%Paper: 
%From: Joaquim <MATIAS%EBUBECM1.BITNET@vm.cnuce.cnr.it>
%Date: Thu, 14 Jul 94 17:12:43 BCN
%Date (revised): Sat, 20 Aug 94 17:18:12 BCN


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 \magnification=1200
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\line{\hfil UB-ECM-PF-94/12}
\line{\hfil June 1994}
\vskip 2truecm
\font\gran=cmbx12
{ \centerline{\gran Some Remarks on the Matching Conditions }}
\vskip 1truecm
\bigskip
\centerline{D. Espriu  ~and~  J. Matias}
\bigskip
\centerline{\it D.E.C.M., Facultat de F\'\i sica and I.F.A.E.}
\centerline{\it Universitat de Barcelona}
\centerline{\it Diagonal, 647}
\centerline{\it E-08028 Barcelona}
\vskip 1.5truecm
\centerline{ABSTRACT}
 \bigskip
We analyze the matching conditions
to determine the values that the ${\cal O}(p^4)$ coefficients of an
Effective Chiral Lagrangian take in the Standard Model in the
limit of a large Higgs mass, pointing out a number of subtleties
that appear to have gone unnoticed previously. We apply
the resulting Effective Chiral Lagrangian,
including the leading two loop effects, to analyze the
most recent electroweak data assuming $m_{top}=174\pm 10$ GeV.


\vfill
\eject
\pageno=1
\footline={\hss \folio \hss}

\line{\bf 1. Introduction\hfil}
\medskip\noindent
 Using an Effective Chiral Lagrangian [1] has been a popular approach
 to study the Symmetry Breaking Sector of the
 Standard Model in recent times. The reasons for this popularity
 are twofold. On the one hand, some calculations
 concerning the scattering of longitudinally polarized $W$'s and $Z$'s
 are greatly simplified in the limit where the Higgs mass is large
 if, instead of the full Standard Model, one
 just replaces these longitudinal degrees of freedom by the
 corresponding Goldstone bosons[2] and works with the self-interaction
 part of the scalar sector of the Standard Model. In the limit where
 the Higgs is very massive this self-interaction sector becomes
 a non-linear sigma model. Secondly, it was realized some time
 ago[3,4] that if one assumes a certain gap between
 the electroweak scale $G_F^{-1}$ and new resonances either scalar,
 such as the Higgs (in the minimal Standard Model),
 or vector-like, such as e.g. technirhos (in composite models), it
 was possible to parametrize in full generality the Symmetry Breaking
 Sector by the ${\cal O}(p^4)$ coefficients of an Effective Chiral
 Lagrangian describing the interactions of the Goldstone bosons
 associated to the breaking of the group $SU(2)_L\times SU(2)_R$ down
 to its diagonal subgroup.


We have examined the way these ${\cal O}(p^4)$ coefficients
are determined in the Standard Model and we have found a number of
difficulties in the way the problem is usually addressed. These
can be summarized as follows:  a) at what level one should
impose matching between the effective and fundamental theory
(S-matrix elements, light particle 1PI Green functions,
connected Green functions)? b) should one also consider
gauge non-invariant effective operators in the effective theory
since gauge invariance is lost in Green functions once the gauge is
fixed?

The experimental
 precision for some experiments sensitive to these coefficients
 is such[5] that the days of order-of-magnitude estimates are gone.
 It
 is  essential to be able to
 determine as precisely as possible the values of these ${\cal O}(p^4)$
 coefficients in the different models one chooses to compare with the
 experimental data. The differences are often minute, but this is where
 the clues as to what lies beyond the Standard Model are.



