%Paper: 
%From: ROZANOV Alexandre <ROZANOV@crnvma.cern.ch>
%Date: Sat, 23 Apr 94 13:54:24 SET

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{CERN-TH.7217/94}
\end{flushright}
\vspace*{1mm}
\begin{center}
{\bf FIRST EVIDENCE FOR ELECTROWEAK}\
{\bf RADIATIVE CORRECTIONS FROM THE NEW }\
{\bf PRECISION DATA}\\
\vspace{0.3in}
{\bf  V.A. Novikov}$^{*)}$ ,\\
\vspace{0.1in}
University of Guelph, Guelph, ON, N1G2W1,\\
Canada\\
{\bf L.B.  Okun}$^{*)}$ ,\\
\vspace{0.1in}
Theoretical Physics Division, CERN\\
CH-1211 Geneva 23, Switzerland \\
\vspace{0.1in}
and \\
{\bf A.N. Rozanov}$^{**)}$,
{\bf M.I. Vysotsky}\\
\vspace{0.1in}
ITEP, Moscow, 117259, Russia\\
\vspace{0.5in}
 {\bf Abstract \\}
 \end{center}
The analysis of the newest data on the leptonic $Z$-decays
 and $m_W$ appears to reveal the first
manifestations of electroweak radiative corrections.
 In fact, these data differ,  at the level of
$2\sigma$, from their electroweak Born values,
while they agree, to within $1\sigma$, with the theoretical values
which take  the electroweak radiative corrections into account.
Previous data were within $1\sigma$ in agreement with
both sets of values.

\vspace{4cm}
\noindent
\rule[.1in]{14.0cm}{.002in}

\noindent
$^{\, *)}$ Permanent address: ITEP, Moscow 117259, Russia. \\
$^{**)}$ Present address:
Particle Physics Experiments Division, CERN\\
CH-1211  Geneva 23, Switzerland \\

\begin{flushleft}
CERN-TH.7217/94 \\
April 1994
\end{flushleft}
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The traditional way of analyzing the data on electroweak radiative
 corrections, (see
%for instance \cite{A}, \cite{B}, \cite{C}, is not to split off from them
for instance \cite{A} - \cite{C}), is to $not$ split off from them
the large and purely electromagnetic effect of the running of  the
electric charge from $q^2 = 0$ to $q^2 = m_Z^2$.
According to that approach, which starts from
\linebreak
 $\alpha \equiv \alpha(0) = 1/ 137.0359895(61)$,
the ``electroweak" corrections appear to be large and to have been
 observed for a long time.
By analyzing them, many authors \cite{topold} came already
 several years ago
 to the conclusion that the mass
 of the top quark must be close to 130 GeV or heavier.


 In  a series of papers
  \cite{th6053}-\cite{5} we developed an approach in which
the running of $\alpha(q^2)$ is
explicitly excluded from the genuinely electroweak corrections
 and included in
the electromagnetic ones.
Our main argument is that the running of $\alpha(q^2)$
up to $q^2 = m^2_Z$ is a purely
electromagnetic phenomenon which is totally insensitive to the
existence of electroweak bosons (W, Z and higgs), and that
 $\alpha(0)$,
with all its impressive accuracy, is wholly irrelevant to electroweak physics
even at low energy \cite{th7153}.
Our approach starts with the most accurately known
electroweak observables:
\begin{equation}
G_{\mu}= 1.16639(2)\cdot 10^{-5} \hspace{3mm}
\mbox{\rm GeV}^{-2}~, \hspace{2cm} \cite{rpd}
\label{1}
\end{equation}
\begin{equation}
m_Z = 91.1899(44) \hspace{3mm}
 \mbox{\rm GeV}~,  \hspace{2.4cm} \cite{6}
\label{2}
\end{equation}
\begin{equation}
\bar{\alpha}\equiv \alpha(m_Z) = 1/128.87(12)~, \hspace{2.1cm}
  \cite{jegerlehner}
\label{3}
\end{equation}
and has three free parameters: the top quark mass, $m_t$, the Higgs
 boson mass,
$m_H$, and the QCD coupling constant
 $\bar{\alpha}_s \equiv \alpha_s(m_Z)$.
The conventional nature of the definition on $\bar{\alpha}$ is analyzed in
\cite{th7071}.


In terms of $G_{\mu}, m_Z$ and $\bar{\alpha}$ we define the electroweak
angle $\theta$ ($sin\theta \equiv s, cos\theta \equiv c$)
\cite{th6053}, \cite{D}, \cite{peskin}:
\begin{equation}
s^2 c^2 = \frac{\pi \bar{\alpha}}{\sqrt{2} G_{\mu} m_Z^2},
\label{4}
\end{equation}
which is analogous to, but different from, the traditional $\theta_W$
($sin \theta_W \equiv s_W,$
$cos \theta_W \equiv c_W)$ defined by substituting  $\alpha$ instead of
 $\bar{\alpha}$ in eq.(\ref{4}).
By solving eq.(\ref{4}) one finds:
\begin{equation}
s^2 = 0.23118(33), \hspace{2cm}   c = 0.87682(19)
\label{5}
\end{equation}
In the $\bar{\alpha}$-Born approximation
\begin{equation}
m_W/m_Z = c = 0.8768(2),
\label{6}
\end{equation}
\begin{equation}
g_A = - 1/2,
\label{7}
\end{equation}
\begin{equation}
g_V/g_A = 1 - 4s^2 = 0.0753(12).
\label{8}
\end{equation}
Here $g_V$ and $g_A$ are the vector and axial couplings of the
Z boson decay into a pair of charged leptons $l\bar{l}$.
(Note that with the traditional angle $\theta_W$ we would get
$s^2_W = 0.2122$ and in the $\bar{\alpha}$-Born approximation
$g_V/g_A = 0.1514$ which differs by $40 \sigma$ (!)   from the
corresponding experimental value (see Table 1).


The width of the decay $Z \rightarrow l\bar{l}$ is given by expression:
\begin{equation}
\Gamma_l = 4 (1+\frac{3\bar{\alpha}}{4 \pi})(g^2_A + g^2_V) \Gamma_0,
\label{9}
\end{equation}
where
\begin{equation}
\Gamma_0 = \frac{\sqrt{2}G_{\mu}m^3_Z}{48\pi} = 82.948(12)
\hspace{5mm} \mbox{\rm MeV}
\label{10}
\end{equation}
The first bracket in eq. (\ref{9}) takes into account the purely
 electromagnetic
corrections.


In a similar manner, the width of Z decaying into a pair of quarks
$q \bar{q}$ with charge $Q$ and the isospin projection $T_3$
 is given by
\begin{equation}
\Gamma_q = 12 (1 +\frac{3 Q^2\bar{\alpha}}{4\pi})
(g^2_{Aq} + g^2_{Vq}) \Gamma_0 G
\label{11}
\end{equation}
where
\begin{equation}
g_{Aq} = T_3,
\label{12}
\end{equation}
\begin{equation}
g_{Vq} / g_{Aq} = 1 - 4 |Q| s^2.
\label{13}
\end{equation}
The extra factor of 3, as compared with eq.(\ref{9}),
comes from the colour
 and the factor $G$ takes into
account the emission and exchange of gluons \cite{kataev}:
\begin{equation}
G = 1 + \bar{\alpha_s}/ \pi
      + 1.4 (\bar{\alpha_s}/ \pi)^2
      - 13  (\bar{\alpha_s}/ \pi)^3  + ...
\label{14}
\end{equation}


We thus define the $\bar{\alpha}$-Born approximation for $\Gamma_l$
by eqs.(\ref{7})-(\ref{10}) and for $\Gamma_h$ by  summing
  eq. (\ref{11}) over all quarks, thereby taking into account the
 QED and QCD loop corrections.
 Beyond the $\bar{\alpha}$-Born approximation, one has to include in
 $g_A, g_V, g_{Aq}, g_{Vq}$ the contributions of electroweak loops
 proportional to $\bar{\alpha}/ \pi$
 (with gluonic corrections in some of them).


In ref. \cite{1} we concluded that the data of four LEP detectors, announced
at the 1993 La Thuile \cite{2} and Moriond \cite{3} conferences, were,
within $1\sigma$, described by the electroweak $\bar{\alpha}$-Born
approximation as well as by the standard model expressions
including the one-loop electroweak corrections. This means that the genuine
electroweak corrections were not visible
experimentally at that time.


The non-observation of deviations from the electroweak $\bar{\alpha}$-Born
approximation, with due allowance for QED and QCD effects,
 enabled us to predict
  the values of
$\bar{\alpha}_s$ and $m_t$
 within the framework of
the Minimal Standard Model,
while $m_H$ remained practically
non-constrained. In this respect our results did not differ from those of
the traditional  approach. In our approach the possibility of constraining
 $m_t$ arises from the mutual compensation of the contributions of the
top quark and all other virtual particles for $m_t$ in the range of $160\pm
20$ GeV \cite{1}.

The experimental data  changed somewhat by the time of the Marseille
Conference \cite{4},\cite{C},
 so that the maximal deviation from the corresponding
$\bar{\alpha}$-Born value became $1.3 \sigma$ (for $g_V/g_A$) \cite{5}.
Obviously,
 the situation did not change qualitatively.

According to the fit of ref. \cite{5}, the values of the LEP observables
were equally well
 described within $1\sigma$ by the $\bar{\alpha}$-Born approximation and
  by the Minimal Standard Model amplitudes
including the electroweak radiative corrections. The only exception was the
value of $R_b$ for a heavy higgs where discrepancy
 with the MSM prediction
 reached $1.7 \sigma$.
(See Table 1 from \cite{5}.)


At the
1994 La Thuile and Moriond conferences \cite{6}
 new, more accurate data were  presented by CDF, ADLO and SLD.
In the present note we compare
these data with our theoretical expressions, which have been combined into a
computer code called LEPTOP
\footnote{One can obtain the FORTRAN code of LEPTOP from
rozanov@cernvm.cern.ch}.

 Let us start by considering the data of CDF and ADLO.
{}From  Table 1 we see that the new experimental values of $m_W/m_Z$,
$\Gamma_l$ and $g_V/g_A$ deviate from their $\bar{\alpha}$-Born value
by $2\sigma$. These are the so-called ``gluon-free" observables \cite{novy93}
which depend on $\bar{\alpha_s}$ only very weakly, i.e., only through terms of
the order of $\bar{\alpha}\bar{\alpha_s}$.
 At the same time the data agree within $1\sigma$ with those
theoretical predictions which take the electroweak radiative
corrections into account.
{\it We consider this as a first indication that the genuine
electroweak corrections have become observable.}
This conclusion is strengthened by the fact that the experimental errors in
$m_W/m_Z$, $\Gamma_l$ and $g_V/g_A$ are practically uncorrelated.
  Note the difference
between our statement and that of Ref. \cite{7} where the departure of
 the MSM predicted (fitted) values from the $\bar\alpha$-Born ones is being
stressed.

There are two small clouds on this blue sky.
First, the new measurements of $A_{LR}$ at SLD give
$sin^2\theta_{eff}=0.2290(10)$ or $g_V/g_A = 0.0840(40)$, which
differs by $3\sigma$
 from the LEP value $g_V/g_A = 0.0711(20)$ and from the
theoretical
prediction (see Table 1).
This discrepancy is probably of purely experimental origin. Note that the SLD
value for $g_V/g_A$ lies $2\sigma$ above the $\bar\alpha$-Born value, while the
LEP value lies  $2\sigma$ below. Their average is compatible with
$\bar\alpha$-Born.


Second, the value of $R_b$ measured at LEP coincides with the
 $\bar{\alpha}$-Born
value and
 is $2.5\sigma$ away from its
theoretically fitted value $R_b = 0.2161(4)^{-6}_{+6}$ with
the
central value corresponding to $m_H = $ 300 GeV, the shifts + (--) 6 to $m_H$ =
60(1000) GeV, and the uncertainty $\pm 4$ to
 $\delta m_t = \pm 11$ GeV.
 This discrepancy may, if  not caused by a systematic
error,  indicate the existence of new physics \cite{4}.

Let us note that the figures presented in the Table correspond to the fitted
values of $m_t$ and $\bar{\alpha_s}$
derived from the new LEP and CDF data:
\begin{equation}
m_t = 171(11)^{+15}_{-21}(5),
\label{15}
\end{equation}
\begin{equation}
\bar{\alpha}_s \equiv \alpha_s(m_Z) = 0.125\pm 0.005 \pm 0.002,
\label{16}
\end{equation}
\begin{equation}
\chi^2 = 14/10.
\label{17}
\end{equation}
Here the central values correspond again to $m_H=300$ GeV, with
the first uncertainties  being experimental, the second corresponding to $m_H =
300^{+700}_{-240}$ GeV, and the third (for $m_t$) corresponding to the
uncertainty in $1/\bar{\alpha} = 128.87 \pm 0.12$.

Comparing this with the fit
  \cite{5}
 of the earlier data:
\begin{equation}
m_t = 162^{+14 +16}_{-15 -22},
\label{18}
\end{equation}
\begin{equation}
\bar{\alpha}_s = 0.119 \pm 0.006 ^{+0.002}_{-0.003},
\label{19}
\end{equation}
\begin{equation}
\chi^2 = 3.5/10,
\label{20}
\end{equation}
we observe that central values of $m_t$ and $\alpha_s$ have increased, their
uncertainties decreased, while the $\chi^2$  became more palatable.
The individual contributions to the average value of $m_t$ show more
variations than previously (see Fig. 1).


