15589 PD 9193 14198 PU 9193
13933 PD 9078 13999 PU 9308 14131 PD 9308 13999 PU 9078 14131 PD 12021 10347 PU
12021 10082 PD 11907 10149 PU 12136 10281 PD 12136 10149 PU 11907 10281 PD
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PD 19800 9732 PU 19800 9467 PD 19685 9534 PU 19915 9666 PD 19915 9534 PU 19685
9666 PD 22275 13266 PU 22275 13001 PD 22160 13068 PU 22390 13200 PD 22390 13068
PU 22160 13200 PD 24750 15340 PU 24750 15075 PD 24635 15141 PU 24865 15273 PD
24865 15141 PU 24635 15273 PD 7425 15415 PU 7425 15150 PD 7310 15216 PU 7540
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10015 13339 PD 10015 13206 PU 9785 13339 PD 12375 9711 PU 12375 9446 PD 12260
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PD 14735 5418 PU 14965 5551 PD 14965 5418 PU 14735 5551 PD 17050 5665 PU 17050
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19250 8585 PD 19135 8651 PU 19365 8783 PD 19365 8651 PU 19135 8783 PD 21450
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PU 8795 14373 PD 10890 12071 PU 10890 11806 PD 10775 11872 PU 11005 12005 PD
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PU 7535 15246 PD 9450 13908 PU 9450 13643 PD 9335 13709 PU 9565 13841 PD 9565
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PD 11365 11329 PU 11135 11462 PD 13050 8492 PU 13050 8228 PD 12935 8294 PU
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14157
PU 23100 13892 PD 22985 13959 PU 23215 14091 PD 23215 13959 PU 22985 14091 PD
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PU 8135 14898 PD 9900 13397 PU 9900 13132 PD 9785 13198 PU 10015 13330 PD 10015
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PD 11665 10856 PU 11435 10988 PD 13200 8224 PU 13200 7959 PD 13085 8025 PU
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PD 5423 15366 PU 5424 15367 PD 5445 15372 PD 5494 15385 PD 5503 15387 PD 5666
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PD 7217 15322 PD 7265 15307 PD 7313 15291 PD 7361 15274 PD 7409 15256 PD 7425
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14929
PD 8133 14904 PD 8134 14903 PD 8275 14815 PU 8304 14797 PD 8345 14769 PD 8482
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PD 8941 14316 PD 9066 14206 PU 9093 14181 PD 9130 14148 PD 9166 14114 PD 9203
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PD
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PD 10537 12513 PU 10537 12512 PD 10566 12472 PD 10594 12431 PD 10623 12391 PD
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PD 11022 11790 PD 11049 11749 PD 11075 11707 PD 11102 11665 PD 11128 11623 PD
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PD 11485 11033 PD 11510 10991 PD 11522 10969 PD 11606 10825 PU 11610 10819 PD
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PD 11974 10173 PU 11976 10170 PD 12000 10126 PD 12014 10100 PD 12095 9954 PU
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PD 12240 9687 PD 12254 9662 PD 12333 9515 PU 12336 9510 PD 12360 9466 PD 12373
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8782
PD 12807 8636 PU 12825 8601 PD 12849 8558 PD 12870 8519 PD 12894 8474 PD 12918
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7772
PD 13305 7729 PD 13328 7688 PD 13411 7543 PU 13416 7533 PD 13442 7489 PD 13452
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6888
PD 13826 6847 PD 13838 6829 PD 13927 6688 PU 13945 6661 PD 13973 6617 PD 14002
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5948
PD 14486 5907 PD 14519 5867 PD 14552 5828 PD 14564 5814 PD 14674 5689 PU 14684
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PD 15098 5291 PD 15234 5194 PU 15246 5186 PD 15286 5161 PD 15304 5150 PD 15451
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PD 16180 4961 PU 16189 4962 PD 16238 4972 PD 16288 4985 PD 16335 4998 PD 16379
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5341
PD 16978 5371 PD 17015 5403 PD 17052 5435 PD 17089 5469 PD 17108 5487 PD 17227
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PD 17610 6042 PD 17712 6174 PU 17733 6202 PD 17762 6240 PD 17860 6375 PU 17876
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PD 18278 6997 PU 18294 7023 PD 18315 7056 PD 18341 7097 PD 18367 7138 PD 18393
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7737
PD 18754 7781 PD 18780 7825 PD 18806 7869 PD 18810 7875 PD 18835 7918 PD 18838
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PD 19209 8568 PD 19211 8572 PD 19294 8717 PU 19305 8737 PD 19330 8780 PD 19335
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9389
PD 19702 9433 PD 19706 9440 PD 19789 9585 PU 19800 9604 PD 19825 9648 PD 19851
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PD 20321 10492 PD 20337 10518 PD 20423 10660 PU 20427 10665 PD 20453 10708 PD
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11295
PU 20846 11332 PD 20867 11365 PD 20958 11504 PU 20985 11544 PD 21013 11586 PD
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12153
PD 21433 12194 PD 21463 12235 PD 21492 12275 PD 21522 12316 PD 21552 12356 PD
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PD 22034 12975 PD 22039 12981 PD 22145 13109 PU 22161 13127 PD 22193 13165 PD
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PU 22650 13669 PD 22684 13704 PD 22704 13726 PD 22822 13844 PU 22843 13865 PD
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14240
PD 23376 14347 PU 23383 14353 PD 23422 14385 PD 23461 14417 PD 23500 14448 PD
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PD 24138 14894 PD 24181 14919 PD 24223 14943 PD 24255 14962 PD 24262 14966 PD
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PD 18918 8638 PD 18702 8638 PD 22662 15146 PU 22770 14958 PD 22878 15146 PD
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PD 14958 4533 PD 14742 4533 PD 18042 7241 PU 18150 7054 PD 18258 7241 PD 18042
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PU 24750 16461 PD 24858 16648 PD 24642 16648 PD 8142 16214 PU 8250 16027 PD
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PD 4842 16648 PU 4950 16461 PD 5058 16648 PD 4842 16648 PD 14742 4512 PU 14850
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PD 6472 16856 PD 6256 16856 PD 9085 15184 PU 9193 14997 PD 9301 15184 PD 9085
15184 PD 11913 10773 PU 12021 10586 PD 12130 10773 PD 11913 10773 PD 14742 4507
PU 14850 4320 PD 14958 4507 PD 14742 4507 PD 17217 5654 PU 17325 5466 PD 17433
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PD
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PD
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PD
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PD 16722 4855 PD 18702 8280 PU 18810 8093 PD 18918 8280 PD 18702 8280 PD 20682
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PD 22878 14720 PD 22662 14720 PD 24642 16395 PU 24750 16208 PD 24858 16395 PD
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15325 PU 8910 15138 PD 9018 15325 PD 8802 15325 PD 10782 12603 PU 10890 12416
PD
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8793 PD 4842 16395 PU 4950 16208 PD 5058 16395 PD 4842 16395 PD 14742 4526 PU
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PD 16542 4607 PD 18342 7600 PU 18450 7413 PD 18558 7600 PD 18342 7600 PD 20142
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PD 22158 13785 PD 21942 13785 PD 23742 15789 PU 23850 15602 PD 23958 15789 PD
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PD 16392 4422 PD 18042 7043 PU 18150 6856 PD 18258 7043 PD 18042 7043 PD 19692
10103 PU 19800 9916 PD 19908 10103 PD 19692 10103 PD 21342 12903 PU 21450 12715
PD 21558 12903 PD 21342 12903 PD 22992 15072 PU 23100 14885 PD 23208 15072 PD
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8358 15900 PD 8142 15900 PD 9792 14099 PU 9900 13912 PD 10008 14099 PD 9792
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PU 13200 7835 PD 13308 8022 PD 13092 8022 PD 4842 16374 PU 4950 16187 PD 5058
16374 PD 4842 16374 PD ST 1 SP NP 4950 16300 PU 4996 16322 PD 5042 16344 PD
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16545
PD 5641 16556 PD 5690 16566 PD 5733 16574 PD 5898 16598 PU 5935 16602 PD 5940
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16577
PD 6631 16569 PD 6680 16559 PD 6729 16549 PD 6778 16538 PD 6827 16526 PD 6876
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16272
PD 7558 16251 PD 7602 16229 PD 7646 16206 PD 7690 16183 PD 7734 16159 PD 7779
16134 PD 7823 16109 PD 7867 16084 PD 7911 16057 PD 7920 16052 PD 7961 16027 PD
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15836
PD 8293 15807 PD 8294 15806 PD 8428 15707 PU 8453 15688 PD 8492 15658 PD 8530
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PD 8980 15240 PD 9016 15206 PD 9051 15172 PD 9059 15165 PD 9177 15047 PU 9192
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14625
PD 9596 14587 PD 9628 14549 PD 9659 14511 PD 9691 14472 PD 9723 14433 PD 9755
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13639
PD 10326 13596 PD 10354 13552 PD 10383 13507 PD 10395 13488 PD 10420 13448 PD
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12976
PD 10787 12831 PU 10800 12808 PD 10825 12762 PD 10850 12717 PD 10876 12671 PD
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PD 11140 12169 PD 11163 12125 PD 11177 12096 PD 11252 11947 PU 11253 11943 PD
11276 11897 PD 11288 11873 PD 11361 11723 PU 11367 11711 PD 11385 11674 PD
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PD 11531 11366 PD 11551 11321 PD 11572 11276 PD 11593 11231 PD 11614 11186 PD
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10502
PD 11939 10457 PD 11958 10412 PD 11978 10367 PD 11998 10322 PD 12017 10276 PD
12037 10231 PD 12057 10185 PD 12076 10139 PD 12096 10093 PD 12115 10047 PD
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12292 9630 PD 12308 9593 PD 12372 9439 PU 12375 9432 PD 12394 9386 PD 12413
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PD 12433 9294 PD 12452 9248 PD 12471 9202 PD 12490 9155 PD 12509 9109 PD 12529
9063 PD 12548 9017 PD 12567 8970 PD 12586 8924 PD 12606 8878 PD 12625 8832 PD
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8508
PD 12778 8462 PD 12787 8440 PD 12852 8287 PU 12855 8278 PD 12870 8242 PD 12890
8195 PD 12909 8148 PD 12929 8101 PD 12949 8055 PD 12968 8008 PD 12988 7961 PD
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7683
PD 13126 7636 PD 13146 7590 PD 13165 7545 PD 13176 7520 PD 13242 7367 PU 13244
7362 PD 13264 7317 PD 13275 7291 PD 13342 7138 PU 13342 7138 PD 13362 7093 PD