We have used the most recent available electroweak data, combined
with the preliminary determination of the top quark mass
by CDF, to set bounds on the values of the Effective Chiral
Lagrangian. The `oblique' corrections ---by far the dominant
ones--- turn out to be sensitive in a non-ambiguous manner
to {\it only one} combination
of coefficients of this effective theory. Our analysis, including
the leading two loop effects, is presented in the last section.
\bigskip

\line{\bf 2. Changing Variables in the Standard Model\hfil}
\medskip\noindent
In the usual representation of the Symmetry Breaking Sector
of the Standard
Model, the Goldstone bosons transform linearly under the $SU(2)_L\times
U(1)_Y$ gauge
group. However, if one is interested in a comparison with an
effective lagrangian approach where the Goldstone bosons
transform non-linearly it seems natural to implement
a change of variables in the Standard Model itself to
make the goldstones transform non-linearly too. In
this way the identification of fields and Green functions
will be clearer.


We write the Weinberg-Salam model
(without fermions) in the following form
%
$$
{\cal L}_{SM}=-{1 \over 2}{\rm Tr} W_{\mu\nu} W^{\mu\nu}
-{1 \over 4} B_{\mu\nu} B^{\mu\nu}+{1 \over 4}{\rm Tr} D_{\mu} M^{\dag}
D^{\mu} M -{1 \over 4} \lambda ({1 \over 2}
{\rm Tr} M^{\dag} M+{\mu^2 \over \lambda})^{2} \eqno(2.1)
$$
%
$M$ collects the scalar fields. Writing
$M=\sigma+i\vec{\tau}\vec{\omega}$ one recovers the
familiar lagrangian. Under the local $SU(2)_{L}\times U(1)_Y$ group
$M$ transforms as
%
$$M'(x)=e^{i {\vec{\alpha} \vec{\tau} \over 2}} M(x) e^{-i {\beta
\tau^{3} \over 2}}\eqno(2.2)$$
%
The covariant derivative $D_{\mu}$ acts on $M$ as
%
$$D_{\mu} M=\partial_{\mu} M + i g W_{\mu} M(x) -
ig' B_{\mu} M(x){ \tau^{3} \over 2}\eqno(2.3) $$
%
%
$B_{\mu}$ and $W_{\mu}={1 \over 2} W_{\mu}^i
\tau^{i} $ are the vector boson fields, and
$B_{\mu\nu}$ and $W^{\mu\nu}$ are the corresponding field strength
tensors.
The fields $W_{\mu}^{3}$ and $B_{\mu}$ are a combination
of the physical degrees of freedom $A_{\mu},Z_{\mu}$
%
$$\eqalign{
A_{\mu}     = W_{\mu}^{3} s_{w} + B_{\mu} c_{w} \qquad  \qquad
Z_{\mu}     = W_{\mu}^{3} c_{w} - B_{\mu} s_{w} }\eqno(2.4) $$
%
$c_{w}$ and $s_{w}$ being the cosinus and sinus of the Weinberg angle,
respectively. In the on-shell scheme, which we shall use,
$c_{w}\equiv M_{W}/M_{Z}$.

One should add to (2.1) the gauge-fixing and Faddeev-Popov terms
%
$$
{\cal L}_{GF}=-{1 \over 2\xi_{W}}\sum_{i=1,3} (\partial^{\mu}
W_{\mu}^{i}+ {i \over 4} g v \xi_{W}{\rm Tr}\tau^{i} M)^2
-{1 \over 2\xi_{B}}(\partial^{\mu} B_{\mu}-
{i \over {4 }} g^\prime v \xi_{B}{\rm Tr}\tau^{3} M)^2 \eqno(2.5)
$$
%
$$\eqalign{
{\cal L}_{FP}=& \partial^\mu c^{\dag}_{0} \partial_{\mu}
c_{0} +
 \partial^\mu c^{\dag}_{i} \partial_{\mu} c_{i}
 -{1 \over 8}
g^{\prime 2}
v \xi_{B} c^{\dag}_{0} {\rm Tr} M c_{0}
+g\, c^{\dag}_{i} (\partial^{\mu} W_{\mu}^{k} \epsilon ^{ikj} - {1
\over 8} g v \xi_{W} {\rm Tr} \tau^{i} \tau^{j} M) c_{j} \cr
&+{1 \over 8} \sqrt{g g^\prime}
\,v \, (g^\prime \xi_{B}
c^{\dag}_{0} c_{i}+g \xi_{W} c^{\dag}_{i} c_{0}) {\rm Tr} \tau^{3}
\tau^{i} M }
\eqno(2.6)$$
In
Landau gauge ($\xi=0$) ghosts decouple from
Goldstone bosons.