Our new fitted values for $m_t$ and $\bar{\alpha_s}$ are
in good agreement with these of the LEP
Electroweak Working Group as obtained in the traditional approach and
 presented at the Moriond Conference \cite{6}.

The numbers of the fit (\ref{15})--(\ref{17}) and of Table 1  include a
recently estimated QCD
correction
 \cite{8},
which increases $m_t$ by about 4 GeV.


With reference to Table 1, we would like to stress two points:
\begin{itemize}
\item[(1)]
The shifts caused by changing $m_H$ are, as a rule, small compared to the
uncertainties (in brackets) in column 5. This ``$m_H$ independence" is
characteristic for the global fit which predicts $m_t$ for a given $m_H$. The
higher $m_H$, the higher is the predicted $m_t$, while the predicted values of
the observables remain practically unchanged. (This would be evident if there
was only a single observable).
\item[(2)] The situation is different when $m_t$ is fixed (e.g., measured). For
$m_t =$ 170 GeV, the shifts of $g_V/g_A$ from its central value 0.0711 are
--0.0024 and +0.0035 for $m_H$ = 1000 GeV and 60 GeV,
 respectively (see Table 2 of
Ref. [6]), which is larger than the current experimental
uncertainty in $g_V/g_A (\pm$ 0.0020). Thus a further improvement of
 the accuracy
in $g_V/g_A$ could place serious bounds on $m_H$. Two other ``gluon-free"
observables, $m_W/m_Z$ and $g_A$, are less sensitive:
 their higgs shifts are half
as large as their present experimental uncertainties.
\end{itemize}



To conclude: Within the framework of the traditional approach,
 which starts with
$\alpha(0)$, the latest  precision data
do not herald anything qualitatively new;
one merely gets a slightly heavier  top  mass, and a
slightly larger  strong coupling constant.
In strong contrast, these same data open,
 with our approach -- which starts with
$\alpha (m_Z)$ -- a new window, one through which
 the non-vanishing electroweak
radiative corrections become visible.



\vspace*{1cm}
\noindent
{\rm ACKNOWLEDGEMENTS}

We are grateful to D.Yu.Bardin, A.Sirlin, V.L.Telegdi and M.B.Voloshin
 for helpful remarks.
VN, LO, and MV are grateful to the Russian Foundation for Fundamental
Research for grant 93-02-14431. LO, MV and AR
 are grateful to CERN TH and PPE
Divisions, respectively, for their warm hospitality.

\newpage
\begin{center}

{\large Table 1}
\end{center}

   Results of fitting the
    Moriond 1994 data from LEP and $p \bar p$ colliders.
   Observables (first column), their '94 and '93 experimental values (second
and third columns) and
   their predicted values: (a) in the electroweak tree (Born)
    approximation based
on
   $\bar{\alpha}$ (fourth column) and (b) in the electroweak
    tree plus one loop
   approximation (fifth column). Both in columns 4 and 5 the QED and QCD
   loops were taken into account.


   The predicted values have been obtained for three fixed values
   of $m_H = 300^{+700}_{-240}$ GeV;
   for each of them the fitted values of $m_t \pm \delta m_t$
   and $\bar{\alpha_s} \pm \delta \alpha_s$ were used.
   The central values correspond to $m_H=300$ GeV. The upper (lower)
   numbers give the shifts of these central values corresponding to
   $m_H = 1000$  (60) GeV.


   The numbers in brackets correspond to experimental uncertainties (columns 2
and 3),
   and  predicted uncertainties (columns 4 and 5), arising
   in column 4 from $\delta \bar{\alpha}$ for $m_W/m_Z$,
    $g_V/g_A$ and $\Gamma_l$ and from $\delta \bar{\alpha}_s$
    for the five other observables.
    The errors in brackets in column 5 come from
    $\delta \bar{\alpha_s}$ and $\delta m_t$ of the fit and from
    $\delta \bar{\alpha}$ (for $g_V/g_A$ only).
    Note that the $\bar{\alpha}$-Born values of hadronic observables
    depend on $m_H$. This is caused by their dependence on
    $\bar{\alpha_s}$, the fitted values of which depend on $m_H$.





\vspace{8mm}
\begin{tabular}{|l|l|l|l|l|} \hline
Observable & Exp. '94 & Exp. '93 & $\bar{\alpha}$-Born
 & MSM prediction
 \\ \hline
$m_W/m_Z$ & 0.8814(21)  & 0.8798(28) & 0.8768(2) & 0.8803$(8)^{+0}_{-2}$
 \\ \hline
$g_V/g_A$ & 0.0711(20)  & 0.0716(28) & 0.0753(12) & 0.0711$(19)^{-7}_{+9}$
 \\ \hline
$\Gamma_l$ (MeV) & 83.98(18) & 83.82(27)  & 83.57(2) & 83.87$(11)^{+0}_{-6}$
 \\ \hline
$\Gamma_h$ (GeV) & 1.7460(40) & 1.7403(59) & 1.7445$(26)^{+11}_{-9}$ &
1.7435$(27)^{-3}_{-5}$
 \\ \hline
$\Gamma_Z$ (GeV) & 2.4971(38) & 2.4890(70) & 2.4930$(26)^{+10}_{-10}$ &
 2.4962$(32)^{-3}_{-12}$
 \\ \hline
$\sigma_{had}$ (nb) &   41.51(12) & 41.56(14) & 41.41$(3)^{-10}_{+9}$ &
 41.43$(3)^{+0.2}_{-0.6}$
 \\ \hline
$R_l$ & 20.790(40)  & 20.763(49) & 20.874$(31)^{+13}_{-11}$
  &  20.788$(32)^{-5}_{+10}$
 \\ \hline
$R_b$ & 0.2210(19) & 0.2200(27)  & 0.2197$(0)^{+0}_{-0}$
 & 0.2161$(4)^{-6}_{+6}$
  \\ \hline
\end{tabular}

\newpage

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\newpage
\vspace*{1cm}
\noindent
{\bf Figure  Captions}


\noindent
{\bf Fig. 1}: The fitted values of $m_t$ from the specified observables
measured
at LEP and $p\bar{p}$ colliders, assuming $m_H = 300$ GeV and
$\bar{\alpha}_s = 0.125$. The  region   $m_t < m_Z$,
 is definitely excluded by the direct searches. The
central values of $m_t$ from $R_b$, $A^e_{\tau}$ and $R_l$
 lie in this excluded region.


\noindent
{\bf Fig. 2}: Allowed region of $m_t$ and $m_H$
with $\bar{\alpha_s} = 0.125$. The lines represent the
$s$-standard "ellipses" ($s$=1,2,3,4,5) corresponding
to the constant values of $\chi^2$
($\chi^2 = \chi^2_{min} + s^2$).




\newpage

\begin{figure*}[htb]\centering
\mbox{\epsfig{figure=lbfitt.eps,width=0.94\textwidth}}
\caption[]{\label{fig1}
\rm

}
\end{figure*}

\newpage

\begin{figure*}[htb]\centering
\mbox{\epsfig{figure=lbfit2.eps,width=0.94\textwidth}}
\caption[]{\label{fig2}
\rm

}
\end{figure*}

\end{document}
























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\def\@makeother#1{\catcode`#1=12\relax}  % -pks-
\fi                                      % -pks-
\immediate\write16{Document style option `epsfig', \fileversion\space
<\filedate> (edited by SPQR)}%
\newcount\EPS@Height
\newcount\EPS@Width
\newcount\EPS@xscale
\newcount\EPS@yscale
\def\psfigdriver#1{%
  \bgroup\edef\next{\def\noexpand\tempa{#1}}%
    \uppercase\expandafter{\next}%
    \def\LN{DVITOLN03}%
    \def\DVItoPS{DVITOPS}%
    \def\DVIPS{DVIPS}%
    \def\emTeX{EMTEX}%
    \def\OzTeX{OZTEX}%
    \def\Textures{TEXTURES}%
    \global\chardef\fig@driver=0
    \ifx\tempa\LN
        \global\chardef\fig@driver=0\fi
    \ifx\tempa\DVItoPS
        \global\chardef\fig@driver=1\fi
    \ifx\tempa\DVIPS
        \global\chardef\fig@driver=2\fi
    \ifx\tempa\emTeX
        \global\chardef\fig@driver=3\fi
    \ifx\tempa\OzTeX
        \global\chardef\fig@driver=4\fi
    \ifx\tempa\Textures
        \global\chardef\fig@driver=5\fi
  \egroup
\def\psfig@start{}%
\def\psfig@end{}%
\def\epsfig@gofer{}%
\ifcase\fig@driver
\typeout{WARNING! ****
 no specials for LN03 psfig}%
\or % case 1: dvitops
\def\psfig@start{}%
\def\psfig@end{\special{dvitops: import \@p@sfilefinal \space
\@p@swidth sp \space \@p@sheight sp \space fill}%
\if@clip \typeout{Clipping not supported}\fi
\if@angle \typeout{Rotating not supported}\fi
}%
\let\epsfig@gofer\psfig@end
\or %case2 dvips
\def\psfig@start{\special{ps::[begin]  \@p@swidth \space \@p@sheight \space%
        \@p@sbbllx \space \@p@sbblly \space%
        \@p@sbburx \space \@p@sbbury \space%
        startTexFig \space }%
        \if@angle
                \special {ps:: \@p@sangle \space rotate \space}
        \fi
        \if@clip
                \if@verbose
                        \typeout{(clipped to BB) }%
                \fi
                \special{ps:: doclip \space }%
        \fi
        \special{ps: plotfile \@p@sfilefinal \space }%
        \special{ps::[end] endTexFig \space }%
}%
\def\psfig@end{}%
\def\epsfig@gofer{\if@clip
                        \if@verbose
                           \typeout{(clipped to BB)}%
                        \fi
                        \epsfclipon
                  \fi
                  \epsfsetgraph{\@p@sfilefinal}%
}%
\or % case 3, emTeX
\typeout{WARNING. You must have a .bb info file with the Bounding Box
  of the pcx file}%
\def\psfig@start{}%
\def\psfig@end{\typeout{pcx import of \@p@sfilefinal}%
\if@clip \typeout{Clipping not supported}\fi
\if@angle \typeout{Rotating not supported}\fi
\raisebox{\@p@srheight sp}{\special{em: graph \@p@sfilefinal}}}%
\def\epsfig@gofer{}%
\or % case 4, OzTeX
\def\psfig@start{}%
\def\psfig@end{%
\EPS@Width\@p@swidth
\EPS@Height\@p@sheight
\divide\EPS@Width by 65781  % convert sp to bp
\divide\EPS@Height by 65781
\special{epsf=\@p@sfilefinal
\space
width=\the\EPS@Width
\space
height=\the\EPS@Height
}%
\if@clip \typeout{Clipping not supported}\fi
\if@angle \typeout{Rotating not supported}\fi
}%
\let\epsfig@gofer\psfig@end
\or % case 5, Textures
\def\psfig@end{\if@clip
                        \if@verbose
                           \typeout{(clipped to BB)}%
                        \fi
                        \epsfclipon
                  \fi
\special{illustration \@p@sfilefinal\space scaled \the\EPS@xscale}%
}%
\def\psfig@start{}%
\let\epsfig\psfig
\else
\typeout{WARNING. *** unknown  driver - no psfig}%
\fi
}%
\newdimen\ps@dimcent
\ifx\undefined\fbox
\newdimen\fboxrule
\newdimen\fboxsep
\newdimen\ps@tempdima
\newbox\ps@tempboxa
\fboxsep = 3pt
\fboxrule = .4pt
\long\def\fbox#1{\leavevmode\setbox\ps@tempboxa\hbox{#1}\ps@tempdima\fboxrule
    \advance\ps@tempdima \fboxsep \advance\ps@tempdima \dp\ps@tempboxa
   \hbox{\lower \ps@tempdima\hbox
  {\vbox{\hrule height \fboxrule
          \hbox{\vrule width \fboxrule \hskip\fboxsep
          \vbox{\vskip\fboxsep \box\ps@tempboxa\vskip\fboxsep}\hskip
                 \fboxsep\vrule width \fboxrule}%
                 \hrule height \fboxrule}}}}%
\fi
\ifx\@ifundefined\undefined
\long\def\@ifundefined#1#2#3{\expandafter\ifx\csname
  #1\endcsname\relax#2\else#3\fi}%
\fi
\@ifundefined{typeout}%
{\gdef\typeout#1{\immediate\write\sixt@@n{#1}}}%
{\relax}%
\@ifundefined{epsfig}{}{\typeout{EPSFIG --- already loaded}\endinput}%
\@ifundefined{epsfbox}{\input epsf}{}%
\ifx\undefined\@latexerr
        \newlinechar`\^^J
        \def\@spaces{\space\space\space\space}%
        \def\@latexerr#1#2{%
        \edef\@tempc{#2}\expandafter\errhelp\expandafter{\@tempc}%
        \typeout{Error. \space see a manual for explanation.^^J
         \space\@spaces\@spaces\@spaces Type \space H <return> \space for
         immediate help.}\errmessage{#1}}%
\fi
\def\@whattodo{You tried to include a PostScript figure which
cannot be found^^JIf you press return to carry on anyway,^^J
The failed name will be printed in place of the figure.^^J
or type X to quit}%
\def\@whattodobb{You tried to include a PostScript figure which
has no^^Jbounding box, and you supplied none.^^J
If you press return to carry on anyway,^^J
The failed name will be printed in place of the figure.^^J
or type X to quit}%
\def\@nnil{\@nil}%
\def\@empty{}%
\def\@psdonoop#1\@@#2#3{}%
\def\@psdo#1:=#2\do#3{\edef\@psdotmp{#2}\ifx\@psdotmp\@empty \else
    \expandafter\@psdoloop#2,\@nil,\@nil\@@#1{#3}\fi}%
\def\@psdoloop#1,#2,#3\@@#4#5{\def#4{#1}\ifx #4\@nnil \else
       #5\def#4{#2}\ifx #4\@nnil \else#5\@ipsdoloop #3\@@#4{#5}\fi\fi}%
\def\@ipsdoloop#1,#2\@@#3#4{\def#3{#1}\ifx #3\@nnil
       \let\@nextwhile=\@psdonoop \else
      #4\relax\let\@nextwhile=\@ipsdoloop\fi\@nextwhile#2\@@#3{#4}}%
\def\@tpsdo#1:=#2\do#3{\xdef\@psdotmp{#2}\ifx\@psdotmp\@empty \else
    \@tpsdoloop#2\@nil\@nil\@@#1{#3}\fi}%
\def\@tpsdoloop#1#2\@@#3#4{\def#3{#1}\ifx #3\@nnil
       \let\@nextwhile=\@psdonoop \else
      #4\relax\let\@nextwhile=\@tpsdoloop\fi\@nextwhile#2\@@#3{#4}}%
\long\def\epsfaux#1#2:#3\\{\ifx#1\epsfpercent
   \def\testit{#2}\ifx\testit\epsfbblit
        \@atendfalse
        \epsf@atend #3 . \\%
        \if@atend
           \if@verbose
                \typeout{epsfig: found `(atend)'; continuing search}%
           \fi
        \else
                \epsfgrab #3 . . . \\%
                \epsffileokfalse\global\no@bbfalse
                \global\epsfbbfoundtrue
        \fi
   \fi\fi}%
\def\epsf@atendlit{(atend)}
\def\epsf@atend #1 #2 #3\\{%
   \def\epsf@tmp{#1}\ifx\epsf@tmp\empty
      \epsf@atend #2 #3 .\\\else
   \ifx\epsf@tmp\epsf@atendlit\@atendtrue\fi\fi}%