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6849
PD 13493 6802 PD 13514 6756 PD 13535 6709 PD 13556 6663 PD 13578 6617 PD 13599
6572 PD 13620 6526 PD 13641 6481 PD 13663 6436 PD 13684 6391 PD 13689 6381 PD
13761 6232 PU 13769 6216 PD 13790 6173 PD 13798 6157 PD 13873 6008 PU 13884
5985
PD 13909 5937 PD 13933 5890 PD 13958 5843 PD 13982 5797 PD 14007 5751 PD 14031
5705 PD 14056 5660 PD 14080 5616 PD 14105 5572 PD 14129 5528 PD 14154 5485 PD
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PU 14385 5105 PD 14409 5069 PD 14503 4931 PU 14506 4926 PD 14536 4883 PD 14567
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PD 14929 4420 PD 14969 4383 PD 15009 4347 PD 15048 4314 PD 15053 4310 PD 15187
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15493 4064 PD 15542 4051 PD 15591 4040 PD 15640 4033 PD 15690 4029 PD 15739
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PD 15788 4028 PD 15837 4033 PD 15840 4033 PD 15886 4040 PD 15933 4049 PD 15979
4061 PD 16025 4075 PD 16072 4092 PD 16118 4111 PD 16165 4133 PD 16208 4156 PD
16350 4243 PU 16372 4259 PD 16408 4286 PD 16417 4292 PD 16545 4399 PU 16555
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PD 16591 4441 PD 16628 4477 PD 16664 4513 PD 16701 4551 PD 16738 4590 PD 16774
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16948 4837 PD 16978 4875 PD 17007 4913 PD 17037 4953 PD 17066 4993 PD 17090
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PD 17186 5162 PU 17214 5202 PD 17233 5230 PD 17325 5369 PU 17350 5409 PD 17376
5449 PD 17401 5489 PD 17427 5530 PD 17452 5572 PD 17478 5613 PD 17503 5655 PD
17529 5697 PD 17554 5740 PD 17580 5783 PD 17605 5827 PD 17631 5870 PD 17656
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PD 17682 5959 PD 17707 6004 PD 17733 6049 PD 17753 6083 PD 17834 6229 PU 17843
6247 PD 17867 6289 PD 17874 6302 PD 17953 6448 PU 17960 6462 PD 17984 6506 PD
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6771
PD 18148 6815 PD 18171 6860 PD 18194 6905 PD 18218 6950 PD 18241 6996 PD 18265
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PD 18563 7628 PD 18586 7672 PD 18608 7717 PD 18631 7762 PD 18653 7807 PD 18676
7852 PD 18698 7896 PD 18721 7941 PD 18744 7986 PD 18766 8031 PD 18789 8076 PD
18810 8118 PD 18833 8163 PD 18855 8208 PD 18878 8253 PD 18900 8298 PD 18902
8301
PD 18976 8449 PU 18991 8477 PD 19013 8522 PD 19014 8524 PD 19089 8672 PU 19103
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19239 8967 PD 19262 9012 PD 19284 9056 PD 19305 9097 PD 19328 9142 PD 19351
9187
PD 19375 9232 PD 19398 9277 PD 19421 9322 PD 19444 9367 PD 19467 9411 PD 19468
9413 PD 19545 9561 PU 19560 9589 PD 19583 9634 PD 19584 9635 PD 19662 9782 PU
19676 9809 PD 19700 9853 PD 19723 9897 PD 19746 9940 PD 19769 9984 PD 19792
10027 PD 19800 10041 PD 19824 10086 PD 19848 10131 PD 19873 10176 PD 19897
10221
PD 19921 10265 PD 19945 10309 PD 19970 10354 PD 19994 10398 PD 20018 10442 PD
20042 10486 PD 20058 10514 PD 20139 10659 PU 20139 10660 PD 20164 10703 PD
20180
10732 PD 20262 10877 PU 20285 10916 PD 20295 10934 PD 20321 10978 PD 20346
11023
PD 20372 11067 PD 20397 11111 PD 20423 11154 PD 20448 11198 PD 20474 11242 PD
20499 11285 PD 20525 11328 PD 20550 11371 PD 20576 11414 PD 20601 11457 PD
20627
11499 PD 20652 11542 PD 20678 11584 PD 20684 11594 PD 20771 11736 PU 20780
11751
PD 20790 11767 PD 20815 11807 PD 20902 11949 PU 20925 11984 PD 20951 12026 PD
20978 12069 PD 21005 12111 PD 21032 12154 PD 21059 12196 PD 21086 12238 PD
21113
12279 PD 21140 12321 PD 21167 12362 PD 21194 12404 PD 21220 12445 PD 21247
12486
PD 21274 12526 PD 21285 12543 PD 21313 12585 PD 21342 12628 PD 21355 12647 PD
21448 12785 PU 21455 12796 PD 21483 12837 PD 21495 12854 PD 21589 12991 PU
21596
13002 PD 21625 13043 PD 21653 13083 PD 21681 13124 PD 21710 13164 PD 21738
13204
PD 21766 13244 PD 21780 13263 PD 21810 13305 PD 21839 13346 PD 21869 13387 PD
21899 13429 PD 21929 13469 PD 21958 13510 PD 21988 13551 PD 22018 13591 PD
22048
13631 PD 22075 13668 PD 22175 13801 PU 22196 13829 PD 22225 13867 PD 22327
13999
PU 22338 14013 PD 22369 14053 PD 22400 14093 PD 22432 14133 PD 22463 14172 PD
22494 14212 PD 22526 14251 PD 22557 14289 PD 22588 14328 PD 22620 14367 PD
22651
14405 PD 22682 14443 PD 22714 14480 PD 22745 14518 PD 22770 14548 PD 22803
14587
PD 22836 14626 PD 22852 14644 PD 22961 14770 PU 22969 14779 PD 23003 14817 PD
23016 14833 PD 23128 14956 PU 23136 14965 PD 23169 15001 PD 23202 15037 PD
23235
15072 PD 23265 15104 PD 23301 15141 PD 23336 15179 PD 23372 15215 PD 23408
15252
PD 23443 15288 PD 23479 15323 PD 23515 15359 PD 23550 15394 PD 23586 15428 PD
23622 15462 PD 23657 15496 PD 23693 15529 PD 23713 15547 PD 23837 15659 PU
23838
15659 PD 23876 15692 PD 23900 15713 PD 24028 15819 PU 24031 15822 PD 24070
15853
PD 24109 15883 PD 24148 15913 PD 24186 15942 PD 24225 15971 PD 24255 15993 PD
24297 16023 PD 24340 16052 PD 24382 16081 PD 24425 16109 PD 24467 16137 PD
24510
16163 PD 24552 16189 PD 24595 16214 PD 24637 16239 PD 24680 16263 PD 24718
16283
PD ST 2 SP NP 9409 1260 PU 9409 1759 PD 9588 1492 PD 9766 1759 PD 9766 1260 PD
10248 1670 PU 10159 1759 PD 10016 1759 PD 9927 1670 PD 9927 1349 PD 10016 1260
PD 10159 1260 PD 10248 1349 PD 10248 1670 PD 10408 1260 PU 10408 1759 PD 10587
1492 PD 10765 1759 PD 10765 1260 PD 11247 1260 PU 10926 1260 PD 10926 1759 PD
11247 1759 PD 10926 1510 PU 11158 1510 PD 11425 1260 PU 11425 1759 PD 11746
1260
PD 11746 1759 PD 11907 1759 PU 12264 1759 PD 12085 1759 PU 12085 1260 PD 12424
1759 PU 12424 1349 PD 12513 1260 PD 12656 1260 PD 12745 1349 PD 12745 1759 PD
12906 1260 PU 12906 1759 PD 13084 1492 PD 13263 1759 PD 13263 1260 PD 14440
1260
PU 14440 1759 PD 14618 1759 PD 14690 1742 PD 14743 1688 PD 14743 1581 PD 14690
1528 PD 14618 1510 PD 14440 1510 PD 14939 1510 PU 15225 1510 PD 14939 1367 PU
15225 1367 PD 15956 1635 PU 15956 1688 PD 16028 1759 PD 16152 1759 PD 16224
1688
PD 16224 1599 PD 15938 1260 PD 16242 1260 PD 16474 1724 PU 16474 1260 PD 16474
1403 PU 16688 1599 PD 16545 1456 PU 16723 1260 PD 16902 1581 PU 17276 1581 PD
17187 1260 PU 17187 1581 PD 17009 1581 PU 16973 1260 PD 17437 1260 PU 17722
1759
PD 17918 1260 PU 17918 1759 PD 18240 1260 PD 18240 1759 PD 2856 8674 PU 2856
8305 PD 2281 8305 PD 2281 8674 PD 2569 8305 PU 2569 8572 PD 2856 8879 PU 2281
8879 PD 2856 9249 PD 2281 9249 PD 2856 9823 PU 2856 9454 PD 2281 9454 PD 2281
9823 PD 2569 9454 PU 2569 9720 PD 2569 10254 PU 2856 10397 PD 2856 10049 PU
2281
10049 PD 2281 10254 PD 2302 10336 PD 2363 10397 PD 2486 10397 PD 2548 10336 PD
2569 10254 PD 2569 10049 PD 2610 10828 PU 2610 10992 PD 2753 10992 PD 2856
10890
PD 2856 10705 PD 2753 10603 PD 2384 10603 PD 2281 10705 PD 2281 10890 PD 2384
10992 PD 2281 11156 PU 2589 11362 PD 2281 11567 PD 2589 11362 PU 2856 11362 PD
2856 11300 PU 2856 11423 PD 2856 13844 PU 2856 13475 PD 2281 13475 PD 2281
13844
PD 2569 13475 PU 2569 13741 PD 8626 16588 PU 8667 16615 PD 8720 16615 PD 8881
16240 PD 8787 16454 PU 8626 16240 PD 9014 16427 PU 9228 16427 PD 9014 16320 PU
9228 16320 PD 9603 16561 PU 9550 16615 PD 9442 16615 PD 9389 16561 PD 9389
16294
PD 9442 16240 PD 9550 16240 PD 9603 16294 PD 9603 16561 PD 9884 16240 PU 9844
16240 PD 9844 16280 PD 9884 16280 PD 9884 16240 PD 10138 16294 PU 10138 16387
PD
10192 16441 PD 10138 16494 PD 10138 16561 PD 10192 16615 PD 10299 16615 PD
10352
16561 PD 10352 16494 PD 10299 16441 PD 10192 16441 PD 10299 16441 PD 10352
16387
PD 10352 16294 PD 10299 16240 PD 10192 16240 PD 10138 16294 PD 10513 16294 PU
10566 16240 PD 10673 16240 PD 10727 16294 PD 10727 16414 PD 10673 16467 PD
10566
16467 PD 10513 16414 PD 10513 16615 PD 10727 16615 PD 5983 15021 PU 5929 15075
PD 5822 15075 PD 5769 15021 PD 5769 14754 PD 5822 14700 PD 5929 14700 PD 5983
14754 PD 5983 15021 PD 6264 14700 PU 6224 14700 PD 6224 14740 PD 6264 14740 PD
6264 14700 PD 6518 15021 PU 6518 15075 PD 6732 15075 PD 6612 14700 PD 5983
13481
PU 5929 13535 PD 5822 13535 PD 5769 13481 PD 5769 13214 PD 5822 13160 PD 5929
13160 PD 5983 13214 PD 5983 13481 PD 6264 13160 PU 6224 13160 PD 6224 13200 PD
6264 13200 PD 6264 13160 PD 6518 13214 PU 6571 13160 PD 6679 13160 PD 6732
13214
PD 6732 13334 PD 6679 13387 PD 6571 13387 PD 6518 13334 PD 6518 13535 PD 6732
13535 PD 5359 11548 PU 5400 11575 PD 5453 11575 PD 5614 11200 PD 5520 11414 PU
5359 11200 PD 5747 11387 PU 5961 11387 PD 5747 11280 PU 5961 11280 PD 6336
11521
PU 6283 11575 PD 6175 11575 PD 6122 11521 PD 6122 11254 PD 6175 11200 PD 6283
11200 PD 6336 11254 PD 6336 11521 PD 6617 11200 PU 6577 11200 PD 6577 11240 PD
6617 11240 PD 6617 11200 PD 6885 11481 PU 6885 11521 PD 6938 11575 PD 7032
11575
PD 7085 11521 PD 7085 11454 PD 6871 11200 PD 7099 11200 PD 7246 11254 PU 7299
11200 PD 7406 11200 PD 7460 11254 PD 7460 11374 PD 7406 11427 PD 7299 11427 PD
7246 11374 PD 7246 11575 PD 7460 11575 PD 14540 15785 PU 14454 15700 PD 14454
15528 PD 14582 15443 PD 14754 15443 PD 14882 15528 PD 14882 15700 PD 14796
15785
PD 14732 15785 PD 14668 15721 PD 14668 15250 PD 15096 15700 PU 15439 15700 PD
15096 15528 PU 15439 15528 PD 16038 15742 PU 15952 15657 PD 15781 15657 PD
15696
15742 PD 15696 15914 PD 15781 15999 PD 15952 15999 PD 16038 15914 PD 16038
15486
PD 15952 15400 PD 15781 15400 PD 15696 15486 PD 16637 15914 PU 16552 15999 PD
16381 15999 PD 16295 15914 PD 16295 15486 PD 16381 15400 PD 16552 15400 PD
16637
15486 PD 16637 15914 PD 17001 15999 PU 16937 15935 PD 16937 15871 PD 17001
15807
PD 17066 15807 PD 17130 15871 PD 17130 15935 PD 17066 15999 PD 17001 15999 PD
4485 2672 PU 4728 2672 PD 4880 2793 PU 5198 2793 PD 5122 2520 PU 5122 2793 PD
4971 2793 PU 4940 2520 PD 9059 2672 PU 9302 2672 PD 9453 2793 PU 9772 2793 PD
9696 2520 PU 9696 2793 PD 9544 2793 PU 9514 2520 PD 9908 2520 PU 10151 2945 PD
10348 2838 PU 10348 2884 PD 10409 2945 PD 10515 2945 PD 10575 2884 PD 10575
2808
PD 10333 2520 PD 10591 2520 PD 14965 2884 PU 14904 2945 PD 14783 2945 PD 14722
2884 PD 14722 2581 PD 14783 2520 PD 14904 2520 PD 14965 2581 PD 14965 2884 PD
19325 2793 PU 19643 2793 PD 19567 2520 PU 19567 2793 PD 19416 2793 PU 19385
2520
PD 19780 2520 PU 20022 2945 PD 20219 2838 PU 20219 2884 PD 20280 2945 PD 20386
2945 PD 20447 2884 PD 20447 2808 PD 20204 2520 PD 20462 2520 PD 24572 2793 PU
24890 2793 PD 24814 2520 PU 24814 2793 PD 24663 2793 PU 24632 2520 PD ST 2 SP
NP
1843 280 PU 1843 530 PD 2003 530 PD 1843 405 PU 1959 405 PD 2155 512 PU 2155
530
PD 2173 530 PD 2173 512 PD 2155 512 PD 2137 441 PU 2173 441 PD 2173 280 PD 2128