We are free to choose a different parametrization for the matrix $M$,
implying a field redefinition.
Not any transformation leaves the S-matrix elements between physical
states unchanged, however.
In the functional integral ${\cal Z}=\int {\cal D}
\phi e^{i {\cal S}+J \phi}$, where $\phi$
and $J$ collectively stand for
field and sources, respectively, such a field redefinition will
induce a jacobian. It was demonstrated in [6]
that if this jacobian
is the identity when  all fields are set to zero
then the corresponding transformation is an
allowed one. One of such allowed field redefinitions in the
Standard Model is precisely the
one mapping the linear onto the non-linear realization
%
$$
M=(v+\rho)U\qquad\qquad
U=\exp{i {{\vec{\pi}\vec{\tau}}\over v}} \eqno(2.7)
$$
%
where we already allow for a non-zero expectation value of the
matrix $M$ by introducing $v$. In the Standard Model,
$v=\sqrt{-\mu^2/\lambda}\simeq 250$ GeV.

We have
%
$$
\sigma=(\rho+v) \cos{{\pi \over v}}-v=
\rho -{1 \over 2v}\pi^{2}-{\rho \over {2v^2}} \pi^{2}+...\eqno(2.8)
$$
$$
\omega^{i}=(\rho+v)  {\pi^{i} \over \pi} \sin{{\pi \over v}}
=\pi^{i}+{\rho \over v} \pi^{i}-{1 \over {6v^2}}{\pi^{2}}
\pi^{i}+... \eqno(2.9)
$$
%
with $\pi=\sqrt{\sum_{i=1,3}}(\pi^i)^2$.
The jacobian of the change is
%
$$J(\rho,\pi^i)=\left\vert {{\partial (\sigma,\omega^i)} \over {\partial
(\rho,\pi^j)}}
\right\vert={1 \over v} (\rho+v)^3 {\sin^2{\pi \over v} \over \pi^2}
\eqno(2.10) $$
%
so indeed
$J(0,0)=1$, checking that the transformation is an allowed
one.

In fact, in the non-linear realization one expects
the covariant group measure
$d\mu(U)= \prod{d\pi^i}\sqrt{\det{g} }$ to appear. Here
$g$ is the group metric, given by
%
$$
g_{jk}={\delta^2 \over \delta(\partial_\nu \pi^{j}) \delta
(\partial^\nu\pi^{k})} ({v^2 \over 4}{\rm  Tr}
\partial_{\mu} U^{\dag} \partial^{\mu}U)
=v^2 {\sin^2{\pi \over v} \over \pi^2} (\delta_{jk}-{\pi_{j} \pi_{k}
\over \pi^2}) + {\pi_{j} \pi_{k} \over \pi^2} \eqno(2.11)$$
%
Working out $\sqrt{\det g}$ one finds
%
$$\sqrt{\det {g} }=v^2 {\sin^2{\pi \over v} \over \pi^2}\eqno(2.12)
$$
which is indeed contained in (2.10).
The jacobian (2.10) can be exponentiated
%
$$
\det{J}=\exp{\delta^{(4)}(0){\rm Tr}\ln{J}}\eqno(2.13) $$
%
In dimensional
regularization $\delta^{4}(0)$ is zero. But in other possible
regularization methods[7] this term will generate some tadpoles that
will be needed to yield a consistent result[8].
We will only use dimensional regularization here
and accordingly we will ignore
the jacobian altogether.