\chardef\trig@letter = 11
\chardef\other = 12

\newif\ifdebug %%% turn me on to see TeX hard at work ...
\newif\ifc@mpute %%% don't need to compute some values
\newif\if@atend
\c@mputetrue % but assume that we do

\let\then = \relax
\def\r@dian{pt }%
\let\r@dians = \r@dian
\let\dimensionless@nit = \r@dian
\let\dimensionless@nits = \dimensionless@nit
\def\internal@nit{sp }%
\let\internal@nits = \internal@nit
\newif\ifstillc@nverging
\def \Mess@ge #1{\ifdebug \then \message {#1} \fi}%

{ %%% Things that need abnormal catcodes %%%
        \catcode `\@ = \trig@letter
        \gdef \nodimen {\expandafter \n@dimen \the \dimen}%
        \gdef \term #1 #2 #3%
               {\edef \t@ {\the #1}%%% freeze parameter 1 (count, by value)
                \edef \t@@ {\expandafter \n@dimen \the #2\r@dian}%
                                   %%% freeze parameter 2 (dimen, by value)
                \t@rm {\t@} {\t@@} {#3}%
               }%
        \gdef \t@rm #1 #2 #3%
               {{%
                \count 0 = 0
                \dimen 0 = 1 \dimensionless@nit
                \dimen 2 = #2\relax
                \Mess@ge {Calculating term #1 of \nodimen 2}%
                \loop
                \ifnum  \count 0 < #1
                \then   \advance \count 0 by 1
                        \Mess@ge {Iteration \the \count 0 \space}%
                        \Multiply \dimen 0 by {\dimen 2}%
                        \Mess@ge {After multiplication, term = \nodimen 0}%
                        \Divide \dimen 0 by {\count 0}%
                        \Mess@ge {After division, term = \nodimen 0}%
                \repeat
                \Mess@ge {Final value for term #1 of
                                \nodimen 2 \space is \nodimen 0}%
                \xdef \Term {#3 = \nodimen 0 \r@dians}%
                \aftergroup \Term
               }}%
        \catcode `\p = \other
        \catcode `\t = \other
        \gdef \n@dimen #1pt{#1} %%% throw away the ``pt''
}%

\def \Divide #1by #2{\divide #1 by #2} %%% just a synonym

\def \Multiply #1by #2%%% allows division of a dimen by a dimen
       {{%%% should really freeze parameter 2 (dimen, passed by value)
        \count 0 = #1\relax
        \count 2 = #2\relax
        \count 4 = 65536
        \Mess@ge {Before scaling, count 0 = \the \count 0 \space and
                        count 2 = \the \count 2}%
        \ifnum  \count 0 > 32767 %%% do our best to avoid overflow
        \then   \divide \count 0 by 4
                \divide \count 4 by 4
        \else   \ifnum  \count 0 < -32767
                \then   \divide \count 0 by 4
                        \divide \count 4 by 4
                \else
                \fi
        \fi
        \ifnum  \count 2 > 32767 %%% while retaining reasonable accuracy
        \then   \divide \count 2 by 4
                \divide \count 4 by 4
        \else   \ifnum  \count 2 < -32767
                \then   \divide \count 2 by 4
                        \divide \count 4 by 4
                \else
                \fi
        \fi
        \multiply \count 0 by \count 2
        \divide \count 0 by \count 4
        \xdef \product {#1 = \the \count 0 \internal@nits}%
        \aftergroup \product
       }}%

\def\r@duce{\ifdim\dimen0 > 90\r@dian \then   % sin(x) = sin(180-x)
                \multiply\dimen0 by -1
                \advance\dimen0 by 180\r@dian
                \r@duce
            \else \ifdim\dimen0 < -90\r@dian \then  % sin(x) = sin(360+x)
                \advance\dimen0 by 360\r@dian
                \r@duce
                \fi
            \fi}%

\def\Sine#1%
       {{%
        \dimen 0 = #1 \r@dian
        \r@duce
        \ifdim\dimen0 = -90\r@dian \then
           \dimen4 = -1\r@dian
           \c@mputefalse
        \fi
        \ifdim\dimen0 = 90\r@dian \then
           \dimen4 = 1\r@dian
           \c@mputefalse
        \fi
        \ifdim\dimen0 = 0\r@dian \then
           \dimen4 = 0\r@dian
           \c@mputefalse
        \fi
        \ifc@mpute \then
                % convert degrees to radians
                \divide\dimen0 by 180
                \dimen0=3.141592654\dimen0
                \dimen 2 = 3.1415926535897963\r@dian %%% a well-known constant
                \divide\dimen 2 by 2 %%% we only deal with -pi/2 : pi/2
                \Mess@ge {Sin: calculating Sin of \nodimen 0}%
                \count 0 = 1 %%% see power-series expansion for sine
                \dimen 2 = 1 \r@dian %%% ditto
                \dimen 4 = 0 \r@dian %%% ditto
                \loop
                        \ifnum  \dimen 2 = 0 %%% then we've done
                        \then   \stillc@nvergingfalse
                        \else   \stillc@nvergingtrue
                        \fi
                        \ifstillc@nverging %%% then calculate next term
                        \then   \term {\count 0} {\dimen 0} {\dimen 2}%
                                \advance \count 0 by 2
                                \count 2 = \count 0
                                \divide \count 2 by 2
                                \ifodd  \count 2 %%% signs alternate
                                \then   \advance \dimen 4 by \dimen 2
                                \else   \advance \dimen 4 by -\dimen 2
                                \fi
                \repeat
        \fi
                        \xdef \sine {\nodimen 4}%
       }}%

\def\Cosine#1{\ifx\sine\UnDefined\edef\Savesine{\relax}\else
                             \edef\Savesine{\sine}\fi
        {\dimen0=#1\r@dian\multiply\dimen0 by -1
         \advance\dimen0 by 90\r@dian
         \Sine{\nodimen 0}%
         \xdef\cosine{\sine}%
         \xdef\sine{\Savesine}}}
\def\psdraft{\def\@psdraft{0}}%
\def\psfull{\def\@psdraft{1}}%
\psfull
\newif\if@scalefirst
\def\psscalefirst{\@scalefirsttrue}%
\def\psrotatefirst{\@scalefirstfalse}%
\psrotatefirst
\newif\if@draftbox
\def\psnodraftbox{\@draftboxfalse}%
\@draftboxtrue
\newif\if@noisy
\@noisyfalse
\newif\ifno@bb
\newif\if@bbllx
\newif\if@bblly
\newif\if@bburx
\newif\if@bbury
\newif\if@height
\newif\if@width
\newif\if@rheight
\newif\if@rwidth
\newif\if@angle
\newif\if@clip
\newif\if@verbose
\newif\if@prologfile
\def\@p@@sprolog#1{\@prologfiletrue\def\@prologfileval{#1}}%
\def\@p@@sclip#1{\@cliptrue}%
\newif\ifepsfig@dos  % only single suffix possible
\def\epsfigdos{\epsfig@dostrue}%
\epsfig@dosfalse
\newif\ifuse@psfig
\def\ParseName#1{\expandafter\@Parse#1}%
\def\@Parse#1.#2:{\gdef\BaseName{#1}\gdef\FileType{#2}}%