280 PU 2217 280 PD 2494 405 PU 2458 441 PD 2387 441 PD 2351 405 PD 2351 334 PD
2387 298 PD 2458 298 PD 2494 334 PD 2494 441 PU 2494 253 PD 2458 218 PD 2387
218
PD 2351 244 PD 2681 280 PU 2654 280 PD 2654 307 PD 2681 307 PD 2681 280 PD 2851
494 PU 2886 530 PD 2958 530 PD 2993 494 PD 2993 449 PD 2958 414 PD 2886 414 PD
2958 414 PD 2993 378 PD 2993 316 PD 2958 280 PD 2886 280 PD 2851 316 PD ST CL
%%  GEHLEN   92/10/22 17:40:24 PLOTOUT  PAGE=  3  V3L3;
21000 RO NP 0 0 PU 29700 0 PD 29700 21000 PD 0 21000 PD IW 1 SP NP 0 0 PU 29700
0 PD 29700 21000 PD 0 21000 PD 0 0 PD 4950 17500 PU 4950 3500 PD 24750 3500 PD
24750 17500 PD 4950 17500 PD 4950 16904 PU 4600 16904 PD 4950 15415 PU 4750
15415 PD 4950 13926 PU 4600 13926 PD 4950 12436 PU 4750 12436 PD 4950 10947 PU
4600 10947 PD 4950 9457 PU 4750 9457 PD 4950 7968 PU 4600 7968 PD 4950 6479 PU
4750 6479 PD 4950 4989 PU 4600 4989 PD 4950 3500 PU 4750 3500 PD 4950 3500 PU
4950 3150 PD 5940 3500 PU 5940 3300 PD 6930 3500 PU 6930 3300 PD 7920 3500 PU
7920 3300 PD 8910 3500 PU 8910 3300 PD 9900 3500 PU 9900 3150 PD 10890 3500 PU
10890 3300 PD 11880 3500 PU 11880 3300 PD 12870 3500 PU 12870 3300 PD 13860
3500
PU 13860 3300 PD 14850 3500 PU 14850 3150 PD 15840 3500 PU 15840 3300 PD 16830
3500 PU 16830 3300 PD 17820 3500 PU 17820 3300 PD 18810 3500 PU 18810 3300 PD
19800 3500 PU 19800 3150 PD 20790 3500 PU 20790 3300 PD 21780 3500 PU 21780
3300
PD 22770 3500 PU 22770 3300 PD 23760 3500 PU 23760 3300 PD 24750 3500 PU 24750
3150 PD 24750 3500 PU 24550 3500 PD 24750 4989 PU 24400 4989 PD 24750 6479 PU
24550 6479 PD 24750 7968 PU 24400 7968 PD 24750 9457 PU 24550 9457 PD 24750
10947 PU 24400 10947 PD 24750 12436 PU 24550 12436 PD 24750 13926 PU 24400
13926
PD 24750 15415 PU 24550 15415 PD 24750 16904 PU 24400 16904 PD 24750 17500 PU
24750 17150 PD 23760 17500 PU 23760 17300 PD 22770 17500 PU 22770 17300 PD
21780
17500 PU 21780 17300 PD 20790 17500 PU 20790 17300 PD 19800 17500 PU 19800
17150
PD 18810 17500 PU 18810 17300 PD 17820 17500 PU 17820 17300 PD 16830 17500 PU
16830 17300 PD 15840 17500 PU 15840 17300 PD 14850 17500 PU 14850 17150 PD
13860
17500 PU 13860 17300 PD 12870 17500 PU 12870 17300 PD 11880 17500 PU 11880
17300
PD 10890 17500 PU 10890 17300 PD 9900 17500 PU 9900 17150 PD 8910 17500 PU 8910
17300 PD 7920 17500 PU 7920 17300 PD 6930 17500 PU 6930 17300 PD 5940 17500 PU
5940 17300 PD 4950 17500 PU 4950 17150 PD 4044 16750 PU 4106 16688 PD 4229
16688
PD 4291 16750 PD 4291 16889 PD 4229 16951 PD 4106 16951 PD 4044 16889 PD 4044
17121 PD 4291 17121 PD 4167 14142 PU 4013 13817 PD 4338 13817 PD 4229 13709 PU
4229 13972 PD 4044 11101 PU 4106 11163 PD 4229 11163 PD 4291 11101 PD 4291
11024
PD 4229 10962 PD 4106 10962 PD 4229 10962 PD 4291 10900 PD 4291 10792 PD 4229
10730 PD 4106 10730 PD 4044 10792 PD 4059 8076 PU 4059 8123 PD 4121 8185 PD
4229
8185 PD 4291 8123 PD 4291 8045 PD 4044 7752 PD 4307 7752 PD 4090 5082 PU 4198
5206 PD 4198 4773 PD 14756 8941 PU 14944 8753 PD 14944 8941 PU 14756 8753 PD
18716 12830 PU 18904 12643 PD 18904 12830 PU 18716 12643 PD 22676 16131 PU
22864
15944 PD 22864 16131 PU 22676 15944 PD 6836 16339 PU 7024 16152 PD 7024 16339
PU
6836 16152 PD 10796 12092 PU 10984 11904 PD 10984 12092 PU 10796 11904 PD 14756
8989 PU 14944 8801 PD 14944 8989 PU 14756 8801 PD 18056 11944 PU 18244 11757 PD
18244 11944 PU 18056 11757 PD 21356 14913 PU 21544 14726 PD 21544 14913 PU
21356
14726 PD 24656 16938 PU 24844 16750 PD 24844 16938 PU 24656 16750 PD 8156 15229
PU 8344 15042 PD 8344 15229 PU 8156 15042 PD 11456 11248 PU 11644 11061 PD
11644
11248 PU 11456 11061 PD 4856 16938 PU 5044 16750 PD 5044 16938 PU 4856 16750 PD
14756 9023 PU 14944 8836 PD 14944 9023 PU 14756 8836 PD 17585 11338 PU 17772
11151 PD 17772 11338 PU 17585 11151 PD 20413 13963 PU 20601 13775 PD 20601
13963
PU 20413 13775 PD 23242 16483 PU 23429 16295 PD 23429 16483 PU 23242 16295 PD
6271 16628 PU 6458 16441 PD 6458 16628 PU 6271 16441 PD 9099 14200 PU 9286
14012
PD 9286 14200 PU 9099 14012 PD 11928 10685 PU 12115 10497 PD 12115 10685 PU
11928 10497 PD 14756 9045 PU 14944 8857 PD 14944 9045 PU 14756 8857 PD 17231
10910 PU 17419 10723 PD 17419 10910 PU 17231 10723 PD 19706 13247 PU 19894
13060
PD 19894 13247 PU 19706 13060 PD 22181 15742 PU 22369 15554 PD 22369 15742 PU
22181 15554 PD 24656 16917 PU 24844 16729 PD 24844 16917 PU 24656 16729 PD 7331
15963 PU 7519 15776 PD 7519 15963 PU 7331 15776 PD 9806 13339 PU 9994 13152 PD
9994 13339 PU 9806 13152 PD 12281 10294 PU 12469 10107 PD 12469 10294 PU 12281
10107 PD 4856 16917 PU 5044 16729 PD 5044 16917 PU 4856 16729 PD 14756 9057 PU
14944 8870 PD 14944 9057 PU 14756 8870 PD 16956 10598 PU 17144 10411 PD 17144
10598 PU 16956 10411 PD 19156 12698 PU 19344 12511 PD 19344 12698 PU 19156
12511
PD 21356 15018 PU 21544 14830 PD 21544 15018 PU 21356 14830 PD 23556 16638 PU
23744 16451 PD 23744 16638 PU 23556 16451 PD 5956 16750 PU 6144 16563 PD 6144
16750 PU 5956 16563 PD 8156 15226 PU 8344 15039 PD 8344 15226 PU 8156 15039 PD
10356 12640 PU 10544 12452 PD 10544 12640 PU 10356 12452 PD 12556 10016 PU
12744
9828 PD 12744 10016 PU 12556 9828 PD 14756 9065 PU 14944 8877 PD 14944 9065 PU
14756 8877 PD 16736 10365 PU 16924 10178 PD 16924 10365 PU 16736 10178 PD 18716
12265 PU 18904 12078 PD 18904 12265 PU 18716 12078 PD 20696 14381 PU 20884
14194
PD 20884 14381 PU 20696 14194 PD 22676 16122 PU 22864 15935 PD 22864 16122 PU
22676 15935 PD 24656 16913 PU 24844 16726 PD 24844 16913 PU 24656 16726 PD 6836
16315 PU 7024 16127 PD 7024 16315 PU 6836 16127 PD 8816 14525 PU 9004 14338 PD
9004 14525 PU 8816 14338 PD 10796 12074 PU 10984 11887 PD 10984 12074 PU 10796
11887 PD 12776 9812 PU 12964 9625 PD 12964 9812 PU 12776 9625 PD 4856 16913 PU
5044 16726 PD 5044 16913 PU 4856 16726 PD 14756 9069 PU 14944 8881 PD 14944
9069
PU 14756 8881 PD 16556 10185 PU 16744 9998 PD 16744 10185 PU 16556 9998 PD
18356
11913 PU 18544 11726 PD 18544 11913 PU 18356 11726 PD 20156 13836 PU 20344
13649
PD 20344 13836 PU 20156 13649 PD 21956 15528 PU 22144 15340 PD 22144 15528 PU
21956 15340 PD 23756 16721 PU 23944 16533 PD 23944 16721 PU 23756 16533 PD 5756
16811 PU 5944 16624 PD 5944 16811 PU 5756 16624 PD 7556 15779 PU 7744 15592 PD
7744 15779 PU 7556 15592 PD 9356 13894 PU 9544 13707 PD 9544 13894 PU 9356
13707
PD 11156 11616 PU 11344 11429 PD 11344 11616 PU 11156 11429 PD 12956 9660 PU
13144 9473 PD 13144 9660 PU 12956 9473 PD 14756 9071 PU 14944 8883 PD 14944
9071
PU 14756 8883 PD 16406 10044 PU 16594 9857 PD 16594 10044 PU 16406 9857 PD
18056
11620 PU 18244 11433 PD 18244 11620 PU 18056 11433 PD 19706 13372 PU 19894
13185
PD 19894 13372 PU 19706 13185 PD 21356 14946 PU 21544 14759 PD 21544 14946 PU
21356 14759 PD 23006 16345 PU 23194 16157 PD 23194 16345 PU 23006 16157 PD
24656
16913 PU 24844 16726 PD 24844 16913 PU 24656 16726 PD 6506 16507 PU 6694 16320
PD 6694 16507 PU 6506 16320 PD 8156 15226 PU 8344 15039 PD 8344 15226 PU 8156
15039 PD 9806 13339 PU 9994 13152 PD 9994 13339 PU 9806 13152 PD 11456 11243 PU
11644 11056 PD 11644 11243 PU 11456 11056 PD 13106 9544 PU 13294 9357 PD 13294
9544 PU 13106 9357 PD 4856 16913 PU 5044 16726 PD 5044 16913 PU 4856 16726 PD
ST
1 SP NP 4950 16819 PU 5000 16818 PD 5050 16817 PD 5100 16815 PD 5149 16812 PD
5199 16809 PD 5249 16805 PD 5299 16800 PD 5349 16795 PD 5399 16789 PD 5445
16782
PD 5494 16774 PD 5542 16765 PD 5591 16755 PD 5639 16745 PD 5688 16733 PD 5736
16721 PD 5785 16708 PD 5834 16694 PD 5882 16680 PD 5931 16664 PD 5940 16661 PD
5986 16646 PD 6033 16629 PD 6079 16612 PD 6125 16595 PD 6172 16577 PD 6218
16558
PD 6264 16538 PD 6311 16518 PD 6357 16497 PD 6403 16476 PD 6435 16461 PD 6479
16439 PD 6522 16417 PD 6566 16395 PD 6610 16372 PD 6654 16348 PD 6697 16324 PD
6741 16299 PD 6785 16274 PD 6829 16248 PD 6872 16222 PD 6916 16195 PD 6930
16186
PD 6971 16160 PD 7012 16134 PD 7053 16107 PD 7094 16080 PD 7135 16052 PD 7177
16024 PD 7218 15995 PD 7259 15966 PD 7300 15936 PD 7341 15906 PD 7382 15876 PD
7423 15845 PD 7425 15843 PD 7464 15814 PD 7502 15784 PD 7541 15754 PD 7580
15723
PD 7618 15692 PD 7657 15661 PD 7695 15629 PD 7734 15597 PD 7773 15564 PD 7811
15531 PD 7850 15498 PD 7889 15464 PD 7920 15437 PD 7956 15405 PD 7993 15372 PD
8029 15339 PD 8066 15306 PD 8102 15272 PD 8139 15238 PD 8175 15204 PD 8211
15170
PD 8248 15135 PD 8284 15100 PD 8321 15065 PD 8357 15029 PD 8394 14993 PD 8415
14972 PD 8449 14937 PD 8484 14902 PD 8518 14867 PD 8553 14832 PD 8587 14796 PD
8622 14761 PD 8656 14725 PD 8691 14688 PD 8725 14652 PD 8760 14615 PD 8794
14578
PD 8829 14541 PD 8863 14503 PD 8898 14465 PD 8910 14452 PD 8910 14452 PU 8943
14416 PD 8976 14379 PD 9009 14343 PD 9041 14306 PD 9074 14269 PD 9107 14232 PD
9140 14194 PD 9173 14156 PD 9206 14118 PD 9239 14080 PD 9272 14042 PD 9304
14004
PD 9337 13965 PD 9370 13926 PD 9403 13887 PD 9405 13885 PD 9437 13847 PD 9468
13809 PD 9500 13771 PD 9531 13733 PD 9563 13695 PD 9595 13656 PD 9626 13618 PD
9658 13579 PD 9689 13540 PD 9721 13501 PD 9753 13462 PD 9784 13423 PD 9816
13383
PD 9847 13344 PD 9879 13304 PD 9900 13278 PD 9931 13239 PD 9961 13200 PD 9992
13161 PD 10023 13122 PD 10054 13083 PD 10084 13044 PD 10115 13004 PD 10146
12965
PD 10177 12925 PD 10207 12886 PD 10238 12846 PD 10269 12807 PD 10300 12767 PD
10330 12727 PD 10361 12687 PD 10392 12647 PD 10395 12643 PD 10425 12603 PD
10456
12564 PD 10486 12524 PD 10517 12485 PD 10547 12445 PD 10577 12405 PD 10608
12365
PD 10638 12326 PD 10668 12286 PD 10699 12246 PD 10729 12206 PD 10760 12167 PD
10790 12127 PD 10820 12087 PD 10851 12047 PD 10881 12008 PD 10890 11996 PD
10921
11956 PD 10951 11916 PD 10982 11876 PD 11012 11836 PD 11043 11797 PD 11074
11757
PD 11104 11717 PD 11135 11678 PD 11166 11638 PD 11196 11598 PD 11227 11559 PD
11257 11520 PD 11288 11481 PD 11319 11441 PD 11349 11402 PD 11380 11363 PD
11385
11357 PD 11417 11317 PD 11448 11277 PD 11480 11237 PD 11511 11198 PD 11543
11158
PD 11574 11119 PD 11606 11080 PD 11637 11041 PD 11669 11002 PD 11701 10964 PD
11732 10926 PD 11764 10887 PD 11795 10849 PD 11827 10812 PD 11858 10774 PD
11880
10748 PD 11880 10748 PU 11913 10709 PD 11947 10670 PD 11980 10631 PD 12013
10593
PD 12047 10555 PD 12080 10517 PD 12113 10479 PD 12147 10442 PD 12180 10405 PD
12213 10368 PD 12247 10332 PD 12280 10296 PD 12313 10260 PD 12347 10225 PD
12375
10195 PD 12411 10157 PD 12447 10120 PD 12483 10084 PD 12519 10047 PD 12556
10012
PD 12592 9976 PD 12628 9942 PD 12664 9907 PD 12700 9873 PD 12736 9840 PD 12772