After substituting the parametrization (2.7) in (2.1)
one finds
%
$$\eqalign{
{\cal L}_{SM}=&{1 \over 2} \partial_{\mu} \rho \partial^{\mu} \rho
-\rho {\lambda v} (v^2+{\mu^2\over \lambda})
-{1 \over 2} \rho^2 (\mu^2 + 3 v^2 \lambda)
- \lambda v \rho^3 - {1\over 4}\lambda\rho^4 \cr
&+{1 \over 4} (\rho+v)^2 {\rm Tr}D_{\mu} U^{\dag} D^{\mu} U +
{\cal L}_{GF}^\prime
+ {\cal L}_{FP}^\prime}\eqno(2.14)$$
%
The primes in ${\cal L}_{FP}$ and ${\cal L}_{GF}$ indicate that
they also change under the  redefinition (2.7).

The couplings involving Goldstone bosons, collected in the
matrix $U$, have
changed completely when
compared to the linear realization.
All these couplings now involve derivatives and there are
an infinite number of them since we have a non-linear theory. Yet,
this non-linear theory is strictly equivalent to the Standard Model.
The couplings involving at least one gauge field remain unchanged
up to three fields, but for four fields and beyond
this is no longer the case. For instance, there is no vertex
$ W^{\mu +} W_{\mu}^{-} \pi^{+} \pi^{-} $.
Some new vertices
appear, e.g. $ \partial_{\mu} \pi^3 Z^{\mu}\rho^2 $,
and others change their coefficients.
The vertex that in the
old variables was ${i \over 2}g g^\prime s_{w} Z_{\mu} W_{\mu}^{+}
\omega^{-} \sigma$ now gets an extra factor of 2 and
becomes $ i g g' s_{w} Z_{\mu}
W_{\mu}^{+} \pi^{-} \rho$.
As befits a non-linear theory, we have vertices with
five, six, etc. fields, but they do not contribute to
the Green functions we will be interested in at the one loop level.
Of course, the different
coefficients have just the right values so as to render
a renormalizable and unitary theory as the Standard
Model should be.
\bigskip
\bigskip


\line{\bf 3. Heavy Higgs Limit\hfil}
\medskip\noindent
The parametrization (2.7) is particularly
useful in discussing the limit, within the minimal
Standard Model, when the Higgs particle is very heavy.
All the $M_{H}$ (or $\lambda$) dependence is
contained only in the propagator and
self-interactions  of the $\rho$ field,
while in the linear realization there are $\lambda$ dependences
in any scalar vertex.

The $\rho$ field itself interacts with the Goldstone bosons and
the gauge bosons through the operator
$O_{1}(x)= {\rm Tr}D_{\mu}
U^{\dag} D^{\mu} U$ and through the gauge-fixing and Fadeev-Popov terms.
The familiar 't Hooft
gauge-fixing term  (2.5) in the non-linear variables
reads
%
$$
{\cal L}_{GF}=-{1 \over 2\xi_{W}}\sum_{i=1,3} (\partial^{\mu}
W_{\mu}^{i}+ {i \over 4} g v \xi_{W}(v+\rho) {\rm Tr}\tau^{i} U)^2
-{1 \over 2\xi_{B}}(\partial^{\mu} B_{\mu}-
{i \over {4 }} g^\prime v \xi_{B}(v+\rho){\rm Tr}\tau^{3} U)^2
\eqno(3.1) $$
%
Unlike the usual formulation the Higgs field $\rho$ appears in the
gauge-fixing term.
Of course one could well have chosen some other gauge-fixing term,
since amplitudes are after all gauge independent, but, in practice,
we will be interested in making comparisons at other levels.
Most calculations in the Standard Model
are done in the 't Hooft gauge. In fact, the comparison
between theory and experiment is usually done for LEP physics
in the 't Hooft-Feynman gauge ($\xi=1$) [9,10]. `Observables' such
as the effective Weinberg angle $\bar{s}^2_w$ are actually
gauge dependent[13]. The $\rho$ couplings are simplest
in the 't Hooft-Landau gauge where
the Faddeev-Popov term does not lead to new Higgs
interactions and the additional
$\rho$ dependence appears only through the coupling
%
$$\rho (x)O_2(x)=-
 {iv \over 4}\rho (g\sum_{i=1,3}\partial^\mu W_\mu^i {\rm Tr}
\tau^i U -{g^\prime} \partial^\mu B_\mu {\rm Tr}
\tau^3 U)\eqno(3.2)$$
%
One can now formally perform
the functional integration over the Higgs field. The
result of such an integration will be a non-local
effective lagrangian of the type
%
$$
\int dk_{1} \int dk_{2} \dots \int dk_{n}
G_{\lambda}(k_{1},k_{2}, \dots ,k_{n}){\hat
O}(k_{1}){\hat O}(k_{2}) \dots {\hat O}(k_{n})
\eqno(3.3)$$
%
where $G_{\lambda}(k_{1},k_{2},\dots k_{n})$ are Green functions
that can be computed in a scalar field theory
involving only the $\rho$ field without any reference to the
gauge fields or Goldstone bosons.
These Green functions will depend on
$\lambda$ (or $M_{H}$) and an obviously important question is which is
the behaviour of $G_\lambda (k_1,k_2,\dots ,k_n)$ when
$\lambda\to\infty$. On general grounds we expect (3.3) to become
a local action in that limit.