\def\@p@@sfile#1{%
\ifepsfig@dos
   \ParseName{#1:}%
\else
   \gdef\BaseName{#1}\gdef\FileType{}%
\fi
\def\@p@sfile{NO FILE: #1}%
\def\@p@sfilefinal{NO FILE: #1}%
        \openin1=#1
        \ifeof1\closein1
                \openin1=\BaseName.bb
                        \ifeof1\closein1
                                \if@bbllx\if@bblly\if@bburx\if@bbury
                                        \def\@p@sfile{#1}%
                                        \def\@p@sfilefinal{#1}%
                                        \fi\fi\fi
                                \else
                                        \@latexerr{ERROR.
PostScript file #1 not found}\@whattodo
                                        \@p@@sbbllx{100bp}%
                                        \@p@@sbblly{100bp}%
                                        \@p@@sbburx{200bp}%
                                        \@p@@sbbury{200bp}%
                                        \psdraft
                                \fi
                        \else
                                \closein1%
                                \edef\@p@sfile{\BaseName.bb}%
                                \typeout{using BB from \@p@sfile}%
                                \ifnum\fig@driver=3
                                  \edef\@p@sfilefinal{\BaseName.pcx}%
                                \else
                                 \ifepsfig@dos
                                 \edef\@p@sfilefinal{"`gunzip -c
                                   `texfind \BaseName.{z,Z,gz}`"}%
                                \else
                                \edef\@p@sfilefinal{"`gunzip -c `texfind
                                  #1.{z,Z,gz}`"}%
                                \fi
                                \fi
                        \fi
        \else\closein1
                    \edef\@p@sfile{#1}%
                    \edef\@p@sfilefinal{#1}%
        \fi%
}%
 % alternative syntax: figure=
\let\@p@@sfigure\@p@@sfile
\def\@p@@sbbllx#1{%
                \@bbllxtrue
                \ps@dimcent=#1
                \edef\@p@sbbllx{\number\ps@dimcent}%
                \divide\ps@dimcent by65536
                \global\edef\epsfllx{\number\ps@dimcent}%
}%
\def\@p@@sbblly#1{%
                \@bbllytrue
                \ps@dimcent=#1
                \edef\@p@sbblly{\number\ps@dimcent}%
                \divide\ps@dimcent by65536
                \global\edef\epsflly{\number\ps@dimcent}%
}%
\def\@p@@sbburx#1{%
                \@bburxtrue
                \ps@dimcent=#1
                \edef\@p@sbburx{\number\ps@dimcent}%
                \divide\ps@dimcent by65536
                \global\edef\epsfurx{\number\ps@dimcent}%
}%
\def\@p@@sbbury#1{%
                \@bburytrue
                \ps@dimcent=#1
                \edef\@p@sbbury{\number\ps@dimcent}%
                \divide\ps@dimcent by65536
                \global\edef\epsfury{\number\ps@dimcent}%
}%
\def\@p@@sheight#1{%
                \@heighttrue
                \global\epsfysize=#1
                \ps@dimcent=#1
                \edef\@p@sheight{\number\ps@dimcent}%
}%
\def\@p@@swidth#1{%
                \@widthtrue
                \global\epsfxsize=#1
                \ps@dimcent=#1
                \edef\@p@swidth{\number\ps@dimcent}%
}%
\def\@p@@srheight#1{%
                \@rheighttrue\use@psfigtrue
                \ps@dimcent=#1
                \edef\@p@srheight{\number\ps@dimcent}%
}%
\def\@p@@srwidth#1{%
                \@rwidthtrue\use@psfigtrue
                \ps@dimcent=#1
                \edef\@p@srwidth{\number\ps@dimcent}%
}%
\def\@p@@sangle#1{%
                \use@psfigtrue
                \@angletrue
                \edef\@p@sangle{#1}%
}%
\def\@p@@ssilent#1{%
                \@verbosefalse
}%
\def\@p@@snoisy#1{%
                \@verbosetrue
}%
\def\@cs@name#1{\csname #1\endcsname}%
\def\@setparms#1=#2,{\@cs@name{@p@@s#1}{#2}}%
\def\ps@init@parms{%
                \@bbllxfalse \@bbllyfalse
                \@bburxfalse \@bburyfalse
                \@heightfalse \@widthfalse
                \@rheightfalse \@rwidthfalse
                \def\@p@sbbllx{}\def\@p@sbblly{}%
                \def\@p@sbburx{}\def\@p@sbbury{}%
                \def\@p@sheight{}\def\@p@swidth{}%
                \def\@p@srheight{}\def\@p@srwidth{}%
                \def\@p@sangle{0}%
                \def\@p@sfile{}%
                \use@psfigfalse
                \@prologfilefalse
                \def\@sc{}%
                \if@noisy
                        \@verbosetrue
                \else
                        \@verbosefalse
                \fi
                \@clipfalse
}%
\def\parse@ps@parms#1{%
                \@psdo\@psfiga:=#1\do
                   {\expandafter\@setparms\@psfiga,}%
\if@prologfile
\special{header=\@prologfileval}%
\fi
}%
\def\bb@missing{%
        \if@verbose
            \typeout{psfig: searching \@p@sfile \space  for bounding box}%
        \fi
        \epsfgetbb{\@p@sfile}%
        \ifepsfbbfound
            \ps@dimcent=\epsfllx bp\edef\@p@sbbllx{\number\ps@dimcent}%
            \ps@dimcent=\epsflly bp\edef\@p@sbblly{\number\ps@dimcent}%
            \ps@dimcent=\epsfurx bp\edef\@p@sbburx{\number\ps@dimcent}%
            \ps@dimcent=\epsfury bp\edef\@p@sbbury{\number\ps@dimcent}%
        \else
            \epsfbbfoundfalse
        \fi
}
\newdimen\p@intvaluex
\newdimen\p@intvaluey
\def\rotate@#1#2{{\dimen0=#1 sp\dimen1=#2 sp
                  \global\p@intvaluex=\cosine\dimen0
                  \dimen3=\sine\dimen1
                  \global\advance\p@intvaluex by -\dimen3
                  \global\p@intvaluey=\sine\dimen0
                  \dimen3=\cosine\dimen1
                  \global\advance\p@intvaluey by \dimen3
                  }}%
\def\compute@bb{%
                \epsfbbfoundfalse
                \if@bbllx\epsfbbfoundtrue\fi
                \if@bblly\epsfbbfoundtrue\fi
                \if@bburx\epsfbbfoundtrue\fi
                \if@bbury\epsfbbfoundtrue\fi
                \ifepsfbbfound\else\bb@missing\fi
                \ifepsfbbfound\else
                \@latexerr{ERROR. cannot locate BoundingBox}\@whattodobb
                        \@p@@sbbllx{100bp}%
                        \@p@@sbblly{100bp}%
                        \@p@@sbburx{200bp}%
                        \@p@@sbbury{200bp}%
                        \no@bbtrue
                        \psdraft
                \fi
                %
                \count203=\@p@sbburx
                \count204=\@p@sbbury
                \advance\count203 by -\@p@sbbllx
                \advance\count204 by -\@p@sbblly
                \edef\ps@bbw{\number\count203}%
                \edef\ps@bbh{\number\count204}%
                 \edef\@bbw{\number\count203}%
                \edef\@bbh{\number\count204}%
               \if@angle
                        \Sine{\@p@sangle}\Cosine{\@p@sangle}%

{\ps@dimcent=\maxdimen\xdef\r@p@sbbllx{\number\ps@dimcent}%

\xdef\r@p@sbblly{\number\ps@dimcent}%

\xdef\r@p@sbburx{-\number\ps@dimcent}%

\xdef\r@p@sbbury{-\number\ps@dimcent}}%
                        \def\minmaxtest{%
                           \ifnum\number\p@intvaluex<\r@p@sbbllx
                              \xdef\r@p@sbbllx{\number\p@intvaluex}\fi
                           \ifnum\number\p@intvaluex>\r@p@sbburx
                              \xdef\r@p@sbburx{\number\p@intvaluex}\fi
                           \ifnum\number\p@intvaluey<\r@p@sbblly
                              \xdef\r@p@sbblly{\number\p@intvaluey}\fi
                           \ifnum\number\p@intvaluey>\r@p@sbbury
                              \xdef\r@p@sbbury{\number\p@intvaluey}\fi
                           }%
                        \rotate@{\@p@sbbllx}{\@p@sbblly}%
                        \minmaxtest
                        \rotate@{\@p@sbbllx}{\@p@sbbury}%
                        \minmaxtest
                        \rotate@{\@p@sbburx}{\@p@sbblly}%
                        \minmaxtest
                        \rotate@{\@p@sbburx}{\@p@sbbury}%
                        \minmaxtest

\edef\@p@sbbllx{\r@p@sbbllx}\edef\@p@sbblly{\r@p@sbblly}%

\edef\@p@sbburx{\r@p@sbburx}\edef\@p@sbbury{\r@p@sbbury}%
                \fi
                \count203=\@p@sbburx
                \count204=\@p@sbbury
                \advance\count203 by -\@p@sbbllx
                \advance\count204 by -\@p@sbblly
                \edef\@bbw{\number\count203}%
                \edef\@bbh{\number\count204}%
}%
\def\in@hundreds#1#2#3{\count240=#2 \count241=#3
                     \count100=\count240        % 100 is first digit #2/#3
                     \divide\count100 by \count241
                     \count101=\count100
                     \multiply\count101 by \count241
                     \advance\count240 by -\count101
                     \multiply\count240 by 10
                     \count101=\count240        %101 is second digit of #2/#3
                     \divide\count101 by \count241
                     \count102=\count101
                     \multiply\count102 by \count241
                     \advance\count240 by -\count102
                     \multiply\count240 by 10
                     \count102=\count240        % 102 is the third digit
                     \divide\count102 by \count241
                     \count200=#1\count205=0
                     \count201=\count200
                        \multiply\count201 by \count100
                        \advance\count205 by \count201
                     \count201=\count200
                        \divide\count201 by 10
                        \multiply\count201 by \count101
                        \advance\count205 by \count201
                        %
                     \count201=\count200
                        \divide\count201 by 100
                        \multiply\count201 by \count102
                        \advance\count205 by \count201
                        %
                     \edef\@result{\number\count205}%
}%
\def\compute@wfromh{%
                % computing : width = height * (bbw / bbh)
                \in@hundreds{\@p@sheight}{\@bbw}{\@bbh}%
                \edef\@p@swidth{\@result}%
}%
\def\compute@hfromw{%
                % computing : height = width * (bbh / bbw)
                \in@hundreds{\@p@swidth}{\@bbh}{\@bbw}%
                \edef\@p@sheight{\@result}%
}%
\def\compute@handw{%
                \if@height
                        \if@width
                        \else
                                \compute@wfromh
                        \fi
                \else
                        \if@width
                                \compute@hfromw
                        \else
                                \edef\@p@sheight{\@bbh}%
                                \edef\@p@swidth{\@bbw}%
                        \fi
                \fi
}%
\def\compute@resv{%
                \if@rheight \else \edef\@p@srheight{\@p@sheight} \fi
                \if@rwidth \else \edef\@p@srwidth{\@p@swidth} \fi
}%
\def\compute@sizes{%
        \if@scalefirst\if@angle
        \if@width
           \in@hundreds{\@p@swidth}{\@bbw}{\ps@bbw}%
           \edef\@p@swidth{\@result}%
        \fi
        \if@height
           \in@hundreds{\@p@sheight}{\@bbh}{\ps@bbh}%
           \edef\@p@sheight{\@result}%
        \fi
        \fi\fi
        \compute@handw
        \compute@resv
        \EPS@Width=\@bbw
        \divide\EPS@Width by 1000
        \EPS@xscale=\@p@swidth \divide \EPS@xscale by \EPS@Width
        \EPS@Height=\@bbh
        \divide\EPS@Height by 1000
        \EPS@yscale=\@p@sheight \divide \EPS@yscale by\EPS@Height
  \ifnum\EPS@xscale>\EPS@yscale\EPS@xscale=\EPS@yscale\fi
}

\long\def\graphic@verb#1{\def\next{#1}%
  {\expandafter\graphic@strip\meaning\next}}
\def\graphic@strip#1>{}

\def\psfig#1{\ifvmode\leavevmode\fi\vbox {%
        %
        \ps@init@parms
        \parse@ps@parms{#1}%
        %
        \ifnum\@psdraft=1
                \typeout{[\@p@sfilefinal]}%
                \if@verbose
                        \typeout{epsfig: using PSFIG macros}%
                \fi
                \psfig@method
        \else
                \epsfig@draft
        \fi
}
}%

\def\epsfig#1{\ifvmode\leavevmode\fi\vbox {%
        %
        \ps@init@parms
        \parse@ps@parms{#1}%
        %
        \ifnum\@psdraft=1
          \if@angle\use@psfigtrue\fi
          {\ifnum\fig@driver=1\global\use@psfigtrue\fi}%
          {\ifnum\fig@driver=3\global\use@psfigtrue\fi}%
          {\ifnum\fig@driver=4\global\use@psfigtrue\fi}%
          {\ifnum\fig@driver=5\global\use@psfigtrue\fi}%
                \ifuse@psfig
                        \if@verbose
                                \typeout{epsfig: using PSFIG macros}%
                        \fi
                        \psfig@method
                \else
                        \if@verbose
                                \typeout{epsfig: using EPSF macros}%
                        \fi
                        \epsf@method
                \fi
        \else
                \epsfig@draft
        \fi
}%
}%


\def\epsf@method{%
        \epsfbbfoundfalse
        \if@bbllx\epsfbbfoundtrue\fi
        \if@bblly\epsfbbfoundtrue\fi
        \if@bburx\epsfbbfoundtrue\fi
        \if@bbury\epsfbbfoundtrue\fi
        \ifepsfbbfound\else\epsfgetbb{\@p@sfile}\fi
        \ifepsfbbfound
           \typeout{<\@p@sfilefinal>}%
           \epsfig@gofer
        \else
          \@latexerr{ERROR - Cannot locate BoundingBox}\@whattodobb
          \@p@@sbbllx{100bp}%
          \@p@@sbblly{100bp}%
          \@p@@sbburx{200bp}%
          \@p@@sbbury{200bp}%
                \count203=\@p@sbburx
                \count204=\@p@sbbury
                \advance\count203 by -\@p@sbbllx
                \advance\count204 by -\@p@sbblly
                \edef\@bbw{\number\count203}%
                \edef\@bbh{\number\count204}%
          \compute@sizes
          \epsfig@@draft
       \fi
}%
\def\psfig@method{%
        \compute@bb
        \ifepsfbbfound
          \compute@sizes
          \psfig@start
          % Create the vbox to reserve the space for the figure%
          \vbox to \@p@srheight sp{\hbox to \@p@srwidth
            sp{\hss}\vss\psfig@end}%
        \else
           \epsfig@draft
        \fi
}%
\def\epsfig@draft{\compute@bb\compute@sizes\epsfig@@draft}%
\def\epsfig@@draft{%
\typeout{<(draft only) \@p@sfilefinal>}%
\if@draftbox
        % Verbose draft: print file name in box
        % NOTE: fbox is a LaTeX command!
        \hbox{\fbox{\vbox to \@p@srheight sp{%
        \vss\hbox to \@p@srwidth sp{ \hss
           {\tt\graphic@verb{\@p@sfilefinal}}
                          \hss }\vss
        }}}%
\else
        % Non-verbose draft
        \vbox to \@p@srheight sp{%
        \vss\hbox to \@p@srwidth sp{\hss}\vss}%
\fi
}%
\psfigdriver{dvips}%
\epsfigdos
\epsfigRestoreAt