9807 PD 12808 9775 PD 12844 9743 PD 12870 9721 PD 12910 9687 PD 12950 9654 PD
12990 9621 PD 13030 9589 PD 13070 9557 PD 13110 9527 PD 13149 9497 PD 13189
9468
PD 13229 9439 PD 13269 9411 PD 13309 9384 PD 13349 9358 PD 13365 9348 PD 13409
9320 PD 13454 9293 PD 13498 9267 PD 13543 9242 PD 13587 9218 PD 13631 9195 PD
13676 9172 PD 13720 9151 PD 13765 9131 PD 13809 9112 PD 13853 9094 PD 13860
9092
PD 13908 9073 PD 13957 9056 PD 14005 9040 PD 14054 9026 PD 14102 9012 PD 14150
9000 PD 14199 8989 PD 14247 8980 PD 14295 8971 PD 14344 8964 PD 14355 8962 PD
14405 8957 PD 14455 8952 PD 14505 8949 PD 14555 8947 PD 14605 8947 PD 14655
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PD 14705 8950 PD 14755 8953 PD 14805 8958 PD 14850 8963 PD 14898 8970 PD 14947
8978 PD 14995 8987 PD 15044 8998 PD 15092 9009 PD 15141 9022 PD 15189 9036 PD
15238 9051 PD 15286 9067 PD 15335 9084 PD 15345 9088 PD 15390 9105 PD 15435
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PD 15480 9142 PD 15525 9162 PD 15570 9183 PD 15615 9205 PD 15660 9227 PD 15705
9251 PD 15750 9275 PD 15796 9300 PD 15840 9326 PD 15881 9351 PD 15923 9376 PD
15923 9376 PU 15964 9402 PD 16006 9428 PD 16047 9456 PD 16088 9483 PD 16130
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PD 16171 9541 PD 16212 9570 PD 16254 9601 PD 16295 9631 PD 16335 9662 PD 16373
9691 PD 16412 9721 PD 16450 9751 PD 16488 9782 PD 16527 9814 PD 16565 9845 PD
16603 9878 PD 16642 9910 PD 16680 9943 PD 16718 9976 PD 16757 10010 PD 16795
10044 PD 16830 10076 PD 16866 10108 PD 16902 10141 PD 16938 10175 PD 16975
10208
PD 17011 10242 PD 17047 10277 PD 17083 10311 PD 17119 10346 PD 17155 10381 PD
17191 10416 PD 17227 10452 PD 17264 10488 PD 17300 10524 PD 17325 10549 PD
17360
10584 PD 17394 10619 PD 17429 10654 PD 17464 10690 PD 17498 10725 PD 17533
10761
PD 17567 10797 PD 17602 10833 PD 17637 10870 PD 17671 10906 PD 17706 10943 PD
17741 10980 PD 17775 11016 PD 17810 11054 PD 17820 11064 PD 17854 11100 PD
17887
11137 PD 17921 11173 PD 17955 11210 PD 17989 11246 PD 18022 11283 PD 18056
11320
PD 18090 11357 PD 18124 11394 PD 18157 11431 PD 18191 11468 PD 18225 11506 PD
18259 11543 PD 18292 11581 PD 18315 11606 PD 18348 11643 PD 18382 11680 PD
18415
11717 PD 18448 11754 PD 18481 11791 PD 18515 11829 PD 18548 11866 PD 18581
11903
PD 18614 11941 PD 18648 11978 PD 18681 12016 PD 18714 12053 PD 18747 12091 PD
18781 12128 PD 18810 12161 PD 18843 12199 PD 18876 12236 PD 18909 12274 PD
18942
12311 PD 18976 12349 PD 19009 12386 PD 19042 12424 PD 19075 12461 PD 19108
12499
PD 19141 12536 PD 19174 12574 PD 19207 12611 PD 19240 12648 PD 19274 12686 PD
19305 12721 PD 19338 12759 PD 19371 12797 PD 19371 12797 PU 19405 12834 PD
19438
12872 PD 19471 12909 PD 19504 12946 PD 19538 12984 PD 19571 13021 PD 19604
13059
PD 19637 13096 PD 19670 13133 PD 19704 13170 PD 19737 13208 PD 19770 13245 PD
19800 13278 PD 19834 13316 PD 19867 13353 PD 19901 13391 PD 19934 13428 PD
19968
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PD 20169 13687 PD 20203 13724 PD 20236 13761 PD 20270 13798 PD 20295 13825 PD
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PU 19337 9825 PD 19370 9864 PD 19371 9866 PD 19478 9993 PU 19499 10018 PD 19531
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PD 19693 10247 PD 19801 10374 PU 19833 10411 PD 19856 10437 PD 19965 10563 PU
19965 10563 PD 19998 10601 PD 20031 10639 PD 20064 10676 PD 20097 10714 PD
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PD 20464 11121 PU 20465 11123 PD 20499 11160 PD 20534 11197 PD 20568 11233 PD
20602 11270 PD 20636 11306 PD 20670 11342 PD 20691 11365 PD 20807 11485 PU
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11504 PD 20861 11540 PD 20865 11544 PD 20982 11663 PU 21003 11684 PD 21038
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PD 21074 11754 PD 21109 11789 PD 21145 11824 PD 21180 11859 PD 21216 11893 PD
21219 11896 PD 21340 12011 PU 21359 12029 PD 21396 12064 PD 21401 12068 PD
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PD 21730 12364 PD 21767 12396 PD 21773 12401 PD 21900 12508 PU 21935 12538 PD
21964 12561 PD 22094 12666 PU 22130 12695 PD 22169 12725 PD 22207 12755 PD
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PU 22520 12987 PD 22560 13015 PD 22698 13109 PU 22724 13127 PD 22765 13154 PD
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PD 23400 13524 PD 23445 13547 PD 23490 13569 PD 23535 13591 PD 23580 13612 PD
23625 13633 PD 23639 13640 PD 23792 13706 PU 23807 13712 PD 23854 13731 PD
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PD 24230 13864 PD 24255 13871 PD 24304 13885 PD 24343 13896 PD 24504 13937 PU
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SP NP 14742 4694 PU 14850 4507 PD 14958 4694 PD 14742 4694 PD 18702 9724 PU
18810 9537 PD 18918 9724 PD 18702 9724 PD 22662 15202 PU 22770 15014 PD 22878
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PD 8358 14811 PD 8142 14811 PD 11442 10160 PU 11550 9972 PD 11658 10160 PD
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PD 17570 7536 PD 20399 12318 PU 20507 12131 PD 20615 12318 PD 20399 12318 PD
23228 15430 PU 23336 15243 PD 23444 15430 PD 23228 15430 PD 6256 15942 PU 6364
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PD 22167 14498 PU 22275 14310 PD 22383 14498 PD 22167 14498 PD 24642 15995 PU
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PD 5058 15995 PD 4842 15995 PD 14742 4617 PU 14850 4429 PD 14958 4617 PD 14742
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PD 5942 15956 PU 6050 15768 PD 6158 15956 PD 5942 15956 PD 8142 14651 PU 8250
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PD 10342 11821 PD 12542 7965 PU 12650 7777 PD 12758 7965 PD 12542 7965 PD 14742
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PD 20682 12658 PU 20790 12471 PD 20898 12658 PD 20682 12658 PD 22662 14924 PU
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PD
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PD 23742 15646 PD 5742 15968 PU 5850 15781 PD 5958 15968 PD 5742 15968 PD 7542
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PD 16392 5549 PD 18042 8307 PU 18150 8119 PD 18258 8307 PD 18042 8307 PD 19692
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PD 21558 13525 PD 21342 13525 PD 22992 15176 PU 23100 14989 PD 23208 15176 PD
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8358 14622 PD 8142 14622 PD 9792 12620 PU 9900 12432 PD 10008 12620 PD 9792
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PD 4842 15946 PD ST 1 SP NP 4950 15862 PU 5000 15862 PD 5050 15862 PD 5100
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PD 5150 15859 PD 5200 15857 PD 5250 15855 PD 5300 15851 PD 5349 15847 PD 5399
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PD 6017 15709 PD 6175 15659 PU 6177 15658 PD 6224 15642 PD 6271 15625 PD 6319
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PD 6847 15386 PD 6893 15365 PD 6930 15347 PD 6944 15340 PD 7093 15266 PU 7107
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PD 7639 14965 PD 7681 14939 PD 7724 14913 PD 7767 14886 PD 7810 14859 PD 7852
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PD 8408 14440 PD 8415 14434 PD 8453 14405 PD 8491 14374 PD 8529 14344 PD 8567
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PD 8979 13943 PD 8992 13930 PD 9109 13812 PU 9117 13805 PD 9152 13769 PD 9167
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9405 13490 PD 9436 13454 PD 9467 13418 PD 9497 13381 PD 9528 13344 PD 9559
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PD 9590 13268 PD 9621 13229 PD 9651 13190 PD 9682 13151 PD 9713 13110 PD 9744
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9952 12783 PD 10046 12646 PU 10064 12620 PD 10091 12579 PD 10118 12537 PD 10146
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12281
PD 10309 12237 PD 10337 12193 PD 10364 12148 PD 10391 12103 PD 10395 12097 PD
10419 12056 PD 10444 12015 PD 10468 11973 PD 10488 11940 PD 10571 11796 PU
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PD 10785 11408 PD 10810 11363 PD 10834 11317 PD 10859 11271 PD 10883 11225 PD
10890 11211 PD 10912 11169 PD 10935 11126 PD 10957 11083 PD 10979 11039 PD
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PU 11158 10686 PD 11180 10641 PD 11192 10617 PD 11265 10468 PU 11269 10459 PD
11292 10413 PD 11314 10367 PD 11336 10320 PD 11359 10274 PD 11381 10227 PD
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PD 11512 9952 PD 11533 9907 PD 11554 9862 PD 11575 9817 PD 11596 9771 PD 11617
9726 PD 11622 9716 PD 11692 9565 PU 11702 9544 PD 11723 9498 PD 11727 9489 PD
11796 9338 PU 11807 9315 PD 11828 9269 PD 11849 9223 PD 11870 9177 PD 11880
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PD 11901 9110 PD 11922 9064 PD 11942 9019 PD 11963 8973 PD 11984 8928 PD 12005
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12130 8608 PD 12142 8581 PD 12211 8429 PU 12213 8426 PD 12234 8381 PD 12246
8354
PD 12316 8202 PU 12317 8200 PD 12338 8154 PD 12359 8109 PD 12375 8074 PD 12397
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12526 7750 PD 12547 7704 PD 12569 7659 PD 12590 7613 PD 12612 7568 PD 12634
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PD 12655 7477 PD 12669 7449 PD 12741 7299 PU 12741 7299 PD 12763 7254 PD 12778
7224 PD 12851 7075 PU 12870 7037 PD 12894 6990 PD 12917 6943 PD 12941 6896 PD
12964 6850 PD 12988 6804 PD 13012 6758 PD 13035 6713 PD 13059 6668 PD 13082
6623
PD 13106 6578 PD 13130 6534 PD 13153 6490 PD 13177 6447 PD 13200 6403 PD 13224
6361 PD 13237 6337 PD 13319 6192 PU 13342 6152 PD 13361 6120 PD 13446 5977 PU
13448 5973 PD 13475 5928 PD 13503 5884 PD 13530 5840 PD 13558 5796 PD 13585
5754
PD 13613 5711 PD 13640 5670 PD 13668 5629 PD 13695 5589 PD 13723 5549 PD 13750
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13916 5291 PD 14023 5163 PU 14031 5153 PD 14066 5114 PD 14078 5101 PD 14193
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PU 14203 4972 PD 14237 4939 PD 14271 4908 PD 14305 4877 PD 14340 4849 PD 14355
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14618 4659 PD 14662 4637 PD 14706 4617 PD 14750 4599 PD 14794 4583 PD 14838
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PD 14850 4566 PD 14896 4555 PD 15061 4532 PU 15100 4531 PD 15144 4532 PD 15309
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PD 15836 4809 PD 15840 4812 PD 15876 4840 PD 15912 4868 PD 15948 4898 PD 15984
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16201 5138 PD 16313 5261 PU 16335 5286 PD 16365 5321 PD 16395 5357 PD 16426