A delicate point is whether one is allowed to take the $\lambda\to\infty$
limit directly in the
non-local lagrangian (3.3) and use the resulting local
effective field theory to compute quantum fluctuations for the remaining
fields[14]. Doing so would require the uniform
convergence of any momentum integral in which (3.3) is inserted,
a strong requirement that it is not always fulfilled.
After introducing the usual counterterms (e.g. using the on-shell
scheme[9-12] in the Standard Model) one is able to make all integrals
convergent, but typically they will be only conditionally convergent,
being the difference of two logarithmically divergent integrals.

In the on-shell scheme, if one considers
observables that depend only on renormalized self-energies (like the
celebrated
`oblique' corrections[9] contained in $\Delta r$, $\Delta\kappa$ and
$\Delta\rho$)
%
$$ \hat{\Sigma}(k^2)={\Sigma}(k^2)-{\Sigma}(M^2)+\delta Z_{2}
(k^2-M^2)
\eqno(3.4)$$
%
only one integral that depends on $M_H$ (actually $\sim$
$\log M_H$) and that is not uniformly convergent appears.
Thus
combinations that are finite in the large $M_H$ limit are combinations
where the potentially dangerous integral actually drops.
In these combinations (which, by the way, are the ones unambiguosly
predictable by an Effective Chiral Lagrangian[4,7]) we
are free to take the $M_H\to \infty$ limit {\it before} integrating
over the light degrees of freedom, simplifying the calculation
considerably.
This was the method used in [15] to determine the
contribution of the Standard Model to some LEP observables
in the large $M_H$ limit.

Unfortunately, it is not justified to retain only the leading
terms in the $1/M_H$ expansion of (3.3) for the three and four point
functions. In the on-shell scheme
the renormalized three and four point functions and their related
observables
will only be conditionally convergent, in general. We have to
keep the full non-local effective action (3.3).
(This point was overlooked
in [15], but subsequently realized in [16].)
To
determine the coefficients of the effective theory
reproducing the Standard Model we will
use the matching conditions, which will be
discussed in the next section.