%!PS-Adobe-2.0 EPSF-2.0
%%BoundingBox: 0 0 567 567
%%Title: /LBFITT   EPS      A1
%%Creator: HIGZ Version 1.20/11
%%CreationDate: 09/04/94   20.52
%%EndComments
80 dict begin
/s {stroke} def /l {lineto} def /m {moveto} def /t { translate} def
/sw {stringwidth} def /r {rotate} def /rl {roll} def
/d {rlineto} def /rm {rmoveto} def /gr {grestore} def /f {eofill} def
/c {setrgbcolor} def /lw {setlinewidth} def /sd {setdash} def
/cl {closepath} def /sf {scalefont setfont} def
/box {m dup 0 exch d exch 0 d 0 exch neg d cl} def
/bl {box s} def /bf {box f} def
/mp {newpath /y exch def /x exch def} def
/side {[w .77 mul w .23 mul] .385 w mul sd w 0 l currentpoint t -144 r} def
/mr {mp x y w2 0 360 arc} def /m24 {mr s} def /m20 {mr f} def
/mb {mp x y w2 add m w2 neg 0 d 0 w neg d w 0 d 0 w d cl} def
/mt {mp x y w2 add m w2 neg w neg d w 0 d cl} def
/m21 {mb f} def /m25 {mb s} def /m22 {mt f} def /m26 {mt s} def
/m23 {mp x y w2 sub m w2 w d w neg 0 d cl f} def
 /m27 {mp x y w2 add m w3 neg w2 neg d w3 w2 neg d w3 w2 d cl s} def
 /m28 {mp x w2 sub y w2 sub w3 add m w3 0 d 0 w3 neg d w3 0 d 0 w3 d w3 0 d
 0 w3 d w3 neg 0 d 0 w3 d w3 neg 0 d 0 w3 neg d w3 neg 0 d cl s } def
 /m29 {mp gsave x w2 sub y w2 add w3 sub m currentpoint t
 4 {side} repeat cl fill gr} def
 /m30 {mp gsave x w2 sub y w2 add w3 sub m currentpoint t
 5 {side} repeat s gr} def /m31 {mp x y w2 sub m 0 w d x w2 sub y m w 0 d
 x w2 sub y w2 add m w w neg d x w2 sub y w2
 sub m w w d s} def
/m2 {mp x y w2 sub m 0 w d x w2 sub y m w 0 d s} def
/m5 {mp x w2 sub y w2 sub m w w d x w2 sub y w2 add m w w neg d s} def
/reencdict 24 dict def /ReEncode {reencdict begin /nco&na exch def
/nfnam exch def /basefontname exch def /basefontdict basefontname findfont def
/newfont basefontdict maxlength dict def basefontdict {exch dup /FID ne
{dup /Encoding eq {exch dup length array copy newfont 3 1 roll put} {exch
newfont 3 1 roll put} ifelse} {pop pop} ifelse } forall newfont
/FontName nfnam put nco&na aload pop nco&na length 2 idiv {newfont
/Encoding get 3 1 roll put} repeat nfnam newfont definefont pop end } def
/accvec [ 176 /agrave 181 /Agrave 190 /acircumflex 192 /Acircumflex
201 /adieresis 204 /Adieresis 209 /ccedilla 210 /Ccedilla 211 /eacute
212 /Eacute 213 /egrave 214 /Egrave 215 /ecircumflex 216 /Ecircumflex
217 /edieresis 218 /Edieresis 219 /icircumflex 220 /Icircumflex
221 /idieresis 222 /Idieresis 223 /ntilde 224 /Ntilde 226 /ocircumflex
228 /Ocircumflex 229 /odieresis 230 /Odieresis 231 /ucircumflex 236
/Ucircumflex
237 /udieresis 238 /Udieresis 239 /aring 242 /Aring 243 /ydieresis
244 /Ydieresis 246 /aacute 247 /Aacute 252 /ugrave 253 /Ugrave] def
/Times-Roman /Times-Roman accvec ReEncode
/Times-Italic /Times-Italic accvec ReEncode
/Times-Bold /Times-Bold accvec ReEncode
/Times-BoldItalic /Times-BoldItalic accvec ReEncode
/Helvetica /Helvetica accvec ReEncode
/Helvetica-Oblique /Helvetica-Oblique accvec ReEncode
/Helvetica-Bold /Helvetica-Bold accvec ReEncode
/Helvetica-BoldOblique /Helvetica-BoldOblique  accvec ReEncode
/Courier /Courier accvec ReEncode
/Courier-Oblique /Courier-Oblique accvec ReEncode
/Courier-Bold /Courier-Bold accvec ReEncode
/Courier-BoldOblique /Courier-BoldOblique accvec ReEncode
/oshow {gsave [] 0 sd true charpath stroke gr} def
/stwn { /fs exch def /fn exch def /text exch def fn findfont fs sf
 text sw pop xs add /xs exch def} def
/stwb { /fs exch def /fn exch def /nbas exch def /textf exch def
textf length /tlen exch def nbas tlen gt {/nbas tlen def} if
fn findfont fs sf textf dup length nbas sub nbas getinterval sw
pop neg xs add /xs exch def} def
/accspe [ 65 /plusminus 66 /bar 67 /existential 68 /universal
69 /exclam 70 /numbersign 71 /greater 72 /question 73 /integral
74 /colon 75 /semicolon 76 /less 77 /bracketleft 78 /bracketright
79 /greaterequal 80 /braceleft 81 /braceright 82 /radical
83 /spade 84 /heart 85 /diamond 86 /club 87 /lessequal
88 /multiply 89 /percent 90 /infinity 48 /circlemultiply 49 /circleplus
50 /emptyset 51 /lozenge 52 /bullet 53 /arrowright 54 /arrowup
55 /arrowleft 56 /arrowdown 57 /arrowboth 48 /degree 44 /comma 43 /plus
 45 /angle 42 /angleleft 47 /divide 61 /notequal 40 /equivalence 41 /second
 97 /approxequal 98 /congruent 99 /perpendicular 100 /partialdiff 101 /florin
 102 /intersection 103 /union 104 /propersuperset 105 /reflexsuperset
 106 /notsubset 107 /propersubset 108 /reflexsubset 109 /element 110
/notelement
 111 /gradient 112 /logicaland 113 /logicalor 114 /arrowdblboth
 115 /arrowdblleft 116 /arrowdblup 117 /arrowdblright 118 /arrowdbldown
 119 /ampersand 120 /omega1 121 /similar 122 /aleph ] def
/Symbol /Special accspe ReEncode
gsave .25 .25 scale
%%EndProlog
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 227 m 227 2041 l s 227 436 m 227 436 l s 227 500 m 227 500 l s 227 563 m 227
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 s 227 1261 m 227 1261 l s 227 1324 m 227 1324 l s 227 1388 m 227 1388 l s 227
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 227 1642 l s 227 1705 m 227 1705 l s 227 1768 m 227 1768 l s 227 1832 m 227
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227
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m
 408 227 l s 469 244 m 469 227 l s 530 261 m 530 227 l s 590 244 m 590 227 l s
 651 244 m 651 227 l s 711 244 m 711 227 l s 772 244 m 772 227 l s 832 261 m
832
 227 l s 893 244 m 893 227 l s 953 244 m 953 227 l s 1014 244 m 1014 227 l s
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 1438 227 l s 1498 244 m 1498 227 l s 1559 244 m 1559 227 l s 1619 244 m 1619
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s
 1801 244 m 1801 227 l s 1862 244 m 1862 227 l s 1922 244 m 1922 227 l s 1983
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 221 174 l 225 172 l 228 172 l 233 174 l 236 178 l 237 186 l 237 191 l 236 198
l
 233 203 l 228 204 l 225 204 l cl s 522 204 m 507 204 l 505 191 l 507 192 l 511
 194 l 516 194 l 520 192 l 523 189 l 525 184 l 525 181 l 523 177 l 520 174 l
516
 172 l 511 172 l 507 174 l 505 175 l 504 178 l s 543 204 m 539 203 l 536 198 l
 534 191 l 534 186 l 536 178 l 539 174 l 543 172 l 546 172 l 551 174 l 554 178
l
 555 186 l 555 191 l 554 198 l 551 203 l 546 204 l 543 204 l cl s 796 198 m 799
 200 l 804 204 l 804 172 l s 831 204 m 826 203 l 823 198 l 822 191 l 822 186 l
 823 178 l 826 174 l 831 172 l 834 172 l 838 174 l 841 178 l 843 186 l 843 191
l
 841 198 l 838 203 l 834 204 l 831 204 l cl s 861 204 m 856 203 l 853 198 l 852
 191 l 852 186 l 853 178 l 856 174 l 861 172 l 864 172 l 869 174 l 872 178 l
873
 186 l 873 191 l 872 198 l 869 203 l 864 204 l 861 204 l cl s 1099 198 m 1102
 200 l 1106 204 l 1106 172 l s 1143 204 m 1127 204 l 1126 191 l 1127 192 l 1132
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 1429 178 l 1432 174 l 1436 172 l 1439 172 l 1444 174 l 1447 178 l 1448 186 l
 1448 191 l 1447 198 l 1444 203 l 1439 204 l 1436 204 l cl s 1466 204 m 1462
203
 l 1459 198 l 1457 191 l 1457 186 l 1459 178 l 1462 174 l 1466 172 l 1470 172 l
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 1466 204 l cl s 1701 197 m 1701 198 l 1703 201 l 1704 203 l 1707 204 l 1713
204
 l 1716 203 l 1718 201 l 1719 198 l 1719 195 l 1718 192 l 1715 187 l 1700 172 l
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 1760 191 l 1760 186 l 1762 178 l 1765 174 l 1769 172 l 1772 172 l 1777 174 l
 1780 178 l 1781 186 l 1781 191 l 1780 198 l 1777 203 l 1772 204 l 1769 204 l
cl
 s 2 lw /w 2 def /w2 {w 2 div} def /w3 {w 3 div} def 1260 309 m20 1284 436 m20
 1958 563 m20 1224 690 m20 1463 817 m20 289 944 m20 1361 1071 m20 1451 1197 m20
 626 1324 m20 1182 1451 m20 1310 1578 m20 1300 1705 m20 1235 1832 m20 1776 1959
 m20 287 690 m20 /w 39 def /w2 {w 2 div} def /w3 {w 3 div} def 1284 436 m20
1958
 563 m20 1463 817 m20 1361 1705 m20 1451 1197 m20 1182 1451 m20 1310 1578 m20
 1300 1071 m20 1235 1832 m20 1776 1959 m20 1260 246 m 1260 2022 l s 723 246 m
 723 2022 l s /w 4 def /w2 {w 2 div} def /w3 {w 3 div} def 1323 252 m20 1323
252
 m20 1323 263 m20 1323 263 m20 1323 274 m20 1323 274 m20 1323 286 m20 1323 286
 m20 1323 297 m20 1323 297 m20 1323 308 m20 1323 308 m20 1323 320 m20 1323 320
 m20 1323 331 m20 1323 331 m20 1323 342 m20 1323 342 m20 1323 354 m20 1323 354
 m20 1323 365 m20 1323 365 m20 1323 376 m20 1323 376 m20 1323 388 m20 1323 388
 m20 1323 399 m20 1323 399 m20 1323 410 m20 1323 410 m20 1323 422 m20 1323 422
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 m20 1323 501 m20 1323 501 m20 1323 512 m20 1323 512 m20 1323 524 m20 1323 524
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 m20 1323 569 m20 1323 569 m20 1323 580 m20 1323 580 m20 1323 592 m20 1323 592
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 m20 1323 739 m20 1323 739 m20 1323 750 m20 1323 750 m20 1323 762 m20 1323 762
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1000
 m20 1323 1011 m20 1323 1011 m20 1323 1023 m20 1323 1023 m20 1323 1034 m20 1323
 1034 m20 1323 1045 m20 1323 1045 m20 1323 1057 m20 1323 1057 m20 1323 1068 m20
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1102
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 1136 m20 1323 1136 m20 1323 1147 m20 1323 1147 m20 1323 1159 m20 1323 1159 m20
 1323 1170 m20 1323 1170 m20 1323 1181 m20 1323 1181 m20 1323 1193 m20 1323
1193
 m20 1323 1204 m20 1323 1204 m20 1323 1215 m20 1323 1215 m20 1323 1227 m20 1323
 1227 m20 1323 1238 m20 1323 1238 m20 1323 1249 m20 1323 1249 m20 1323 1261 m20
 1323 1261 m20 1323 1272 m20 1323 1272 m20 1323 1283 m20 1323 1283 m20 1323
1295
 m20 1323 1295 m20 1323 1306 m20 1323 1306 m20 1323 1317 m20 1323 1317 m20 1323
 1329 m20 1323 1329 m20 1323 1340 m20 1323 1340 m20 1323 1351 m20 1323 1351 m20
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1386
 m20 1323 1397 m20 1323 1397 m20 1323 1408 m20 1323 1408 m20 1323 1420 m20 1323
 1420 m20 1323 1431 m20 1323 1431 m20 1323 1442 m20 1323 1442 m20 1323 1454 m20
 1323 1454 m20 1323 1465 m20 1323 1465 m20 1323 1476 m20 1323 1476 m20 1323
1488
 m20 1323 1488 m20 1323 1499 m20 1323 1499 m20 1323 1510 m20 1323 1510 m20 1323
 1522 m20 1323 1522 m20 1323 1533 m20 1323 1533 m20 1323 1544 m20 1323 1544 m20
 1323 1556 m20 1323 1556 m20 1323 1567 m20 1323 1567 m20 1323 1578 m20 1323
1578
 m20 1323 1590 m20 1323 1590 m20 1323 1601 m20 1323 1601 m20 1323 1612 m20 1323
 1612 m20 1323 1624 m20 1323 1624 m20 1323 1635 m20 1323 1635 m20 1323 1646 m20
 1323 1646 m20 1323 1658 m20 1323 1658 m20 1323 1669 m20 1323 1669 m20 1323
1680
 m20 1323 1680 m20 1323 1692 m20 1323 1692 m20 1323 1703 m20 1323 1703 m20 1323
 1714 m20 1323 1714 m20 1323 1726 m20 1323 1726 m20 1323 1737 m20 1323 1737 m20
 1323 1748 m20 1323 1748 m20 1323 1760 m20 1323 1760 m20 1323 1771 m20 1323
1771
 m20 1323 1782 m20 1323 1782 m20 1323 1794 m20 1323 1794 m20 1323 1805 m20 1323
 1805 m20 1323 1816 m20 1323 1816 m20 1323 1828 m20 1323 1828 m20 1323 1839 m20
 1323 1839 m20 1323 1850 m20 1323 1850 m20 1323 1862 m20 1323 1862 m20 1323