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PD 16456 5431 PD 16486 5469 PD 16516 5507 PD 16546 5546 PD 16577 5586 PD 16607
5626 PD 16637 5666 PD 16667 5708 PD 16697 5749 PD 16727 5792 PD 16758 5835 PD
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PD 17047 6270 PU 17071 6307 PD 17097 6349 PD 17124 6392 PD 17151 6435 PD 17177
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PD 17474 6976 PD 17478 6982 PD 17561 7127 PU 17574 7149 PD 17599 7192 PD 17603
7199 PD 17685 7344 PU 17699 7368 PD 17723 7412 PD 17748 7456 PD 17773 7500 PD
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7757
PD 17941 7801 PD 17965 7844 PD 17989 7888 PD 18013 7932 PD 18038 7976 PD 18062
8019 PD 18086 8063 PD 18090 8071 PD 18170 8217 PU 18183 8239 PD 18207 8283 PD
18210 8290 PD 18291 8436 PU 18303 8459 PD 18315 8480 PD 18339 8524 PD 18363
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PD 18387 8612 PD 18412 8656 PD 18436 8700 PD 18460 8744 PD 18484 8788 PD 18508
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18653 9095 PD 18678 9138 PD 18692 9165 PD 18773 9310 PU 18774 9312 PD 18798
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PD 18810 9377 PD 18814 9383 PD 18895 9528 PU 18909 9553 PD 18933 9597 PD 18958
9641 PD 18983 9685 PD 19007 9728 PD 19032 9772 PD 19057 9816 PD 19081 9859 PD
19106 9903 PD 19131 9946 PD 19155 9989 PD 19180 10032 PD 19205 10075 PD 19229
10118 PD 19254 10161 PD 19279 10204 PD 19303 10247 PD 19305 10249 PD 19307
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PD 19390 10396 PU 19407 10425 PD 19432 10468 PD 19517 10611 PU 19535 10642 PD
19560 10685 PD 19586 10728 PD 19611 10770 PD 19637 10813 PD 19662 10856 PD
19688
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PD 19827 11128 PD 19853 11171 PD 19880 11214 PD 19906 11257 PD 19933 11300 PD
19947 11324 PD 20035 11465 PU 20039 11471 PD 20066 11514 PD 20079 11536 PD
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11847
PD 20295 11873 PD 20323 11916 PD 20351 11959 PD 20378 12002 PD 20406 12044 PD
20434 12086 PD 20462 12128 PD 20490 12170 PD 20517 12212 PD 20545 12254 PD
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PD 20861 12715 PU 20878 12739 PD 20907 12781 PD 20936 12822 PD 20965 12863 PD
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PD 21316 13341 PD 21347 13382 PD 21351 13388 PD 21453 13520 PU 21471 13543 PD
21502 13582 PD 21504 13585 PD 21608 13716 PU 21626 13738 PD 21657 13777 PD
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PD 21880 14045 PD 21913 14084 PD 21946 14122 PD 21979 14160 PD 22012 14198 PD
22046 14235 PD 22079 14272 PD 22112 14309 PD 22145 14345 PD 22148 14349 PD
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PD 22491 14703 PD 22527 14737 PD 22563 14772 PD 22599 14806 PD 22635 14839 PD
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PD 23062 15197 PD 23197 15295 PU 23205 15301 PD 23245 15328 PD 23265 15342 PD
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PD 23807 15642 PD 23854 15662 PD 23902 15681 PD 23949 15699 PD 23996 15716 PD
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PD 24701 15859 PD 24750 15862 PD 24750 15862 PD ST 2 SP NP 9409 1260 PU 9409
1759 PD 9588 1492 PD 9766 1759 PD 9766 1260 PD 10248 1670 PU 10159 1759 PD
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1759 PD 9927 1670 PD 9927 1349 PD 10016 1260 PD 10159 1260 PD 10248 1349 PD
10248 1670 PD 10408 1260 PU 10408 1759 PD 10587 1492 PD 10765 1759 PD 10765
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PD 11247 1260 PU 10926 1260 PD 10926 1759 PD 11247 1759 PD 10926 1510 PU 11158
1510 PD 11425 1260 PU 11425 1759 PD 11746 1260 PD 11746 1759 PD 11907 1759 PU
12264 1759 PD 12085 1759 PU 12085 1260 PD 12424 1759 PU 12424 1349 PD 12513
1260
PD 12656 1260 PD 12745 1349 PD 12745 1759 PD 12906 1260 PU 12906 1759 PD 13084
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PD 14939 1510 PU 15225 1510 PD 14939 1367 PU 15225 1367 PD 15956 1635 PU 15956
1688 PD 16028 1759 PD 16152 1759 PD 16224 1688 PD 16224 1599 PD 15938 1260 PD
16242 1260 PD 16474 1724 PU 16474 1260 PD 16474 1403 PU 16688 1599 PD 16545
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PU 16723 1260 PD 16902 1581 PU 17276 1581 PD 17187 1260 PU 17187 1581 PD 17009
1581 PU 16973 1260 PD 17437 1260 PU 17722 1759 PD 17918 1260 PU 17918 1759 PD
18240 1260 PD 18240 1759 PD 2856 8674 PU 2856 8305 PD 2281 8305 PD 2281 8674 PD
2569 8305 PU 2569 8572 PD 2856 8879 PU 2281 8879 PD 2856 9249 PD 2281 9249 PD
2856 9823 PU 2856 9454 PD 2281 9454 PD 2281 9823 PD 2569 9454 PU 2569 9720 PD
2569 10254 PU 2856 10397 PD 2856 10049 PU 2281 10049 PD 2281 10254 PD 2302
10336
PD 2363 10397 PD 2486 10397 PD 2548 10336 PD 2569 10254 PD 2569 10049 PD 2610
10828 PU 2610 10992 PD 2753 10992 PD 2856 10890 PD 2856 10705 PD 2753 10603 PD
2384 10603 PD 2281 10705 PD 2281 10890 PD 2384 10992 PD 2281 11156 PU 2589
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PD 2281 11567 PD 2589 11362 PU 2856 11362 PD 2856 11300 PU 2856 11423 PD 2856
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PD 17033 4807 PU 17247 4807 PD 17033 4700 PU 17247 4700 PD 17622 4941 PU 17569
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PD 17903 4620 PD 18157 4941 PU 18157 4995 PD 18371 4995 PD 18251 4620 PD 18532
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PD 14732 8299 PD 14679 8245 PD 14679 7978 PD 14732 7924 PD 14839 7924 PD 14893
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PD 15642 8178 PD 15428 7924 PD 15655 7924 PD 15803 7978 PU 15856 7924 PD 15963
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PD 14679 6074 PD 14732 6020 PD 14839 6020 PD 14893 6074 PD 14893 6341 PD 15174
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PD 15428 6194 PD 15428 6395 PD 15642 6395 PD 18200 13763 PU 18080 13870 PD
18173
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PD 18106 13790 PD 18173 13857 PD 18173 14098 PD 18320 13977 PU 18534 13977 PD
18320 13870 PU 18534 13870 PD 18708 14071 PU 18708 14111 PD 18762 14165 PD
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PU 17783 5470 PD 17876 5698 PU 17809 5765 PD 17702 5765 PD 17635 5698 PD 17635
5457 PD 17702 5390 PD 17809 5390 PD 17876 5457 PD 17876 5698 PD 18023 5577 PU
18237 5577 PD 18023 5470 PU 18237 5470 PD 18438 5658 PU 18532 5765 PD 18532
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PD 17239 13368 PU 17280 13395 PD 17333 13395 PD 17494 13020 PD 17400 13234 PU
17239 13020 PD 17627 13207 PU 17841 13207 PD 17627 13100 PU 17841 13100 PD
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PD 18163 13020 PD 18216 13074 PD 18216 13341 PD 18497 13020 PU 18457 13020 PD
18457 13060 PD 18497 13060 PD 18497 13020 PD 18751 13074 PU 18805 13020 PD
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PD 18751 13395 PD 18965 13395 PD 13748 15785 PU 13662 15700 PD 13662 15528 PD
13790 15443 PD 13962 15443 PD 14090 15528 PD 14090 15700 PD 14004 15785 PD
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PU 14647 15528 PD 15075 15999 PU 14861 15550 PD 15310 15550 PD 15160 15400 PU
15160 15764 PD 15503 15486 PU 15589 15400 PD 15760 15400 PD 15845 15486 PD
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PD 16209 15999 PU 16145 15935 PD 16145 15871 PD 16209 15807 PD 16274 15807 PD
16338 15871 PD 16338 15935 PD 16274 15999 PD 16209 15999 PD 4485 2672 PU 4728
2672 PD 4880 2793 PU 5198 2793 PD 5122 2520 PU 5122 2793 PD 4971 2793 PU 4940
2520 PD 9059 2672 PU 9302 2672 PD 9453 2793 PU 9772 2793 PD 9696 2520 PU 9696
2793 PD 9544 2793 PU 9514 2520 PD 9908 2520 PU 10151 2945 PD 10348 2838 PU
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2884 PD 10409 2945 PD 10515 2945 PD 10575 2884 PD 10575 2808 PD 10333 2520 PD
10591 2520 PD 14965 2884 PU 14904 2945 PD 14783 2945 PD 14722 2884 PD 14722
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PD 14783 2520 PD 14904 2520 PD 14965 2581 PD 14965 2884 PD 19325 2793 PU 19643
2793 PD 19567 2520 PU 19567 2793 PD 19416 2793 PU 19385 2520 PD 19780 2520 PU
20022 2945 PD 20219 2838 PU 20219 2884 PD 20280 2945 PD 20386 2945 PD 20447
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PD 20447 2808 PD 20204 2520 PD 20462 2520 PD 24572 2793 PU 24890 2793 PD 24814
2520 PU 24814 2793 PD 24663 2793 PU 24632 2520 PD ST 2 SP NP 1843 280 PU 1843
530 PD 2003 530 PD 1843 405 PU 1959 405 PD 2155 512 PU 2155 530 PD 2173 530 PD
2173 512 PD 2155 512 PD 2137 441 PU 2173 441 PD 2173 280 PD 2128 280 PU 2217
280
PD 2494 405 PU 2458 441 PD 2387 441 PD 2351 405 PD 2351 334 PD 2387 298 PD 2458
298 PD 2494 334 PD 2494 441 PU 2494 253 PD 2458 218 PD 2387 218 PD 2351 244 PD
2681 280 PU 2654 280 PD 2654 307 PD 2681 307 PD 2681 280 PD 2922 530 PU 2833
342
PD 3020 342 PD 2958 280 PU 2958 432 PD ST CL
%%  GEHLEN   92/10/22 17:40:24 PLOTOUT  PAGE=  4  V3L3;
21000 RO NP 0 0 PU 29700 0 PD 29700 21000 PD 0 21000 PD IW 1 SP NP 0 0 PU 29700
0 PD 29700 21000 PD 0 21000 PD 0 0 PD 4950 17500 PU 4950 3500 PD 24750 3500 PD
24750 17500 PD 4950 17500 PD 4950 17500 PU 4750 17500 PD 4950 16500 PU 4750
16500 PD 4950 15500 PU 4750 15500 PD 4950 14500 PU 4600 14500 PD 4950 13500 PU
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PU 4750 10500 PD 4950 9500 PU 4600 9500 PD 4950 8500 PU 4750 8500 PD 4950 7500
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PD 9709 13390 PD 9752 13365 PD 9796 13339 PD 9839 13312 PD 9882 13286 PD 9900
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PD 10150 13114 PD 10191 13086 PD 10233 13058 PD 10275 13030 PD 10316 13001 PD
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PU 17520 8649 PD 17569 8660 PD 17618 8671 PD 17666 8683 PD 17715 8696 PD 17764
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PD 24655 13641 PD 24700 13662 PD 24744 13683 PD 24750 13685 PD 24750 13685 PD
ST
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7352 PD 14958 7352 PD 14850 7540 PD 18150 6989 PU 18042 6801 PD 18258 6801 PD
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16270 PU 24642 16082 PD 24858 16082 PD 24750 16270 PD 8250 16735 PU 8142 16548
PD 8358 16548 PD 8250 16735 PD 11550 13163 PU 11442 12976 PD 11658 12976 PD
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PU 6256 16811 PD 6472 16811 PD 6364 16998 PD 9193 16094 PU 9085 15907 PD 9301
15907 PD 9193 16094 PD 12021 12381 PU 11913 12193 PD 12130 12193 PD 12021 12381
PD 14850 7558 PU 14742 7370 PD 14958 7370 PD 14850 7558 PD 17325 6315 PU 17217