It may be argued that one could expand the non-local action
in inverse powers of $M_H$ anyway provided that a physical
scale $\Lambda$ is introduced as cut-off. This is certainly
correct, since all integrals are then finite and well
behaved. Then one obtains a local action, equivalent to
(3.3) up to scales $k^2\sim \Lambda^2$ with some definite
values of the coefficients in this effective action. (These
coefficients, by the way, need not coincide with those
obtained by the use of the matching conditions, since the latter
contain some contribution from the light
particles.)
The above procedure, however, for a gauge theory is very difficult
to implement in an invariant way and we shall not pursue
this approach further here. Dimensional
regularization is the most useful regulator for gauge theories
and in dimensional regularization there is no manifest
decoupling of the heavy modes.
\bigskip


\line{\bf 4. Matching Conditions\hfil}
\medskip\noindent
We want to construct an effective
theory that reproduces the results of the Standard Model
without the Higgs. An obvious requirement this effective theory
should meet is to reproduce the same
S-matrix elements.
This is certainly a necessary condition, but it is not
the most useful way to proceed. For instance,
if we want to compare the fundamental and effective
theories at some intermediate steps (e.g.
at the level of the `oblique' corrections) we shall
need to deal with Green functions defined
off-shell both in the fundamental and in the effective
theory. Furthermore, to express these `observables'
in terms of the same set of parameters
($\alpha$, $M_W$, $M_Z$) it will be mandatory
 to renormalize both theories with the same conventions,
 requiring again off-shell Green functions.


It is often stated[17] that the matching can be done at the level
of the quantum effective action for the light fields;
that is, at the
level of the (light-fields) irreducible Green functions. This
is not quite correct. Let us see why.


{}From the generating functional $W=\log Z$
the renormalized connected Green functions of
the theory are obtained
%
$$
G_{c}(x_{1},x_{2},...,x_{n};\mu)={\delta^n W \over {\delta
J(x_{1}) \delta J(x_{2})... \delta
J(x_{n})}}\big\vert_{J=0}\eqno(4.1) $$
%
$\mu$ is some renormalization scale, chosen to be below
the mass of the particle we wish to integrate out, in
our case $\mu<M_H$.
Since the gauge fields have not been modified by the change
of variables (2.7),
the connected Green functions with only external gauge fields
should coincide when evaluated in the variables
($\sigma,\omega$) or ($\rho,\pi$).

This is not the case if one considers only one-particle
irreducible Green functions. The Legendre transform involves
the scalar fields too and these have changed.
For instance,
the 1PI Green functions
$\Gamma_{Z W W}$ and $\Gamma_{A W W}$
computed in the $(\sigma,\omega)$ or $(\rho,\pi)$ variables
at one loop change. In the large $M_H$ limit, the differences between
the linear $(\sigma,\omega)$ and non-linear $(\rho,\pi)$ realization,
denoted by $L$ and $NL$, respectively, are at one loop
%
$$\Gamma^{NL}_{ZWW}-\Gamma^{L}_{ZWW}=
 c_{w}{ 1\over 8} {g g'^2 \over {16 \pi^2}}(p_{2 \mu}g_{\lambda\nu}-p_{3
\nu}g_{\lambda\mu})\eqno(4.2)$$
$$\Gamma^{NL}_{AWW}-\Gamma^{L}_{AWW}=
- s_{w} {1\over 8} {g^3 \over {16 \pi^2}}(p_{2 \mu}g_{\lambda\nu}-p_{3
\nu}g_{\lambda\mu}) \eqno(4.3)$$
%
The culprit is one of the vertices containing four fields
that have changed in the non-linear realization.
(The full $M_H$ dependence of
these 1PI Green functions at one loop
in the linear realization can be found
in [10].) This simple
example should suffice to convince us that matching the Standard
Model to an effective theory by demanding the equality
of the 1PI Green functions is not correct, since a mere change
of variables (that does not affect the S-matrix elements)
in the Standard Model itself already changes these Green functions.


Of course
when we put everything together we must recover the same
connected functions with external gauge fields.
One can check this point easily for the connected
Green function  $\langle Z W^{+} W^{-}\rangle$ and $\langle A
W^{+} W^{-}\rangle$. To find the connected Green functions
one should add to Fig.1a the
reducible diagrams of Fig.1b.
It turns out that the 1PI Green function $\Sigma_{W\pi}$
also changes when we go to the $(\rho,\pi)$ variables; there
appears a new piece proportional to the squared momentum of the
internal $\pi$ field that cancels the $1/p^2_2$ of the propagator, yielding
a local contribution making up for the differences (4.2) and (4.3).