1873
 m20 1323 1873 m20 1323 1884 m20 1323 1884 m20 1323 1896 m20 1323 1896 m20 1323
 1907 m20 1323 1907 m20 1323 1918 m20 1323 1918 m20 1323 1930 m20 1323 1930 m20
 1323 1941 m20 1323 1941 m20 1323 1953 m20 1323 1953 m20 1323 1964 m20 1323
1964
 m20 1323 1975 m20 1323 1975 m20 1323 1987 m20 1323 1987 m20 1323 1998 m20 1323
 1998 m20 1323 2009 m20 1323 2009 m20 1323 2021 m20 1323 2021 m20 1194 252 m20
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 1194 490 m20 1194 501 m20 1194 501 m20 1194 512 m20 1194 512 m20 1194 524 m20
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 1194 728 m20 1194 739 m20 1194 739 m20 1194 750 m20 1194 750 m20 1194 762 m20
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 1194 830 m20 1194 841 m20 1194 841 m20 1194 853 m20 1194 853 m20 1194 864 m20
 1194 864 m20 1194 875 m20 1194 875 m20 1194 887 m20 1194 887 m20 1194 898 m20
 1194 898 m20 1194 909 m20 1194 909 m20 1194 921 m20 1194 921 m20 1194 932 m20
 1194 932 m20 1194 943 m20 1194 943 m20 1194 955 m20 1194 955 m20 1194 966 m20
 1194 966 m20 1194 977 m20 1194 977 m20 1194 989 m20 1194 989 m20 1194 1000 m20
 1194 1000 m20 1194 1011 m20 1194 1011 m20 1194 1023 m20 1194 1023 m20 1194
1034
 m20 1194 1034 m20 1194 1045 m20 1194 1045 m20 1194 1057 m20 1194 1057 m20 1194
 1068 m20 1194 1068 m20 1194 1079 m20 1194 1079 m20 1194 1091 m20 1194 1091 m20
 1194 1102 m20 1194 1102 m20 1194 1113 m20 1194 1113 m20 1194 1125 m20 1194
1125
 m20 1194 1136 m20 1194 1136 m20 1194 1147 m20 1194 1147 m20 1194 1159 m20 1194
 1159 m20 1194 1170 m20 1194 1170 m20 1194 1181 m20 1194 1181 m20 1194 1193 m20
 1194 1193 m20 1194 1204 m20 1194 1204 m20 1194 1215 m20 1194 1215 m20 1194
1227
 m20 1194 1227 m20 1194 1238 m20 1194 1238 m20 1194 1249 m20 1194 1249 m20 1194
 1261 m20 1194 1261 m20 1194 1272 m20 1194 1272 m20 1194 1283 m20 1194 1283 m20
 1194 1295 m20 1194 1295 m20 1194 1306 m20 1194 1306 m20 1194 1317 m20 1194
1317
 m20 1194 1329 m20 1194 1329 m20 1194 1340 m20 1194 1340 m20 1194 1351 m20 1194
 1351 m20 1194 1363 m20 1194 1363 m20 1194 1374 m20 1194 1374 m20 1194 1386 m20
 1194 1386 m20 1194 1397 m20 1194 1397 m20 1194 1408 m20 1194 1408 m20 1194
1420
 m20 1194 1420 m20 1194 1431 m20 1194 1431 m20 1194 1442 m20 1194 1442 m20 1194
 1454 m20 1194 1454 m20 1194 1465 m20 1194 1465 m20 1194 1476 m20 1194 1476 m20
 1194 1488 m20 1194 1488 m20 1194 1499 m20 1194 1499 m20 1194 1510 m20 1194
1510
 m20 1194 1522 m20 1194 1522 m20 1194 1533 m20 1194 1533 m20 1194 1544 m20 1194
 1544 m20 1194 1556 m20 1194 1556 m20 1194 1567 m20 1194 1567 m20 1194 1578 m20
 1194 1578 m20 1194 1590 m20 1194 1590 m20 1194 1601 m20 1194 1601 m20 1194
1612
 m20 1194 1612 m20 1194 1624 m20 1194 1624 m20 1194 1635 m20 1194 1635 m20 1194
 1646 m20 1194 1646 m20 1194 1658 m20 1194 1658 m20 1194 1669 m20 1194 1669 m20
 1194 1680 m20 1194 1680 m20 1194 1692 m20 1194 1692 m20 1194 1703 m20 1194
1703
 m20 1194 1714 m20 1194 1714 m20 1194 1726 m20 1194 1726 m20 1194 1737 m20 1194
 1737 m20 1194 1748 m20 1194 1748 m20 1194 1760 m20 1194 1760 m20 1194 1771 m20
 1194 1771 m20 1194 1782 m20 1194 1782 m20 1194 1794 m20 1194 1794 m20 1194
1805
 m20 1194 1805 m20 1194 1816 m20 1194 1816 m20 1194 1828 m20 1194 1828 m20 1194
 1839 m20 1194 1839 m20 1194 1850 m20 1194 1850 m20 1194 1862 m20 1194 1862 m20
 1194 1873 m20 1194 1873 m20 1194 1884 m20 1194 1884 m20 1194 1896 m20 1194
1896
 m20 1194 1907 m20 1194 1907 m20 1194 1918 m20 1194 1918 m20 1194 1930 m20 1194
 1930 m20 1194 1941 m20 1194 1941 m20 1194 1953 m20 1194 1953 m20 1194 1964 m20
 1194 1964 m20 1194 1975 m20 1194 1975 m20 1194 1987 m20 1194 1987 m20 1194
1998
 m20 1194 1998 m20 1194 2009 m20 1194 2009 m20 1194 2021 m20 1194 2021 m20 1182
 436 m 1378 436 l s 723 563 m 2041 563 l s 723 690 m 1861 690 l s 1301 817 m
 1603 817 l s 723 944 m 779 944 l s 1169 1705 m 1536 1705 l s 1221 1197 m 1651
 1197 l s 723 1324 m 1006 1324 l s 1007 1451 m 1337 1451 l s 723 1578 m 1712
 1578 l s 975 1071 m 1565 1071 l s 969 1832 m 1468 1832 l s 1630 1959 m 1912
 1959 l s 1 lw 117 493 m 117 436 l s 117 493 m 149 493 l s 175 450 m 156 422 l
s
 156 450 m 175 450 l s 156 422 m 175 422 l s 142 601 m 115 601 l 110 598 l 104
 593 l 102 585 l 102 577 l 104 568 l 107 566 l 112 563 l 118 563 l 123 566 l
129
 571 l 131 579 l 131 587 l 129 595 l 126 598 l 121 601 l s 153 577 m 153 549 l
s
 153 562 m 157 566 l 160 568 l 164 568 l 166 566 l 168 562 l 168 549 l s 193
568
 m 193 549 l s 193 564 m 191 566 l 188 568 l 184 568 l 181 566 l 179 564 l 177
 560 l 177 557 l 179 553 l 181 550 l 184 549 l 188 549 l 191 550 l 193 553 l s
 219 577 m 219 549 l s 219 564 m 216 566 l 214 568 l 210 568 l 207 566 l 204
564
 l 203 560 l 203 557 l 204 553 l 207 550 l 210 549 l 214 549 l 216 550 l 219
553
 l s 117 747 m 117 690 l s 117 747 m 141 747 l 149 744 l 152 741 l 154 736 l
154
 730 l 152 725 l 149 722 l 141 720 l 117 720 l s 135 720 m 154 690 l s 168 704
m
 168 676 l s 130 873 m 108 817 l s 130 873 m 152 817 l s 117 836 m 144 836 l s
 160 831 m 160 803 l s 160 831 m 177 831 l s 160 817 m 171 817 l s 184 831 m
184
 803 l s 184 831 m 196 831 l 200 830 l 202 828 l 203 826 l 203 823 l 202 820 l
 200 819 l 196 817 l s 184 817 m 196 817 l 200 816 l 202 815 l 203 812 l 203
808
 l 202 805 l 200 804 l 196 803 l 184 803 l s 156 888 m 156 859 l s 117 1000 m
 117 944 l s 117 1000 m 141 1000 l 149 998 l 152 995 l 154 990 l 154 984 l 152
 979 l 149 976 l 141 973 l 117 973 l s 135 973 m 154 944 l s 168 958 m 168 930
l
 s 168 944 m 171 947 l 173 948 l 177 948 l 180 947 l 183 944 l 184 940 l 184
938
 l 183 934 l 180 931 l 177 930 l 173 930 l 171 931 l 168 934 l s 36 1750 m 36
 1705 l s 36 1750 m 53 1705 l s 70 1750 m 53 1705 l s 70 1750 m 70 1705 l s 81
 1716 m 86 1694 l s 92 1716 m 86 1694 l s 92 1716 m 97 1694 l s 103 1716 m 97
 1694 l s 148 1759 m 109 1690 l s 161 1750 m 161 1705 l s 161 1750 m 178 1705 l
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 1716 m 222 1716 l s 207 1694 m 222 1694 l s 130 1254 m 108 1197 l s 130 1254 m
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 1201 l 164 1202 l 179 1202 l s 130 1381 m 108 1324 l s 130 1381 m 152 1324 l s
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 l 179 1329 l s 158 1378 m 175 1378 l 175 1380 l 173 1383 l 172 1384 l 169 1386
 l 165 1386 l 162 1384 l 160 1382 l 158 1378 l 158 1375 l 160 1371 l 162 1368 l
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 m 152 1451 l s 117 1470 m 144 1470 l s 160 1465 m 160 1437 l s 160 1465 m 177
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 192 1638 l 189 1640 l 185 1640 l 183 1638 l 180 1635 l 179 1631 l 179 1629 l
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 157 1106 l 154 1114 l 152 1119 l 146 1125 l 141 1127 l 130 1127 l cl s 138
1081
 m 154 1065 l s 171 1085 m 171 1056 l s 171 1085 m 188 1085 l s 171 1071 m 181
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 m 165 1832 l s 165 1889 m 203 1832 l s 203 1889 m 203 1832 l s 130 2015 m 108
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 1972 l 200 1970 l 202 1968 l 202 1965 l 200 1962 l 199 1961 l 195 1959 l 183
 1959 l s 192 1959 m 202 1945 l s 1973 136 m 1973 104 l s 1973 136 m 1985 104 l
 s 1997 136 m 1985 104 l s 1997 136 m 1997 104 l s 2007 112 m 2007 99 l 2008 97
 l 2009 96 l 2011 96 l s 2005 107 m 2010 107 l s 2019 107 m 2017 106 l 2015 105
 l 2015 102 l 2015 101 l 2015 99 l 2017 97 l 2019 96 l 2021 96 l 2022 97 l 2024
 99 l 2025 101 l 2025 102 l 2024 105 l 2022 106 l 2021 107 l 2019 107 l cl s
 2030 107 m 2030 91 l s 2030 105 m 2031 106 l 2033 107 l 2035 107 l 2037 106 l
 2038 105 l 2039 102 l 2039 101 l 2038 99 l 2037 97 l 2035 96 l 2033 96 l 2031
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l
 s 267 439 m 266 438 l 267 436 l 269 438 l 267 439 l cl s 296 470 m 280 447 l
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 449 l 318 451 l 314 454 l 313 459 l 313 460 l 314 465 l 318 469 l 322 470 l
324
 470 l 329 469 l 332 465 l 334 459 l 334 451 l 332 443 l 329 438 l 324 436 l
321
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470
 m 397 436 l s 382 455 m 413 455 l s 382 436 m 413 436 l s 453 470 m 448 469 l
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l
 464 443 l 466 451 l 466 456 l 464 464 l 461 469 l 456 470 l 453 470 l cl s 479
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 l 492 456 l 492 451 l 493 443 l 497 438 l 501 436 l 505 436 l 510 438 l 513
443
 l 514 451 l 514 456 l 513 464 l 510 469 l 505 470 l 501 470 l cl s 534 470 m
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l
 542 438 l 545 443 l 547 451 l 547 456 l 545 464 l 542 469 l 537 470 l 534 470
l
 cl s 573 470 m 557 447 l 581 447 l s 573 470 m 573 436 l s 629 462 m 628 465 l
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l
 607 444 l 608 441 l 612 438 l 615 436 l 621 436 l 625 438 l 628 441 l 629 444
l
 629 449 l s 621 449 m 629 449 l s 639 449 m 659 449 l 659 452 l 657 456 l 655
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644
 438 l 647 436 l 652 436 l 655 438 l 659 441 l s 665 470 m 678 436 l s 691 470
m
 678 436 l s 308 597 m 292 574 l 317 574 l s 308 597 m 308 563 l s 329 591 m
333
 592 l 338 597 l 338 563 l s 360 566 m 359 565 l 360 563 l 362 565 l 360 566 l
 cl s 393 597 m 376 597 l 375 582 l 376 584 l 381 586 l 386 586 l 391 584 l 394
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375
 566 l 373 570 l s 410 591 m 414 592 l 419 597 l 419 563 l s 474 597 m 474 563
l
 s 459 582 m 490 582 l s 459 563 m 490 563 l s 530 597 m 525 595 l 522 591 l
520
 582 l 520 578 l 522 570 l 525 565 l 530 563 l 533 563 l 538 565 l 541 570 l
543
 578 l 543 582 l 541 591 l 538 595 l 533 597 l 530 597 l cl s 556 566 m 554 565
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l
 622 591 l 622 587 l 620 584 l 617 579 l 601 563 l 624 563 l s 651 586 m 651
563
 l s 651 579 m 656 584 l 659 586 l 664 586 l 667 584 l 669 579 l 669 563 l s
682
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l
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721
 l 313 717 l 313 714 l 312 711 l 308 706 l 292 690 l 315 690 l s 334 724 m 329
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342
 692 l 346 696 l 347 704 l 347 709 l 346 717 l 342 722 l 338 724 l 334 724 l cl
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704
 l 407 708 l 406 713 l 406 714 l 407 719 l 410 722 l 415 724 l 417 724 l 422
722
 l 425 719 l 427 713 l 427 704 l 425 696 l 422 692 l 417 690 l 414 690 l 409
692
 l 407 695 l s 474 724 m 474 690 l s 459 708 m 490 708 l s 459 690 m 490 690 l
s
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l
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l
 530 724 l cl s 556 693 m 554 692 l 556 690 l 557 692 l 556 693 l cl s 578 724
m
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l
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l
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l
 301 823 l 303 831 l 303 836 l 301 844 l 298 849 l 293 851 l 290 851 l cl s 316