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PD 7533 16846 PD 7425 17033 PD 9900 15397 PU 9792 15210 PD 10008 15210 PD 9900
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PU 4842 16095 PD 5058 16095 PD 4950 16283 PD 14850 7559 PU 14742 7372 PD 14958
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PD 23650 15229 PD 6050 16911 PU 5942 16723 PD 6158 16723 PD 6050 16911 PD 8250
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PD
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PD 23958 15264 PD 23850 15451 PD 5850 16831 PU 5742 16644 PD 5958 16644 PD 5850
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PD 7823 16916 PD 7834 16910 PD 7975 16821 PU 8001 16804 PD 8041 16776 PD 8044
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PD 8760 16205 PU 8793 16175 PD 8822 16149 PD 8944 16037 PU 8946 16035 PD 8982
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PU 10167 14782 PD 10200 14745 PD 10219 14723 PD 10329 14598 PU 10333 14593 PD
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PD 10963 13826 PU 10980 13804 PD 11010 13765 PD 11014 13760 PD 11114 13627 PU
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PD 12764 11029 PD 12845 10883 PU 12868 10841 PD 12870 10838 PD 12885 10810 PD
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17193 6478 PD 17208 6486 PD 17350 6572 PU 17364 6581 PD 17404 6608 PD 17419
6618
PD 17554 6717 PU 17562 6723 PD 17601 6754 PD 17619 6768 PD 17746 6875 PU 17759
6886 PD 17799 6921 PD 17809 6930 PD 17931 7044 PU 17961 7073 PD 17991 7102 PD
18108 7220 PU 18137 7249 PD 18166 7280 PD 18280 7401 PU 18313 7437 PD 18315
7439
PD 18336 7462 PD 18447 7586 PU 18479 7622 PD 18502 7649 PD 18611 7774 PU 18643
7811 PD 18665 7838 PD 18773 7965 PU 18774 7966 PD 18807 8005 PD 18810 8009 PD
18826 8029 PD 18932 8157 PU 18936 8162 PD 18968 8201 PD 18985 8221 PD 19090
8350
PU 19094 8355 PD 19126 8394 PD 19143 8415 PD 19247 8545 PU 19253 8551 PD 19284
8590 PD 19300 8609 PD 19404 8739 PU 19430 8772 PD 19456 8804 PD 19560 8934 PU
19586 8967 PD 19612 8999 PD 19716 9130 PU 19742 9163 PD 19767 9195 PD 19871
9325
PU 19893 9353 PD 19923 9390 PD 20027 9520 PU 20049 9548 PD 20078 9586 PD 20182
9716 PU 20204 9744 PD 20234 9781 PD 20337 9912 PU 20357 9936 PD 20388 9976 PD
20389 9977 PD 20492 10108 PU 20511 10132 PD 20542 10171 PD 20544 10173 PD 20646
10304 PU 20666 10329 PD 20697 10368 PD 20698 10369 PD 20800 10501 PU 20820
10526
PD 20851 10566 PD 20851 10566 PD 20953 10698 PU 20972 10723 PD 21003 10762 PD
21004 10764 PD 21105 10896 PU 21125 10921 PD 21155 10961 PD 21156 10962 PD
21256
11095 PU 21277 11122 PD 21285 11133 PD 21306 11161 PD 21406 11295 PU 21433
11331
PD 21455 11362 PD 21554 11496 PU 21581 11532 PD 21603 11563 PD 21701 11698 PU
21728 11736 PD 21749 11766 PD 21846 11901 PU 21865 11929 PD 21894 11969 PD
21894
11969 PD 21990 12106 PU 22008 12132 PD 22037 12173 PD 22037 12174 PD 22132
12311
PU 22151 12338 PD 22179 12380 PD 22272 12517 PU 22275 12521 PD 22303 12562 PD
22319 12586 PD 22412 12725 PU 22413 12727 PD 22440 12768 PD 22458 12794 PD
22550
12933 PU 22551 12935 PD 22578 12976 PD 22595 13002 PD 22686 13142 PU 22689
13145
PD 22716 13187 PD 22732 13211 PD 22823 13351 PU 22824 13353 PD 22851 13395 PD
22868 13421 PD 22958 13561 PU 22959 13563 PD 22986 13605 PD 23003 13631 PD
23093
13771 PU 23094 13774 PD 23121 13816 PD 23138 13841 PD 23227 13981 PU 23230
13985
PD 23257 14027 PD 23265 14040 PD 23272 14051 PD 23362 14192 PU 23374 14209 PD
23401 14252 PD 23407 14262 PD 23498 14402 PU 23510 14420 PD 23537 14462 PD
23543
14471 PD 23633 14611 PU 23646 14630 PD 23673 14671 PD 23679 14681 PD 23771
14820
PU 23788 14846 PD 23817 14889 PD 23817 14889 PD 23909 15027 PU 23930 15058 PD
23956 15096 PD 24050 15234 PU 24071 15264 PD 24098 15302 PD 24193 15438 PU
24213
15466 PD 24241 15505 PD 24242 15506 PD 24340 15640 PU 24347 15650 PD 24378
15691
PD 24390 15707 PD 24490 15840 PU 24501 15853 PD 24531 15892 PD 24542 15905 PD
24646 16035 PU 24654 16046 PD 24685 16083 PD 24699 16099 PD ST 1 SP NP 14850
6812 PU 14850 6547 PD 14735 6613 PU 14965 6746 PD 14965 6613 PU 14735 6746 PD
18810 6134 PU 18810 5869 PD 18695 5935 PU 18925 6068 PD 18925 5935 PU 18695
6068
PD 22770 8546 PU 22770 8281 PD 22655 8348 PU 22885 8480 PD 22885 8348 PU 22655
8480 PD 6930 10337 PU 6930 10072 PD 6815 10139 PU 7045 10271 PD 7045 10139 PU
6815 10271 PD 10890 9449 PU 10890 9184 PD 10775 9250 PU 11005 9383 PD 11005
9250
PU 10775 9383 PD 14850 6813 PU 14850 6548 PD 14735 6614 PU 14965 6746 PD 14965
6614 PU 14735 6746 PD 18150 5967 PU 18150 5702 PD 18035 5769 PU 18265 5901 PD
18265 5769 PU 18035 5901 PD 21450 7621 PU 21450 7356 PD 21335 7422 PU 21565
7555
PD 21565 7422 PU 21335 7555 PD 24750 9721 PU 24750 9457 PD 24635 9523 PU 24865
9655 PD 24865 9523 PU 24635 9655 PD 8250 10355 PU 8250 10090 PD 8135 10156 PU
8365 10288 PD 8365 10156 PU 8135 10288 PD 11550 9059 PU 11550 8795 PD 11435
8861
PU 11665 8993 PD 11665 8861 PU 11435 8993 PD 4950 9721 PU 4950 9457 PD 4835
9523
PU 5065 9655 PD 5065 9523 PU 4835 9655 PD 14850 6813 PU 14850 6548 PD 14735
6614
PU 14965 6746 PD 14965 6614 PU 14735 6746 PD 17679 5918 PU 17679 5653 PD 17564
5719 PU 17793 5851 PD 17793 5719 PU 17564 5851 PD 20507 6987 PU 20507 6722 PD
20392 6788 PU 20622 6921 PD 20622 6788 PU 20392 6921 PD 23336 8923 PU 23336
8658
PD 23221 8724 PU 23450 8856 PD 23450 8724 PU 23221 8856 PD 6364 10232 PU 6364
9967 PD 6250 10033 PU 6479 10166 PD 6479 10033 PU 6250 10166 PD 9193 10167 PU
9193 9902 PD 9078 9968 PU 9308 10101 PD 9308 9968 PU 9078 10101 PD 12021 8754
PU
12021 8489 PD 11907 8555 PU 12136 8688 PD 12136 8555 PU 11907 8688 PD 14850
6813
PU 14850 6548 PD 14735 6614 PU 14965 6746 PD 14965 6614 PU 14735 6746 PD 17325
5920 PU 17325 5655 PD 17210 5721 PU 17440 5854 PD 17440 5721 PU 17210 5854 PD
19800 6571 PU 19800 6306 PD 19685 6373 PU 19915 6505 PD 19915 6373 PU 19685
6505
PD 22275 8203 PU 22275 7938 PD 22160 8005 PU 22390 8137 PD 22390 8005 PU 22160
8137 PD 24750 9722 PU 24750 9457 PD 24635 9523 PU 24865 9655 PD 24865 9523 PU
24635 9655 PD 7425 10383 PU 7425 10119 PD 7310 10185 PU 7540 10317 PD 7540
10185
PU 7310 10317 PD 9900 9923 PU 9900 9658 PD 9785 9724 PU 10015 9857 PD 10015
9724
PU 9785 9857 PD 12375 8514 PU 12375 8249 PD 12260 8315 PU 12490 8448 PD 12490
8315 PU 12260 8448 PD 4950 9722 PU 4950 9457 PD 4835 9523 PU 5065 9655 PD 5065
9523 PU 4835 9655 PD 14850 6813 PU 14850 6548 PD 14735 6614 PU 14965 6746 PD
14965 6614 PU 14735 6746 PD 17050 5946 PU 17050 5681 PD 16935 5747 PU 17165
5880
PD 17165 5747 PU 16935 5880 PD 19250 6304 PU 19250 6039 PD 19135 6105 PU 19365
6238 PD 19365 6105 PU 19135 6238 PD 21450 7621 PU 21450 7356 PD 21335 7422 PU
21565 7555 PD 21565 7422 PU 21335 7555 PD 23650 9120 PU 23650 8855 PD 23535
8921
PU 23765 9054 PD 23765 8921 PU 23535 9054 PD 6050 10148 PU 6050 9883 PD 5935
9949 PU 6165 10081 PD 6165 9949 PU 5935 10081 PD 8250 10355 PU 8250 10090 PD
8135 10156 PU 8365 10289 PD 8365 10156 PU 8135 10289 PD 10450 9677 PU 10450
9412
PD 10335 9478 PU 10565 9610 PD 10565 9478 PU 10335 9610 PD 12650 8322 PU 12650
8057 PD 12535 8123 PU 12765 8256 PD 12765 8123 PU 12535 8256 PD 14850 6813 PU
14850 6548 PD 14735 6614 PU 14965 6746 PD 14965 6614 PU 14735 6746 PD 16830
5981
PU 16830 5717 PD 16715 5783 PU 16945 5915 PD 16945 5783 PU 16715 5915 PD 18810
6135 PU 18810 5870 PD 18695 5936 PU 18925 6068 PD 18925 5936 PU 18695 6068 PD
20790 7170 PU 20790 6905 PD 20675 6971 PU 20905 7104 PD 20905 6971 PU 20675
7104
PD 22770 8547 PU 22770 8282 PD 22655 8348 PU 22885 8481 PD 22885 8348 PU 22655
8481 PD 24750 9722 PU 24750 9457 PD 24635 9523 PU 24865 9655 PD 24865 9523 PU
24635 9655 PD 6930 10339 PU 6930 10074 PD 6815 10140 PU 7045 10272 PD 7045
10140
PU 6815 10272 PD 8910 10240 PU 8910 9976 PD 8795 10042 PU 9025 10174 PD 9025
10042 PU 8795 10174 PD 10890 9448 PU 10890 9183 PD 10775 9249 PU 11005 9382 PD
11005 9249 PU 10775 9382 PD 12870 8167 PU 12870 7902 PD 12755 7968 PU 12985
8100
PD 12985 7968 PU 12755 8100 PD 4950 9722 PU 4950 9457 PD 4835 9523 PU 5065 9655
PD 5065 9523 PU 4835 9655 PD 14850 6813 PU 14850 6548 PD 14735 6614 PU 14965
6746 PD 14965 6614 PU 14735 6746 PD 16650 6020 PU 16650 5755 PD 16535 5821 PU
16765 5954 PD 16765 5821 PU 16535 5954 PD 18450 6030 PU 18450 5765 PD 18335
5831
PU 18565 5964 PD 18565 5831 PU 18335 5964 PD 20250 6828 PU 20250 6563 PD 20135
6629 PU 20365 6762 PD 20365 6629 PU 20135 6762 PD 22050 8045 PU 22050 7780 PD
21935 7846 PU 22165 7978 PD 22165 7846 PU 21935 7978 PD 23850 9240 PU 23850
8975
PD 23735 9042 PU 23965 9174 PD 23965 9042 PU 23735 9174 PD 5850 10085 PU 5850
9820 PD 5735 9886 PU 5965 10019 PD 5965 9886 PU 5735 10019 PD 7650 10388 PU
7650
10124 PD 7535 10190 PU 7765 10322 PD 7765 10190 PU 7535 10322 PD 9450 10088 PU
9450 9823 PD 9335 9889 PU 9565 10022 PD 9565 9889 PU 9335 10022 PD 11250 9242
PU
11250 8977 PD 11135 9044 PU 11365 9176 PD 11365 9044 PU 11135 9176 PD 13050
8038
PU 13050 7774 PD 12935 7840 PU 13165 7972 PD 13165 7840 PU 12935 7972 PD 14850
6813 PU 14850 6548 PD 14735 6614 PU 14965 6746 PD 14965 6614 PU 14735 6746 PD
16500 6059 PU 16500 5794 PD 16385 5860 PU 16615 5992 PD 16615 5860 PU 16385
5992
PD 18150 5967 PU 18150 5702 PD 18035 5769 PU 18265 5901 PD 18265 5769 PU 18035
5901 PD 19800 6571 PU 19800 6306 PD 19685 6373 PU 19915 6505 PD 19915 6373 PU
19685 6505 PD 21450 7621 PU 21450 7356 PD 21335 7422 PU 21565 7555 PD 21565
7422
PU 21335 7555 PD 23100 8769 PU 23100 8504 PD 22985 8570 PU 23215 8703 PD 23215
8570 PU 22985 8703 PD 24750 9722 PU 24750 9457 PD 24635 9523 PU 24865 9655 PD
24865 9523 PU 24635 9655 PD 6600 10284 PU 6600 10019 PD 6485 10085 PU 6715
10217
PD 6715 10085 PU 6485 10217 PD 8250 10355 PU 8250 10090 PD 8135 10156 PU 8365
10289 PD 8365 10156 PU 8135 10289 PD 9900 9923 PU 9900 9658 PD 9785 9724 PU
10015 9857 PD 10015 9724 PU 9785 9857 PD 11550 9059 PU 11550 8794 PD 11435 8861
PU 11665 8993 PD 11665 8861 PU 11435 8993 PD 13200 7931 PU 13200 7666 PD 13085
7733 PU 13315 7865 PD 13315 7733 PU 13085 7865 PD 4950 9722 PU 4950 9457 PD
4835
9523 PU 5065 9655 PD 5065 9523 PU 4835 9655 PD ST 1 SP NP 4950 9589 PU 4996
9611
PD 5041 9633 PD 5087 9654 PD 5132 9676 PD 5178 9696 PD 5224 9717 PD 5252 9730
PD
5405 9795 PU 5406 9796 PD 5445 9812 PD 5482 9827 PD 5637 9886 PU 5681 9902 PD
5728 9918 PD 5775 9934 PD 5822 9950 PD 5869 9965 PD 5916 9980 PD 5940 9988 PD
5953 9992 PD 6113 10038 PU 6134 10043 PD 6182 10056 PD 6194 10059 PD 6355 10099
PU 6375 10103 PD 6424 10114 PD 6435 10117 PD 6484 10127 PD 6534 10137 PD 6583