The matching conditions between an Effective Chiral Lagrangian
(ECL) and the Symmetry Breaking sector of the Standard Model (SM)
have therefore to be
imposed at the level of renormalized
connected Green functions for external
gauge fields (or on arbitrary S-matrix elements
between physical states, of course). We
will therefore tentatively demand that
%
$$
G_{\mu_1,\mu_2,\dots,\mu_n}^{SM}(x_1,x_2,\dots,x_n;\mu)=
G_{\mu_1,\mu_2,\dots,\mu_n}^{ECL}(x_1,x_2,\dots,x_n;\mu)
\eqno(4.4)$$
%
\bigskip

\line{\bf 5. Gauge Invariance and Matching Conditions\hfil}
\medskip\noindent
The effective low energy theory that one gets after
integrating out the heavy degrees of freedom in
the Standard Model, or, for that matter, in any theory with
the same local symmetry and the same
$SU(2)_L\times SU(2)_R\to SU(2)_V$ breaking
pattern, is the
gauged non-linear sigma model
%
$$
{\cal L}^{eff}=-{1 \over 2} {\rm Tr} W_{\mu\nu} W^{\mu\nu}
-{1 \over 4} B_{\mu\nu} B^{\mu\nu}+{v^2 \over 4} {\rm Tr} D_{\mu} U^{\dag}
D^{\mu} U + \sum_{i=0,13} a_i {\cal L}_{i}
+{\cal L}_{GF}+{\cal L}_{FP}
\eqno (5.1)
$$
%
A complete set of the operators ${\cal L}_i$ up to four derivatives
was given in [1].
Some of the operators are custodially
invariant, like those corresponding to the coefficients
$a_1$-$a_5$ (in the notation of [18,19] which we follow), while
others,
 such as $a_0$ and $a_6$-$a_{13}$, are not.
All of them are
gauge invariant operators.

This is a non-renormalizable theory but it may be rendered finite
at ${\cal O}(p^4)$
by redefining the $a_{i}
$ coefficients (only a few of them pick up divergent counterterms
actually[1]). The value
(at scale $\mu$) of these coefficients
is fixed by demanding the agreement with the Standard Model, thus
trading the dependence in the scale $\mu$ by $M_H$. In
the Standard Model therefore the bare coefficients are
of the form
%
$$ a_i={1\over {16\pi^2}}( c^{1}_i(C_{\epsilon}-
\log {M_H^2 \over \mu^2})+c^{2}_i)\eqno(5.2)
$$
%
with $C_\epsilon= {2 \over \epsilon} -\gamma + \ln 4 \pi$.
In another theory, $M_H^2$ is replaced by some other scale
$\Lambda$.


It is obvious that, in the Standard Model
after gauge-fixing the action, gauge non-invariant terms
are introduced.  In fact, the l.h.s. of the matching
conditions (4.4) is gauge dependent. Gauge non-invariant pieces
are also generated on the r.h.s. since in the effective
theory one needs to impose some gauge-fixing condition
as well. One might use gauge
conditions such as e.g.
%
$$ {\cal L}_{GF}^1=
-{1\over 2\xi_W}\sum_{i=1,3}
(\partial^\mu W_\mu^i +{i\over 4}gv^2\xi_W {\rm Tr}
\tau^i U)^2+\dots\eqno(5.3)$$
$$ {\cal L}_{GF}^2=
-{1\over 2\xi_W}\sum_{i=1,3}
(\partial^\mu W_\mu^i -{1\over 2}gv \xi_W \pi^i)^2
+\dots\eqno(5.4)$$
%
In fact, at the one loop level, for the Green functions
we are interested both are equivalent. At this point, it is
not obvious at all that the gauge non-invariant pieces that
are generated at one loop in the Standard Model with the usual
't Hooft-type gauge should be the same that appear from
a one-loop calculation with the pieces of
${\cal O}(p^2)$ in  ${\cal L}^{eff}$ using one of the
gauge-fixings  (5.3) or (5.4). Rather, one will
have to `fine tune' the gauge-fixing in the effective
theory to accomplish that. In other words,
one should also include  at ${\cal O}(p^4)$ some gauge non-invariant
operators on the r.h.s of the matching conditions. If not,
the matching conditions will overdetermine the coefficients
in the Effective Chiral Lagrangian and lead to inconsistencies.