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823
 l 351 831 l 351 836 l 350 844 l 347 849 l 342 851 l 338 851 l cl s 366 844 m
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436
 851 m 431 849 l 428 844 l 426 836 l 426 831 l 428 823 l 431 818 l 436 817 l
439
 817 l 444 818 l 447 823 l 449 831 l 449 836 l 447 844 l 444 849 l 439 851 l
436
 851 l cl s 494 851 m 494 817 l s 479 835 m 510 835 l s 479 817 m 510 817 l s
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l
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l
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m
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l
 607 818 l 610 823 l 611 831 l 611 836 l 610 844 l 607 849 l 602 851 l 599 851
l
 cl s 631 851 m 626 849 l 623 844 l 621 836 l 621 831 l 623 823 l 626 818 l 631
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634
 851 l 631 851 l cl s 658 844 m 662 846 l 667 851 l 667 817 l s 707 846 m 705
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692
 818 l 697 817 l 699 817 l 704 818 l 707 822 l 709 827 l 709 828 l 707 833 l
704
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l
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965
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361
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l
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l
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976
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945
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610
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944
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978
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l
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l
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1737
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1739
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cl
 s 398 1733 m 402 1734 l 406 1739 l 406 1705 l s 442 1739 m 426 1716 l 450 1716
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479
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1724
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1739
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1739
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1201
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m
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1201
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l
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1331
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1324
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 1358 m 410 1357 l 407 1352 l 406 1344 l 406 1339 l 407 1331 l 410 1326 l 415
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 1357 l 419 1358 l 415 1358 l cl s 474 1358 m 474 1324 l s 459 1343 m 490 1343
l
 s 459 1324 m 490 1324 l s 530 1358 m 525 1357 l 522 1352 l 520 1344 l 520 1339
 l 522 1331 l 525 1326 l 530 1324 l 533 1324 l 538 1326 l 541 1331 l 543 1339 l
 543 1344 l 541 1352 l 538 1357 l 533 1358 l 530 1358 l cl s 556 1328 m 554
1326
 l 556 1324 l 557 1326 l 556 1328 l cl s 578 1358 m 573 1357 l 570 1352 l 568
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 313 1458 l 315 1466 l 315 1471 l 313 1479 l 310 1484 l 305 1485 l 302 1485 l
cl
 s 328 1454 m 326 1453 l 328 1451 l 329 1453 l 328 1454 l cl s 351 1485 m 346
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 385 1485 l 389 1484 l 393 1480 l 394 1474 l 394 1466 l 393 1458 l 389 1453 l
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 m 428 1485 l s 474 1485 m 474 1451 l s 459 1470 m 490 1470 l s 459 1451 m 490
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 1479 l 538 1484 l 533 1485 l 530 1485 l cl s 556 1454 m 554 1453 l 556 1451 l
 557 1453 l 556 1454 l cl s 578 1485 m 573 1484 l 570 1479 l 568 1471 l 568
1466
 l 570 1458 l 573 1453 l 578 1451 l 581 1451 l 586 1453 l 590 1458 l 591 1466 l
 591 1471 l 590 1479 l 586 1484 l 581 1485 l 578 1485 l cl s 611 1485 m 606
1484
 l 603 1479 l 601 1471 l 601 1466 l 603 1458 l 606 1453 l 611 1451 l 614 1451 l
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 611 1485 l cl s 649 1485 m 633 1463 l 658 1463 l s 649 1485 m 649 1451 l s 685
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 1593 l 315 1598 l 313 1606 l 310 1610 l 305 1612 l 302 1612 l cl s 328 1581 m
 326 1580 l 328 1578 l 329 1580 l 328 1581 l cl s 351 1612 m 346 1610 l 342
1606
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 362 1585 l 363 1593 l 363 1598 l 362 1606 l 359 1610 l 354 1612 l 351 1612 l
cl
 s 396 1612 m 380 1578 l s 373 1612 m 396 1612 l s 407 1604 m 407 1606 l 409
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 l 520 1598 l 520 1593 l 522 1585 l 525 1580 l 530 1578 l 533 1578 l 538 1580 l
 541 1585 l 543 1593 l 543 1598 l 541 1606 l 538 1610 l 533 1612 l 530 1612 l
cl
 s 556 1581 m 554 1580 l 556 1578 l 557 1580 l 556 1581 l cl s 578 1612 m 573
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 1578 l 586 1580 l 590 1585 l 591 1593 l 591 1598 l 590 1606 l 586 1610 l 581
 1612 l 578 1612 l cl s 606 1606 m 609 1607 l 614 1612 l 614 1578 l s 638 1606
m
 641 1607 l 646 1612 l 646 1578 l s 290 1105 m 285 1103 l 282 1098 l 280 1090 l
 280 1085 l 282 1077 l 285 1072 l 290 1071 l 293 1071 l 298 1072 l 301 1077 l
 303 1085 l 303 1090 l 301 1098 l 298 1103 l 293 1105 l 290 1105 l cl s 316
1074
 m 314 1072 l 316 1071 l 317 1072 l 316 1074 l cl s 330 1096 m 330 1098 l 332
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 1095 l 348 1092 l 345 1087 l 329 1071 l 351 1071 l s 364 1105 m 382 1105 l 372
 1092 l 377 1092 l 381 1090 l 382 1088 l 384 1084 l 384 1080 l 382 1075 l 379
 1072 l 374 1071 l 369 1071 l 364 1072 l 363 1074 l 361 1077 l s 395 1096 m 395
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 1098 l 415 1095 l 413 1092 l 410 1087 l 393 1071 l 416 1071 l s 436 1105 m 431
 1103 l 428 1098 l 426 1090 l 426 1085 l 428 1077 l 431 1072 l 436 1071 l 439
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1071
 m 510 1071 l s 550 1105 m 545 1103 l 542 1098 l 540 1090 l 540 1085 l 542 1077
 l 545 1072 l 550 1071 l 553 1071 l 558 1072 l 561 1077 l 563 1085 l 563 1090 l
 561 1098 l 558 1103 l 553 1105 l 550 1105 l cl s 576 1074 m 574 1072 l 576
1071
 l 577 1072 l 576 1074 l cl s 599 1105 m 594 1103 l 590 1098 l 589 1090 l 589
 1085 l 590 1077 l 594 1072 l 599 1071 l 602 1071 l 607 1072 l 610 1077 l 611
 1085 l 611 1090 l 610 1098 l 607 1103 l 602 1105 l 599 1105 l cl s 631 1105 m
 626 1103 l 623 1098 l 621 1090 l 621 1085 l 623 1077 l 626 1072 l 631 1071 l
 634 1071 l 639 1072 l 642 1077 l 644 1085 l 644 1090 l 642 1098 l 639 1103 l
 634 1105 l 631 1105 l cl s 658 1098 m 662 1100 l 667 1105 l 667 1071 l s 707
 1100 m 705 1103 l 701 1105 l 697 1105 l 692 1103 l 689 1098 l 688 1090 l 688
 1082 l 689 1075 l 692 1072 l 697 1071 l 699 1071 l 704 1072 l 707 1075 l 709
 1080 l 709 1082 l 707 1087 l 704 1090 l 699 1092 l 697 1092 l 692 1090 l 689
 1087 l 688 1082 l s 290 1866 m 285 1864 l 282 1859 l 280 1851 l 280 1846 l 282
 1838 l 285 1833 l 290 1832 l 293 1832 l 298 1833 l 301 1838 l 303 1846 l 303
 1851 l 301 1859 l 298 1864 l 293 1866 l 290 1866 l cl s 316 1835 m 314 1833 l
 316 1832 l 317 1833 l 316 1835 l cl s 330 1858 m 330 1859 l 332 1863 l 334
1864
 l 337 1866 l 343 1866 l 347 1864 l 348 1863 l 350 1859 l 350 1856 l 348 1853 l
 345 1848 l 329 1832 l 351 1832 l s 363 1858 m 363 1859 l 364 1863 l 366 1864 l
 369 1866 l 376 1866 l 379 1864 l 381 1863 l 382 1859 l 382 1856 l 381 1853 l
 377 1848 l 361 1832 l 384 1832 l s 413 1866 m 397 1866 l 395 1851 l 397 1853 l
 402 1855 l 406 1855 l 411 1853 l 415 1850 l 416 1845 l 416 1842 l 415 1837 l
 411 1833 l 406 1832 l 402 1832 l 397 1833 l 395 1835 l 393 1838 l s 447 1861 m
 445 1864 l 440 1866 l 437 1866 l 432 1864 l 429 1859 l 428 1851 l 428 1843 l
 429 1837 l 432 1833 l 437 1832 l 439 1832 l 444 1833 l 447 1837 l 449 1842 l
 449 1843 l 447 1848 l 444 1851 l 439 1853 l 437 1853 l 432 1851 l 429 1848 l
 428 1843 l s 494 1866 m 494 1832 l s 479 1850 m 510 1850 l s 479 1832 m 510
 1832 l s 550 1866 m 545 1864 l 542 1859 l 540 1851 l 540 1846 l 542 1838 l 545
 1833 l 550 1832 l 553 1832 l 558 1833 l 561 1838 l 563 1846 l 563 1851 l 561
 1859 l 558 1864 l 553 1866 l 550 1866 l cl s 576 1835 m 574 1833 l 576 1832 l
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1846
 l 590 1838 l 594 1833 l 599 1832 l 602 1832 l 607 1833 l 610 1838 l 611 1846 l
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1864
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 639 1833 l 642 1838 l 644 1846 l 644 1851 l 642 1859 l 639 1864 l 634 1866 l
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 1866 m 692 1832 l s 686 1866 m 709 1866 l s 290 1993 m 285 1991 l 282 1986 l
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 301 1965 l 303 1973 l 303 1978 l 301 1986 l 298 1991 l 293 1993 l 290 1993 l
cl
 s 316 1962 m 314 1960 l 316 1959 l 317 1960 l 316 1962 l cl s 334 1986 m 337
 1988 l 342 1993 l 342 1959 l s 382 1988 m 381 1991 l 376 1993 l 372 1993 l 368
 1991 l 364 1986 l 363 1978 l 363 1970 l 364 1964 l 368 1960 l 372 1959 l 374
 1959 l 379 1960 l 382 1964 l 384 1968 l 384 1970 l 382 1975 l 379 1978 l 374
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 1993 l 405 1993 l 400 1991 l 397 1986 l 395 1978 l 395 1970 l 397 1964 l 400
 1960 l 405 1959 l 406 1959 l 411 1960 l 415 1964 l 416 1968 l 416 1970 l 415
 1975 l 411 1978 l 406 1980 l 405 1980 l 400 1978 l 397 1975 l 395 1970 l s 434
 1993 m 429 1991 l 428 1988 l 428 1985 l 429 1981 l 432 1980 l 439 1978 l 444
 1977 l 447 1973 l 449 1970 l 449 1965 l 447 1962 l 445 1960 l 440 1959 l 434
 1959 l 429 1960 l 428 1962 l 426 1965 l 426 1970 l 428 1973 l 431 1977 l 436
 1978 l 442 1980 l 445 1981 l 447 1985 l 447 1988 l 445 1991 l 440 1993 l 434
 1993 l cl s 494 1993 m 494 1959 l s 479 1977 m 510 1977 l s 479 1959 m 510
1959
 l s 550 1993 m 545 1991 l 542 1986 l 540 1978 l 540 1973 l 542 1965 l 545 1960
 l 550 1959 l 553 1959 l 558 1960 l 561 1965 l 563 1973 l 563 1978 l 561 1986 l
 558 1991 l 553 1993 l 550 1993 l cl s 576 1962 m 574 1960 l 576 1959 l 577
1960
 l 576 1962 l cl s 599 1993 m 594 1991 l 590 1986 l 589 1978 l 589 1973 l 590
 1965 l 594 1960 l 599 1959 l 602 1959 l 607 1960 l 610 1965 l 611 1973 l 611
 1978 l 610 1986 l 607 1991 l 602 1993 l 599 1993 l cl s 631 1993 m 626 1991 l
 623 1986 l 621 1978 l 621 1973 l 623 1965 l 626 1960 l 631 1959 l 634 1959 l
 639 1960 l 642 1965 l 644 1973 l 644 1978 l 642 1986 l 639 1991 l 634 1993 l
 631 1993 l cl s 676 1993 m 660 1959 l s 654 1993 m 676 1993 l s 707 1981 m 705
 1977 l 702 1973 l 697 1972 l 696 1972 l 691 1973 l 688 1977 l 686 1981 l 686
 1983 l 688 1988 l 691 1991 l 696 1993 l 697 1993 l 702 1991 l 705 1988 l 707
 1981 l 707 1973 l 705 1965 l 702 1960 l 697 1959 l 694 1959 l 689 1960 l 688
 1964 l s
gr gr showpage
end
%%EOF