10146 PD 6632 10156 PD 6681 10164 PD 6682 10164 PD 6846 10190 PU 6879 10194 PD
6928 10201 PD 6929 10201 PD 7094 10220 PU 7129 10223 PD 7179 10228 PD 7229
10232
PD 7279 10235 PD 7329 10238 PD 7378 10241 PD 7425 10243 PD 7426 10243 PD 7593
10248 PU 7625 10249 PD 7675 10249 PD 7676 10249 PD 7842 10247 PU 7875 10246 PD
7920 10245 PD 7970 10242 PD 8020 10240 PD 8070 10237 PD 8119 10234 PD 8169
10230
PD 8175 10229 PD 8341 10213 PU 8369 10210 PD 8415 10205 PD 8423 10204 PD 8588
10181 PU 8612 10178 PD 8662 10170 PD 8711 10161 PD 8760 10153 PD 8810 10143 PD
8859 10134 PD 8908 10124 PD 8910 10123 PD 8916 10122 PD 9078 10086 PU 9104
10079
PD 9152 10067 PD 9159 10066 PD 9320 10022 PU 9346 10015 PD 9395 10001 PD 9405
9997 PD 9452 9983 PD 9499 9968 PD 9547 9953 PD 9594 9937 PD 9638 9922 PD 9794
9866 PU 9830 9853 PD 9872 9836 PD 10026 9774 PU 10037 9769 PD 10083 9750 PD
10129 9730 PD 10174 9710 PD 10220 9689 PD 10266 9668 PD 10311 9647 PD 10330
9638
PD 10480 9564 PU 10483 9562 PD 10527 9540 PD 10554 9526 PD 10701 9448 PU 10704
9446 PD 10748 9422 PD 10792 9398 PD 10836 9373 PD 10880 9347 PD 10890 9342 PD
10933 9317 PD 10975 9292 PD 10990 9283 PD 11132 9197 PU 11145 9189 PD 11188
9162
PD 11203 9153 PD 11343 9063 PU 11358 9054 PD 11385 9036 PD 11426 9009 PD 11468
8982 PD 11509 8954 PD 11550 8927 PD 11591 8899 PD 11621 8879 PD 11758 8784 PU
11798 8756 PD 11826 8737 PD 11961 8640 PU 12001 8612 PD 12042 8582 PD 12082
8553
PD 12123 8524 PD 12163 8494 PD 12204 8465 PD 12231 8445 PD 12365 8346 PU 12365
8346 PD 12375 8338 PD 12415 8309 PD 12432 8296 PD 12565 8197 PU 12576 8189 PD
12616 8160 PD 12656 8130 PD 12696 8100 PD 12736 8070 PD 12776 8040 PD 12816
8010
PD 12833 7998 PD 12966 7899 PU 12991 7881 PD 13031 7851 PD 13033 7849 PD 13167
7751 PU 13193 7732 PD 13233 7703 PD 13273 7674 PD 13314 7645 PD 13354 7616 PD
13365 7608 PD 13406 7578 PD 13438 7556 PD 13574 7460 PU 13612 7434 PD 13642
7413
PD 13779 7319 PU 13817 7293 PD 13858 7266 PD 13860 7265 PD 13902 7237 PD 13945
7209 PD 13987 7181 PD 14029 7154 PD 14058 7136 PD 14199 7047 PU 14241 7022 PD
14270 7004 PD 14413 6919 PU 14443 6901 PD 14486 6876 PD 14530 6851 PD 14574
6827
PD 14618 6803 PD 14662 6779 PD 14704 6756 PD 14851 6680 PU 14895 6658 PD 14926
6643 PD 15076 6571 PU 15077 6570 PD 15123 6549 PD 15168 6529 PD 15214 6509 PD
15259 6489 PD 15304 6470 PD 15345 6453 PD 15381 6438 PD 15537 6378 PU 15580
6362
PD 15615 6349 PD 15772 6295 PU 15815 6281 PD 15840 6273 PD 15888 6258 PD 15937
6244 PD 15985 6230 PD 16033 6216 PD 16081 6203 PD 16091 6200 PD 16253 6160 PU
16275 6154 PD 16323 6143 PD 16334 6141 PD 16497 6107 PU 16532 6101 PD 16581
6092
PD 16630 6083 PD 16680 6075 PD 16729 6068 PD 16778 6061 PD 16826 6054 PD 16991
6035 PU 17029 6031 PD 17074 6027 PD 17240 6014 PU 17278 6012 PD 17325 6010 PD
17375 6008 PD 17425 6006 PD 17475 6005 PD 17525 6004 PD 17573 6004 PD 17739
6006
PU 17775 6007 PD 17820 6009 PD 17822 6009 PD 17989 6018 PU 18019 6020 PD 18069
6024 PD 18119 6028 PD 18169 6033 PD 18219 6038 PD 18268 6044 PD 18315 6049 PD
18320 6050 PD 18485 6073 PU 18512 6078 PD 18561 6086 PD 18567 6087 PD 18731
6117
PU 18759 6123 PD 18808 6133 PD 18810 6134 PD 18858 6144 PD 18907 6155 PD 18955
6167 PD 19003 6179 PD 19052 6191 PD 19055 6192 PD 19216 6236 PU 19245 6245 PD
19294 6259 PD 19295 6260 PD 19454 6311 PU 19493 6324 PD 19541 6341 PD 19588
6358
PD 19635 6375 PD 19682 6393 PD 19729 6411 PD 19766 6426 PD 19920 6489 PU 19937
6496 PD 19982 6516 PD 19997 6522 PD 20148 6591 PU 20165 6599 PD 20210 6621 PD
20256 6643 PD 20295 6663 PD 20339 6685 PD 20383 6707 PD 20427 6730 PD 20446
6740
PD 20593 6819 PU 20603 6825 PD 20647 6849 PD 20665 6860 PD 20809 6943 PU 20832
6956 PD 20875 6982 PD 20917 7007 PD 20960 7033 PD 21002 7059 PD 21044 7086 PD
21087 7112 PD 21094 7117 PD 21234 7207 PU 21256 7222 PD 21285 7240 PD 21303
7252
PD 21441 7345 PU 21450 7351 PD 21491 7379 PD 21532 7407 PD 21573 7436 PD 21614
7464 PD 21656 7493 PD 21697 7522 PD 21715 7535 PD 21850 7632 PU 21861 7639 PD
21901 7668 PD 21918 7680 PD 22053 7778 PU 22063 7786 PD 22103 7815 PD 22143
7845
PD 22184 7875 PD 22224 7905 PD 22264 7935 PD 22275 7942 PD 22315 7972 PD 22320
7976 PD 22454 8076 PU 22476 8092 PD 22516 8121 PD 22521 8125 PD 22654 8225 PU
22676 8241 PD 22716 8271 PD 22756 8301 PD 22770 8311 PD 22810 8341 PD 22851
8370
PD 22891 8400 PD 22922 8423 PD 23056 8521 PU 23093 8548 PD 23124 8570 PD 23259
8667 PU 23265 8672 PD 23306 8701 PD 23347 8730 PD 23389 8759 PD 23430 8788 PD
23471 8817 PD 23512 8845 PD 23531 8858 PD 23669 8952 PU 23677 8957 PD 23718
8984
PD 23738 8998 PD 23878 9089 PU 23887 9095 PD 23930 9122 PD 23972 9149 PD 24015
9176 PD 24057 9202 PD 24099 9228 PD 24142 9254 PD 24161 9265 PD 24304 9349 PU
24343 9372 PD 24376 9391 PD 24522 9471 PU 24563 9493 PD 24607 9516 PD 24651
9539
PD 24695 9561 PD 24739 9583 PD 24750 9589 PD 24750 9589 PD ST 1 SP NP 14742
5053
PU 14850 4866 PD 14958 5053 PD 14742 5053 PD 18702 4537 PU 18810 4349 PD 18918
4537 PD 18702 4537 PD 22662 5635 PU 22770 5448 PD 22878 5635 PD 22662 5635 PD
6822 6694 PU 6930 6507 PD 7038 6694 PD 6822 6694 PD 10782 6376 PU 10890 6189 PD
10998 6376 PD 10782 6376 PD 14742 5053 PU 14850 4866 PD 14958 5053 PD 14742
5053
PD 18042 4494 PU 18150 4307 PD 18258 4494 PD 18042 4494 PD 21342 5168 PU 21450
4981 PD 21558 5168 PD 21342 5168 PD 24642 6290 PU 24750 6103 PD 24858 6290 PD
24642 6290 PD 8142 6759 PU 8250 6572 PD 8358 6759 PD 8142 6759 PD 11442 6189 PU
11550 6002 PD 11658 6189 PD 11442 6189 PD 4842 6290 PU 4950 6103 PD 5058 6290
PD
4842 6290 PD 14742 5054 PU 14850 4866 PD 14958 5054 PD 14742 5054 PD 17570 4498
PU 17679 4311 PD 17787 4498 PD 17570 4498 PD 20399 4875 PU 20507 4687 PD 20615
4875 PD 20399 4875 PD 23228 5836 PU 23336 5649 PD 23444 5836 PD 23228 5836 PD
6256 6271 PU 6364 6084 PD 6472 6271 PD 6256 6271 PD 9085 6698 PU 9193 6511 PD
9301 6698 PD 9085 6698 PD 11913 6040 PU 12021 5852 PD 12130 6040 PD 11913 6040
PD 14742 5054 PU 14850 4866 PD 14958 5054 PD 14742 5054 PD 17217 4519 PU 17325
4332 PD 17433 4519 PD 17217 4519 PD 19692 4698 PU 19800 4511 PD 19908 4698 PD
19692 4698 PD 22167 5457 PU 22275 5270 PD 22383 5457 PD 22167 5457 PD 24642
5930
PU 24750 5742 PD 24858 5930 PD 24642 5930 PD 7317 6739 PU 7425 6552 PD 7533
6739
PD 7317 6739 PD 9792 6595 PU 9900 6407 PD 10008 6595 PD 9792 6595 PD 12267 5921
PU 12375 5733 PD 12483 5921 PD 12267 5921 PD 4842 5930 PU 4950 5742 PD 5058
5930
PD 4842 5930 PD 14742 5054 PU 14850 4866 PD 14958 5054 PD 14742 5054 PD 16942
4547 PU 17050 4359 PD 17158 4547 PD 16942 4547 PD 19142 4595 PU 19250 4407 PD
19358 4595 PD 19142 4595 PD 21342 5168 PU 21450 4981 PD 21558 5168 PD 21342
5168
PD 23542 5945 PU 23650 5758 PD 23758 5945 PD 23542 5945 PD 5942 6413 PU 6050
6226 PD 6158 6413 PD 5942 6413 PD 8142 6721 PU 8250 6533 PD 8358 6721 PD 8142
6721 PD 10342 6483 PU 10450 6296 PD 10558 6483 PD 10342 6483 PD 12542 5825 PU
12650 5638 PD 12758 5825 PD 12542 5825 PD 14742 5054 PU 14850 4866 PD 14958
5054
PD 14742 5054 PD 16722 4575 PU 16830 4388 PD 16938 4575 PD 16722 4575 PD 18702
4537 PU 18810 4349 PD 18918 4537 PD 18702 4537 PD 20682 4957 PU 20790 4769 PD
20898 4957 PD 20682 4957 PD 22662 5597 PU 22770 5410 PD 22878 5597 PD 22662
5597
PD 24642 6290 PU 24750 6103 PD 24858 6290 PD 24642 6290 PD 6822 6694 PU 6930
6507 PD 7038 6694 PD 6822 6694 PD 8802 6726 PU 8910 6538 PD 9018 6726 PD 8802
6726 PD 10782 6376 PU 10890 6188 PD 10998 6376 PD 10782 6376 PD 12762 5748 PU
12870 5560 PD 12978 5748 PD 12762 5748 PD 4842 6290 PU 4950 6103 PD 5058 6290
PD
4842 6290 PD 14742 5054 PU 14850 4866 PD 14958 5054 PD 14742 5054 PD 16542 4603
PU 16650 4415 PD 16758 4603 PD 16542 4603 PD 18342 4507 PU 18450 4319 PD 18558
4507 PD 18342 4507 PD 20142 4805 PU 20250 4618 PD 20358 4805 PD 20142 4805 PD
21942 5376 PU 22050 5189 PD 22158 5376 PD 21942 5376 PD 23742 5953 PU 23850
5766
PD 23958 5953 PD 23742 5953 PD 5742 6515 PU 5850 6328 PD 5958 6515 PD 5742 6515
PD 7542 6735 PU 7650 6547 PD 7758 6735 PD 7542 6735 PD 9342 6402 PU 9450 6215
PD
9558 6402 PD 9342 6402 PD 11142 6277 PU 11250 6090 PD 11358 6277 PD 11142 6277
PD 12942 5683 PU 13050 5496 PD 13158 5683 PD 12942 5683 PD 14742 5054 PU 14850
4866 PD 14958 5054 PD 14742 5054 PD 16392 4628 PU 16500 4441 PD 16608 4628 PD
16392 4628 PD 18042 4494 PU 18150 4307 PD 18258 4494 PD 18042 4494 PD 19692
4698
PU 19800 4511 PD 19908 4698 PD 19692 4698 PD 21342 5168 PU 21450 4981 PD 21558
5168 PD 21342 5168 PD 22992 5753 PU 23100 5566 PD 23208 5753 PD 22992 5753 PD
24642 6290 PU 24750 6103 PD 24858 6290 PD 24642 6290 PD 6492 6486 PU 6600 6299
PD 6708 6486 PD 6492 6486 PD 8142 6760 PU 8250 6572 PD 8358 6760 PD 8142 6760
PD
9792 6595 PU 9900 6407 PD 10008 6595 PD 9792 6595 PD 11442 6189 PU 11550 6002
PD
11658 6189 PD 11442 6189 PD 13092 5629 PU 13200 5442 PD 13308 5629 PD 13092
5629
PD 4842 6290 PU 4950 6103 PD 5058 6290 PD 4842 6290 PD ST 1 SP NP 4950 6228 PU
4998 6241 PD 5047 6255 PD 5095 6268 PD 5143 6281 PD 5192 6294 PD 5240 6307 PD
5288 6320 PD 5337 6332 PD 5385 6344 PD 5433 6357 PD 5445 6360 PD 5494 6372 PD
5542 6383 PD 5591 6395 PD 5640 6407 PD 5689 6418 PD 5737 6429 PD 5757 6433 PD
5919 6468 PU 5932 6471 PD 5940 6472 PD 5989 6482 PD 6001 6485 PD 6164 6517 PU
6186 6521 PD 6235 6530 PD 6284 6538 PD 6333 6547 PD 6382 6555 PD 6432 6564 PD
6435 6564 PD 6485 6572 PD 6534 6580 PD 6584 6587 PD 6633 6594 PD 6683 6601 PD
6732 6608 PD 6782 6615 PD 6831 6621 PD 6881 6627 PD 6930 6633 PD 6980 6639 PD
6988 6639 PD 7153 6656 PU 7179 6659 PD 7229 6663 PD 7236 6664 PD 7402 6676 PU
7425 6678 PD 7475 6681 PD 7525 6684 PD 7575 6687 PD 7625 6689 PD 7675 6691 PD
7725 6693 PD 7775 6695 PD 7825 6696 PD 7875 6697 PD 7920 6698 PD 7970 6699 PD
8020 6699 PD 8070 6699 PD 8120 6699 PD 8170 6698 PD 8220 6698 PD 8234 6698 PD
8400 6693 PU 8415 6693 PD 8465 6691 PD 8484 6690 PD 8650 6682 PU 8665 6681 PD
8714 6678 PD 8764 6674 PD 8814 6671 PD 8864 6667 PD 8910 6663 PD 8960 6659 PD
9009 6654 PD 9059 6649 PD 9109 6644 PD 9159 6639 PD 9208 6633 PD 9258 6628 PD
9308 6622 PD 9357 6615 PD 9405 6609 PD 9454 6602 PD 9478 6599 PD 9643 6575 PU
9652 6573 PD 9701 6565 PD 9725 6562 PD 9889 6534 PU 9899 6532 PD 9900 6532 PD
9949 6523 PD 9998 6514 PD 10047 6504 PD 10096 6495 PD 10145 6485 PD 10194 6475
PD 10243 6465 PD 10292 6455 PD 10341 6444 PD 10390 6434 PD 10395 6432 PD 10444
6422 PD 10492 6411 PD 10541 6399 PD 10589 6388 PD 10638 6376 PD 10687 6364 PD
10703 6360 PD 10865 6320 PU 10881 6315 PD 10890 6313 PD 10938 6301 PD 10945
6299
PD 11106 6255 PU 11131 6248 PD 11179 6235 PD 11227 6221 PD 11275 6208 PD 11324
6194 PD 11372 6180 PD 11385 6176 PD 11433 6162 PD 11481 6148 PD 11528 6133 PD
11576 6119 PD 11624 6104 PD 11672 6089 PD 11720 6075 PD 11767 6060 PD 11815
6044
PD 11863 6029 PD 11880 6024 PD 11903 6016 PD 12062 5965 PU 12070 5962 PD 12117
5946 PD 12141 5938 PD 12298 5885 PU 12307 5882 PD 12354 5866 PD 12375 5859 PD
12422 5843 PD 12469 5827 PD 12517 5810 PD 12564 5794 PD 12611 5777 PD 12658
5761
PD 12705 5744 PD 12753 5728 PD 12800 5711 PD 12847 5694 PD 12870 5686 PD 12917
5669 PD 12964 5652 PD 13011 5636 PD 13058 5619 PD 13084 5609 PD 13240 5553 PU
13246 5551 PD 13293 5534 PD 13319 5525 PD 13475 5468 PU 13506 5457 PD 13553
5440
PD 13600 5423 PD 13647 5406 PD 13694 5389 PD 13741 5372 PD 13788 5356 PD 13835
5339 PD 13860 5330 PD 13907 5313 PD 13954 5296 PD 14002 5280 PD 14049 5263 PD
14096 5246 PD 14143 5230 PD 14190 5213 PD 14237 5197 PD 14260 5189 PD 14417
5135
PU 14450 5124 PD 14496 5108 PD 14654 5055 PU 14687 5044 PD 14734 5029 PD 14782
5013 PD 14829 4998 PD 14850 4991 PD 14898 4976 PD 14946 4961 PD 14993 4946 PD
15041 4931 PD 15089 4916 PD 15137 4902 PD 15185 4887 PD 15233 4873 PD 15280
4859
PD 15328 4845 PD 15345 4840 PD 15393 4826 PD 15442 4813 PD 15449 4810 PD 15610
4767 PU 15635 4760 PD 15683 4747 PD 15690 4745 PD 15852 4704 PU 15889 4695 PD
15938 4684 PD 15986 4672 PD 16035 4661 PD 16084 4650 PD 16133 4639 PD 16182
4628
PD 16230 4618 PD 16279 4608 PD 16328 4598 PD 16335 4597 PD 16384 4587 PD 16434
4578 PD 16483 4569 PD 16532 4560 PD 16581 4551 PD 16631 4543 PD 16667 4537 PD
16832 4512 PU 16880 4506 PD 16914 4501 PD 17079 4481 PU 17128 4475 PD 17178
4470
PD 17227 4465 PD 17277 4461 PD 17325 4457 PD 17375 4453 PD 17425 4449 PD 17475
4446 PD 17525 4443 PD 17575 4440 PD 17625 4438 PD 17675 4436 PD 17724 4434 PD
17774 4433 PD 17820 4431 PD 17870 4431 PD 17910 4430 PD 18076 4431 PU 18120
4431
PD 18160 4432 PD 18326 4438 PU 18365 4440 PD 18415 4442 PD 18465 4445 PD 18514
4449 PD 18564 4452 PD 18614 4456 PD 18664 4460 PD 18714 4465 PD 18764 4470 PD
18810 4474 PD 18860 4480 PD 18909 4486 PD 18959 4491 PD 19008 4498 PD 19058
4504
PD 19107 4511 PD 19154 4518 PD 19319 4543 PU 19354 4549 PD 19401 4557 PD 19565
4587 PU 19600 4594 PD 19649 4604 PD 19698 4614 PD 19747 4624 PD 19796 4634 PD
19800 4635 PD 19849 4646 PD 19897 4657 PD 19946 4668 PD 19994 4679 PD 20043
4691
PD 20092 4702 PD 20140 4714 PD 20189 4727 PD 20238 4739 PD 20286 4752 PD 20295
4754 PD 20343 4767 PD 20375 4775 PD 20536 4819 PU 20584 4833 PD 20616 4842 PD
20776 4889 PU 20776 4889 PD 20790 4893 PD 20838 4908 PD 20885 4922 PD 20933
4937
PD 20981 4951 PD 21028 4966 PD 21076 4981 PD 21124 4997 PD 21171 5012 PD 21219
5027 PD 21267 5043 PD 21285 5049 PD 21332 5065 PD 21380 5080 PD 21427 5096 PD
21474 5112 PD 21522 5128 PD 21568 5144 PD 21726 5198 PU 21758 5209 PD 21780
5217
PD 21804 5225 PD 21961 5281 PU 21968 5283 PD 22016 5300 PD 22063 5317 PD 22110
5333 PD 22157 5350 PD 22204 5367 PD 22251 5384 PD 22275 5392 PD 22322 5409 PD
22369 5426 PD 22416 5443 PD 22463 5460 PD 22510 5477 PD 22557 5494 PD 22604
5511
PD 22651 5528 PD 22698 5545 PD 22745 5562 PD 22902 5618 PU 22911 5621 PD 22958
5638 PD 22980 5646 PD 23137 5702 PU 23147 5706 PD 23194 5722 PD 23241 5739 PD
23265 5747 PD 23312 5764 PD 23359 5781 PD 23407 5797 PD 23454 5814 PD 23501
5830
PD 23549 5846 PD 23596 5863 PD 23643 5879 PD 23690 5895 PD 23738 5911 PD 23760
5918 PD 23808 5934 PD 23855 5950 PD 23903 5966 PD 23924 5973 PD 24082 6025 PU
24093 6028 PD 24140 6043 PD 24161 6050 PD 24320 6100 PU 24351 6110 PD 24399
6124
PD 24447 6139 PD 24494 6153 PD 24542 6168 PD 24590 6182 PD 24638 6196 PD 24686
6210 PD 24734 6223 PD 24750 6228 PD 24750 6228 PD ST 2 SP NP 9409 1260 PU 9409
1759 PD 9588 1492 PD 9766 1759 PD 9766 1260 PD 10248 1670 PU 10159 1759 PD
10016
1759 PD 9927 1670 PD 9927 1349 PD 10016 1260 PD 10159 1260 PD 10248 1349 PD
10248 1670 PD 10408 1260 PU 10408 1759 PD 10587 1492 PD 10765 1759 PD 10765
1260
PD 11247 1260 PU 10926 1260 PD 10926 1759 PD 11247 1759 PD 10926 1510 PU 11158
1510 PD 11425 1260 PU 11425 1759 PD 11746 1260 PD 11746 1759 PD 11907 1759 PU
12264 1759 PD 12085 1759 PU 12085 1260 PD 12424 1759 PU 12424 1349 PD 12513
1260
PD 12656 1260 PD 12745 1349 PD 12745 1759 PD 12906 1260 PU 12906 1759 PD 13084
1492 PD 13263 1759 PD 13263 1260 PD 14440 1260 PU 14440 1759 PD 14618 1759 PD
14690 1742 PD 14743 1688 PD 14743 1581 PD 14690 1528 PD 14618 1510 PD 14440
1510
PD 14939 1510 PU 15225 1510 PD 14939 1367 PU 15225 1367 PD 15956 1635 PU 15956
1688 PD 16028 1759 PD 16152 1759 PD 16224 1688 PD 16224 1599 PD 15938 1260 PD
16242 1260 PD 16474 1724 PU 16474 1260 PD 16474 1403 PU 16688 1599 PD 16545
1456
PU 16723 1260 PD 16902 1581 PU 17276 1581 PD 17187 1260 PU 17187 1581 PD 17009
1581 PU 16973 1260 PD 17437 1260 PU 17722 1759 PD 17918 1260 PU 17918 1759 PD
18240 1260 PD 18240 1759 PD 2856 8674 PU 2856 8305 PD 2281 8305 PD 2281 8674 PD
2569 8305 PU 2569 8572 PD 2856 8879 PU 2281 8879 PD 2856 9249 PD 2281 9249 PD
2856 9823 PU 2856 9454 PD 2281 9454 PD 2281 9823 PD 2569 9454 PU 2569 9720 PD
2569 10254 PU 2856 10397 PD 2856 10049 PU 2281 10049 PD 2281 10254 PD 2302
10336
PD 2363 10397 PD 2486 10397 PD 2548 10336 PD 2569 10254 PD 2569 10049 PD 2610
10828 PU 2610 10992 PD 2753 10992 PD 2856 10890 PD 2856 10705 PD 2753 10603 PD
2384 10603 PD 2281 10705 PD 2281 10890 PD 2384 10992 PD 2281 11156 PU 2589
11362
PD 2281 11567 PD 2589 11362 PU 2856 11362 PD 2856 11300 PU 2856 11423 PD 2856
13844 PU 2856 13475 PD 2281 13475 PD 2281 13844 PD 2569 13475 PU 2569 13741 PD
9954 16061 PU 9900 16007 PD 9900 15900 PD 9980 15847 PD 10087 15847 PD 10168
15900 PD 10168 16007 PD 10114 16061 PD 10074 16061 PD 10034 16021 PD 10034
15726
PD 10301 16007 PU 10515 16007 PD 10301 15900 PU 10515 15900 PD 10716 16088 PU
10810 16195 PD 10810 15820 PD 11064 16101 PU 11064 16141 PD 11117 16195 PD
11211
16195 PD 11265 16141 PD 11265 16074 PD 11051 15820 PD 11278 15820 PD 11639
16141
PU 11586 16195 PD 11479 16195 PD 11425 16141 PD 11425 15874 PD 11479 15820 PD
11586 15820 PD 11639 15874 PD 11639 16141 PD 11867 16195 PU 11827 16154 PD
11827
16114 PD 11867 16074 PD 11907 16074 PD 11947 16114 PD 11947 16154 PD 11907
16195
PD 11867 16195 PD 12174 15820 PU 12388 16195 PD 12536 16168 PU 12576 16195 PD
12629 16195 PD 12790 15820 PD 12696 16034 PU 12536 15820 PD 12924 16007 PU
13138
16007 PD 12924 15900 PU 13138 15900 PD 13512 16141 PU 13459 16195 PD 13352
16195
PD 13298 16141 PD 13298 15874 PD 13352 15820 PD 13459 15820 PD 13512 15874 PD
13512 16141 PD 13793 15820 PU 13753 15820 PD 13753 15860 PD 13793 15860 PD
13793
15820 PD 14047 15874 PU 14101 15820 PD 14208 15820 PD 14262 15874 PD 14262
15994
PD 14208 16047 PD 14101 16047 PD 14047 15994 PD 14047 16195 PD 14262 16195 PD
5472 13428 PU 5566 13535 PD 5566 13160 PD 5820 13441 PU 5820 13481 PD 5874
13535
PD 5967 13535 PD 6021 13481 PD 6021 13414 PD 5807 13160 PD 6034 13160 PD 6395
13481 PU 6342 13535 PD 6235 13535 PD 6181 13481 PD 6181 13214 PD 6235 13160 PD
6342 13160 PD 6395 13214 PD 6395 13481 PD 6623 13535 PU 6583 13494 PD 6583
13454
PD 6623 13414 PD 6663 13414 PD 6703 13454 PD 6703 13494 PD 6663 13535 PD 6623
13535 PD 6931 13160 PU 7145 13535 PD 7519 13481 PU 7466 13535 PD 7359 13535 PD
7305 13481 PD 7305 13214 PD 7359 13160 PD 7466 13160 PD 7519 13214 PD 7519
13481
PD 7800 13160 PU 7760 13160 PD 7760 13200 PD 7800 13200 PD 7800 13160 PD 8068
13441 PU 8068 13481 PD 8121 13535 PD 8215 13535 PD 8268 13481 PD 8268 13414 PD
8054 13160 PD 8282 13160 PD 8429 13214 PU 8483 13160 PD 8590 13160 PD 8643
13214
PD 8643 13334 PD 8590 13387 PD 8483 13387 PD 8429 13334 PD 8429 13535 PD 8643
13535 PD 5472 9368 PU 5566 9475 PD 5566 9100 PD 5807 9154 PU 5860 9100 PD 5967
9100 PD 6021 9154 PD 6021 9274 PD 5967 9327 PD 5860 9327 PD 5807 9274 PD 5807
9475 PD 6021 9475 PD 6395 9421 PU 6342 9475 PD 6235 9475 PD 6181 9421 PD 6181
9154 PD 6235 9100 PD 6342 9100 PD 6395 9154 PD 6395 9421 PD 6623 9475 PU 6583
9434 PD 6583 9394 PD 6623 9354 PD 6663 9354 PD 6703 9394 PD 6703 9434 PD 6663
9475 PD 6623 9475 PD 6931 9100 PU 7145 9475 PD 7519 9421 PU 7466 9475 PD 7359
9475 PD 7305 9421 PD 7305 9154 PD 7359 9100 PD 7466 9100 PD 7519 9154 PD 7519
9421 PD 7800 9100 PU 7760 9100 PD 7760 9140 PD 7800 9140 PD 7800 9100 PD 8068
9381 PU 8068 9421 PD 8121 9475 PD 8215 9475 PD 8268 9421 PD 8268 9354 PD 8054
9100 PD 8282 9100 PD 5459 5701 PU 5405 5647 PD 5405 5540 PD 5486 5487 PD 5593
5487 PD 5673 5540 PD 5673 5647 PD 5619 5701 PD 5579 5701 PD 5539 5661 PD 5539
5366 PD 5807 5647 PU 6021 5647 PD 5807 5540 PU 6021 5540 PD 6222 5728 PU 6315
5835 PD 6315 5460 PD 6556 5781 PU 6556 5835 PD 6770 5835 PD 6650 5460 PD 6971
5728 PU 7064 5835 PD 7064 5460 PD 7372 5835 PU 7332 5794 PD 7332 5754 PD 7372
5714 PD 7412 5714 PD 7452 5754 PD 7452 5794 PD 7412 5835 PD 7372 5835 PD 7680
5460 PU 7894 5835 PD 8041 5808 PU 8081 5835 PD 8135 5835 PD 8295 5460 PD 8202
5674 PU 8041 5460 PD 8429 5647 PU 8643 5647 PD 8429 5540 PU 8643 5540 PD 9018
5781 PU 8964 5835 PD 8857 5835 PD 8804 5781 PD 8804 5514 PD 8857 5460 PD 8964
5460 PD 9018 5514 PD 9018 5781 PD 9299 5460 PU 9259 5460 PD 9259 5500 PD 9299
5500 PD 9299 5460 PD 9593 5728 PU 9687 5835 PD 9687 5460 PD 4485 2672 PU 4728
2672 PD 4880 2793 PU 5198 2793 PD 5122 2520 PU 5122 2793 PD 4971 2793 PU 4940
2520 PD 9059 2672 PU 9302 2672 PD 9453 2793 PU 9772 2793 PD 9696 2520 PU 9696
2793 PD 9544 2793 PU 9514 2520 PD 9908 2520 PU 10151 2945 PD 10348 2838 PU
10348
2884 PD 10409 2945 PD 10515 2945 PD 10575 2884 PD 10575 2808 PD 10333 2520 PD
10591 2520 PD 14965 2884 PU 14904 2945 PD 14783 2945 PD 14722 2884 PD 14722
2581
PD 14783 2520 PD 14904 2520 PD 14965 2581 PD 14965 2884 PD 19325 2793 PU 19643
2793 PD 19567 2520 PU 19567 2793 PD 19416 2793 PU 19385 2520 PD 19780 2520 PU
20022 2945 PD 20219 2838 PU 20219 2884 PD 20280 2945 PD 20386 2945 PD 20447
2884
PD 20447 2808 PD 20204 2520 PD 20462 2520 PD 24572 2793 PU 24890 2793 PD 24814
2520 PU 24814 2793 PD 24663 2793 PU 24632 2520 PD ST 2 SP NP 1843 280 PU 1843
530 PD 2003 530 PD 1843 405 PU 1959 405 PD 2155 512 PU 2155 530 PD 2173 530 PD
2173 512 PD 2155 512 PD 2137 441 PU 2173 441 PD 2173 280 PD 2128 280 PU 2217
280
PD 2494 405 PU 2458 441 PD 2387 441 PD 2351 405 PD 2351 334 PD 2387 298 PD 2458
298 PD 2494 334 PD 2494 441 PU 2494 253 PD 2458 218 PD 2387 218 PD 2351 244 PD
2681 280 PU 2654 280 PD 2654 307 PD 2681 307 PD 2681 280 PD 2851 316 PU 2886
280
PD 2958 280 PD 2993 316 PD 2993 396 PD 2958 432 PD 2886 432 PD 2851 396 PD 2851
530 PD 2993 530 PD ST CL