%!PS-Adobe-2.0 EPSF-2.0
%%BoundingBox: 0 0 567 567
%%Title: /LBFIT2   EPS      A1
%%Creator: HIGZ Version 1.20/11
%%CreationDate: 14/04/94   19.33
%%EndComments
80 dict begin
/s {stroke} def /l {lineto} def /m {moveto} def /t { translate} def
/sw {stringwidth} def /r {rotate} def /rl {roll} def
/d {rlineto} def /rm {rmoveto} def /gr {grestore} def /f {eofill} def
/c {setrgbcolor} def /lw {setlinewidth} def /sd {setdash} def
/cl {closepath} def /sf {scalefont setfont} def
/box {m dup 0 exch d exch 0 d 0 exch neg d cl} def
/bl {box s} def /bf {box f} def
/mp {newpath /y exch def /x exch def} def
/side {[w .77 mul w .23 mul] .385 w mul sd w 0 l currentpoint t -144 r} def
/mr {mp x y w2 0 360 arc} def /m24 {mr s} def /m20 {mr f} def
/mb {mp x y w2 add m w2 neg 0 d 0 w neg d w 0 d 0 w d cl} def
/mt {mp x y w2 add m w2 neg w neg d w 0 d cl} def
/m21 {mb f} def /m25 {mb s} def /m22 {mt f} def /m26 {mt s} def
/m23 {mp x y w2 sub m w2 w d w neg 0 d cl f} def
 /m27 {mp x y w2 add m w3 neg w2 neg d w3 w2 neg d w3 w2 d cl s} def
 /m28 {mp x w2 sub y w2 sub w3 add m w3 0 d 0 w3 neg d w3 0 d 0 w3 d w3 0 d
 0 w3 d w3 neg 0 d 0 w3 d w3 neg 0 d 0 w3 neg d w3 neg 0 d cl s } def
 /m29 {mp gsave x w2 sub y w2 add w3 sub m currentpoint t
 4 {side} repeat cl fill gr} def
 /m30 {mp gsave x w2 sub y w2 add w3 sub m currentpoint t
 5 {side} repeat s gr} def /m31 {mp x y w2 sub m 0 w d x w2 sub y m w 0 d
 x w2 sub y w2 add m w w neg d x w2 sub y w2
 sub m w w d s} def
/m2 {mp x y w2 sub m 0 w d x w2 sub y m w 0 d s} def
/m5 {mp x w2 sub y w2 sub m w w d x w2 sub y w2 add m w w neg d s} def
/reencdict 24 dict def /ReEncode {reencdict begin /nco&na exch def
/nfnam exch def /basefontname exch def /basefontdict basefontname findfont def
/newfont basefontdict maxlength dict def basefontdict {exch dup /FID ne
{dup /Encoding eq {exch dup length array copy newfont 3 1 roll put} {exch
newfont 3 1 roll put} ifelse} {pop pop} ifelse } forall newfont
/FontName nfnam put nco&na aload pop nco&na length 2 idiv {newfont
/Encoding get 3 1 roll put} repeat nfnam newfont definefont pop end } def
/accvec [ 176 /agrave 181 /Agrave 190 /acircumflex 192 /Acircumflex
201 /adieresis 204 /Adieresis 209 /ccedilla 210 /Ccedilla 211 /eacute
212 /Eacute 213 /egrave 214 /Egrave 215 /ecircumflex 216 /Ecircumflex
217 /edieresis 218 /Edieresis 219 /icircumflex 220 /Icircumflex
221 /idieresis 222 /Idieresis 223 /ntilde 224 /Ntilde 226 /ocircumflex
228 /Ocircumflex 229 /odieresis 230 /Odieresis 231 /ucircumflex 236
/Ucircumflex
237 /udieresis 238 /Udieresis 239 /aring 242 /Aring 243 /ydieresis
244 /Ydieresis 246 /aacute 247 /Aacute 252 /ugrave 253 /Ugrave] def
/Times-Roman /Times-Roman accvec ReEncode
/Times-Italic /Times-Italic accvec ReEncode
/Times-Bold /Times-Bold accvec ReEncode
/Times-BoldItalic /Times-BoldItalic accvec ReEncode
/Helvetica /Helvetica accvec ReEncode
/Helvetica-Oblique /Helvetica-Oblique accvec ReEncode
/Helvetica-Bold /Helvetica-Bold accvec ReEncode
/Helvetica-BoldOblique /Helvetica-BoldOblique  accvec ReEncode
/Courier /Courier accvec ReEncode
/Courier-Oblique /Courier-Oblique accvec ReEncode
/Courier-Bold /Courier-Bold accvec ReEncode
/Courier-BoldOblique /Courier-BoldOblique accvec ReEncode
/oshow {gsave [] 0 sd true charpath stroke gr} def
/stwn { /fs exch def /fn exch def /text exch def fn findfont fs sf
 text sw pop xs add /xs exch def} def
/stwb { /fs exch def /fn exch def /nbas exch def /textf exch def
textf length /tlen exch def nbas tlen gt {/nbas tlen def} if
fn findfont fs sf textf dup length nbas sub nbas getinterval sw
pop neg xs add /xs exch def} def
/accspe [ 65 /plusminus 66 /bar 67 /existential 68 /universal
69 /exclam 70 /numbersign 71 /greater 72 /question 73 /integral
74 /colon 75 /semicolon 76 /less 77 /bracketleft 78 /bracketright
79 /greaterequal 80 /braceleft 81 /braceright 82 /radical
83 /spade 84 /heart 85 /diamond 86 /club 87 /lessequal
88 /multiply 89 /percent 90 /infinity 48 /circlemultiply 49 /circleplus
50 /emptyset 51 /lozenge 52 /bullet 53 /arrowright 54 /arrowup
55 /arrowleft 56 /arrowdown 57 /arrowboth 48 /degree 44 /comma 43 /plus
 45 /angle 42 /angleleft 47 /divide 61 /notequal 40 /equivalence 41 /second
 97 /approxequal 98 /congruent 99 /perpendicular 100 /partialdiff 101 /florin
 102 /intersection 103 /union 104 /propersuperset 105 /reflexsuperset
 106 /notsubset 107 /propersubset 108 /reflexsubset 109 /element 110
/notelement
 111 /gradient 112 /logicaland 113 /logicalor 114 /arrowdblboth
 115 /arrowdblleft 116 /arrowdblup 117 /arrowdblright 118 /arrowdbldown
 119 /ampersand 120 /omega1 121 /similar 122 /aleph ] def
/Symbol /Special accspe ReEncode
gsave .25 .25 scale
%%EndProlog
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 s s s s s s s s s s s s s s s s s s s s s s s s s s s s 2 lw 1023 255 m 1034
 251 l s 1034 251 m 1052 248 l s 1052 248 m 1070 246 l s 1070 246 m 1089 246 l
s
 1089 246 m 1107 247 l s 1107 247 m 1125 249 l s 1125 249 m 1143 253 l s 1143
 253 m 1151 255 l s 1014 273 m 1016 267 l s 1016 267 m 1023 255 l s 1151 255 m
 1161 259 l s 1161 259 m 1179 268 l s 1179 268 m 1189 273 l s 1016 280 m 1014
 273 l s 1020 292 m 1016 280 l s 1189 273 m 1198 280 l s 1198 280 m 1213 292 l
s
 1032 310 m 1020 292 l s 1213 292 m 1216 294 l s 1216 294 m 1231 310 l s 1034
 313 m 1032 310 l s 1046 329 m 1034 313 l s 1231 310 m 1234 313 l s 1234 313 m
 1246 329 l s 1052 337 m 1046 329 l s 1060 347 m 1052 337 l s 1246 329 m 1252
 337 l s 1252 337 m 1259 347 l s 1070 362 m 1060 347 l s 1073 366 m 1070 362 l
s
 1259 347 m 1270 365 l s 1270 365 m 1271 366 l s 1087 384 m 1073 366 l s 1271
 366 m 1280 384 l s 1089 387 m 1087 384 l s 1100 403 m 1089 387 l s 1280 384 m
 1288 400 l s 1288 400 m 1290 403 l s 1107 412 m 1100 403 l s 1113 421 m 1107
 412 l s 1290 403 m 1297 421 l s 1125 440 m 1113 421 l s 1125 440 m 1125 440 l
s
 1297 421 m 1305 440 l s 1137 458 m 1125 440 l s 1305 440 m 1306 443 l s 1306
 443 m 1312 458 l s 1143 468 m 1137 458 l s 1149 477 m 1143 468 l s 1312 458 m
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 495 l s 1171 514 m 1161 498 l s 1324 495 m 1325 497 l s 1325 497 m 1329 514 l
s
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s
 1346 588 m 1349 606 l s 1232 625 m 1222 606 l s 1349 606 m 1352 625 l s 1234
 630 m 1232 625 l s 1242 643 m 1234 630 l s 1352 625 m 1354 643 l s 1251 662 m
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 665 l s 1356 662 m 1358 680 l s 1270 699 m 1261 680 l s 1358 680 m 1360 699 l
s
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s
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 799 m 1332 791 l s 1348 791 m 1343 799 l s 886 255 m 889 251 l s 889 251 m 903
 236 l s 1235 236 m 1252 245 l s 1252 245 m 1268 255 l s 889 262 m 886 255 l s
 893 273 m 889 262 l s 1268 255 m 1270 256 l s 1270 256 m 1288 271 l s 1288 271
 m 1291 273 l s 905 292 m 893 273 l s 1291 273 m 1306 289 l s 1306 289 m 1309
 292 l s 907 294 m 905 292 l s 920 310 m 907 294 l s 1309 292 m 1325 309 l s
 1325 309 m 1325 310 l s 925 317 m 920 310 l s 935 329 m 925 317 l s 1325 310 m
 1339 329 l s 943 339 m 935 329 l s 950 347 m 943 339 l s 1339 329 m 1343 334 l
 s 1343 334 m 1351 347 l s 962 363 m 950 347 l s 964 366 m 962 363 l s 1351 347
 m 1361 363 l s 1361 363 m 1363 366 l s 977 384 m 964 366 l s 1363 366 m 1373
 384 l s 980 388 m 977 384 l s 990 403 m 980 388 l s 1373 384 m 1379 396 l s
 1379 396 m 1382 403 l s 998 414 m 990 403 l s 1003 421 m 998 414 l s 1382 403
m
 1391 421 l s 1014 440 m 1003 421 l s 1391 421 m 1397 434 l s 1397 434 m 1399
 440 l s 1016 443 m 1014 440 l s 1026 458 m 1016 443 l s 1399 440 m 1407 458 l
s
 1034 473 m 1026 458 l s 1036 477 m 1034 473 l s 1407 458 m 1414 477 l s 1047
 495 m 1036 477 l s 1414 477 m 1415 479 l s 1415 479 m 1421 495 l s 1052 506 m
 1047 495 l s 1056 514 m 1052 506 l s 1421 495 m 1428 514 l s 1066 532 m 1056
 514 l s 1428 514 m 1433 531 l s 1433 531 m 1434 532 l s 1070 542 m 1066 532 l
s
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 551 m 1445 569 l s 1089 580 m 1084 569 l s 1092 588 m 1089 580 l s 1445 569 m
 1450 588 l s 1100 606 m 1092 588 l s 1450 588 m 1452 591 l s 1452 591 m 1455
 606 l s 1107 622 m 1100 606 l s 1108 625 m 1107 622 l s 1455 606 m 1460 625 l
s
 1116 643 m 1108 625 l s 1460 625 m 1465 643 l s 1123 662 m 1116 643 l s 1465
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 699 l s 1143 714 m 1138 699 l s 1144 717 m 1143 714 l s 1478 699 m 1482 717 l
s
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 791 l s 1176 810 m 1170 791 l s 1496 791 m 1499 810 l s 1179 821 m 1176 810 l
s
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 1509 866 l s 1198 881 m 1193 866 l s 1198 884 m 1198 881 l s 1509 866 m 1511
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s
 1514 903 m 1517 921 l s 1214 940 m 1209 921 l s 1517 921 m 1520 940 l s 1216
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 1219 958 l s 1522 958 m 1524 970 l s 1524 970 m 1525 977 l s 1229 995 m 1224
 977 l s 1525 977 m 1527 995 l s 1234 1014 m 1229 995 l s 1234 1014 m 1234 1014
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l
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810
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847
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862
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l
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l
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740
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740
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717
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736
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995
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