This is an unwelcome complication.
Either we keep all BRS-invariant operators on the r.h.s of the
matching conditions
or we eliminate from
the Green functions to be matched the gauge dependent structures. Clearly
the latter is the simplest one and the one we take.
We shall therefore project the connected Green functions
on both sides of (4.4) on their tranversal components, by
multiplying them with the factor
%
$$ \prod_{i=1}^n (g^{\nu_i\mu_i}-{{k_i^{\nu_i} k_i^{\mu_i}}
\over k_i^2})\eqno(5.5)$$
%
This automatically eliminates all gauge-non invariant terms.
Of course even transverse parts may depend on the value
of the gauge parameter $\xi$. Fortunately, it can
be easily seen[19] that at the one loop level in the limit of
a large Higgs mass[12] all dependence on $\xi$ drops in
diagrams containing at least one Higgs internal line.
In the $M_H\to \infty$ limit the transverse projection of the
set of diagrams in the Standard Model that contains the
Higgs field; i.e. the set of diagrams whose contribution will
be implemented by the coefficients $a_i$ forms
a gauge invariant subset. One is then free to determine
these coefficients using, for instance, $\xi=0$ where the
chiral properties of the effective theory are manifest[1,18].
(The gauge-fixing term (5.3) respects the global
$SU(2)_L\times SU(2)_R$ invariance in this gauge.)


Let us now write explicitly the matching conditions
for the two point functions.
The renormalization constants for the fields and coupling
constants are defined in the usual way following the
on-shell prescriptions on both sides of (4.4).
The relevant diagrams will be those not common to
both sides of the equation and surviving the large Higgs
mass limit. They are discussed in [19]. We do not consider
tadpole
diagrams since they are exactly cancelled by redefining the second term in
(2.14).

$$ \eqalignno{
\Delta \hat{\Sigma}_{WW}=-
&{g^2 v^2 \over 4} (\Delta  Z_{\pi} -2
{\Delta
g \over g} -2 {\Delta  v \over v} ) - {g^2 \over {16 \pi^2}}({1
\over
8} M_{H}^2
-g^2 v^2 {3 \over 16} (C_{\epsilon} - \log {M_{H}^2 \over \mu^2}
+ {5 \over 6}))\cr
&+ q^2 (\Delta  Z_{W}+
{g^2 \over {16 \pi^2}} {1 \over
12} (C_{\epsilon} - \log {M_{H}^2 \over \mu^2}
+ {5 \over 6})) = 0  &(5.6) \cr  \cr
\Delta \hat{\Sigma}_{\gamma\gamma}=&q^2 (s_{w}^2 \Delta  Z_{W} + c_{w}^2
\Delta  Z_{B} -s_{w}^2 g^2 (a_{8}-2 a_{1})) = 0  &(5.7) \cr \cr
\Delta \hat{\Sigma}_{ZZ}=-
&{g^2 v^2 \over {4 c_{w}^2}}(\Delta Z_{\pi} -2 c_{w}^2 {\Delta  g
\over g} -2 s_{w}^2 {\Delta  g' \over g'} - 2{\Delta  v
\over v}+2 a_{0})\cr
&-{g^2 \over {16 \pi^2 c_{w}^2}}({1 \over 8}
M_{H}^2
-{g^2 v^2 \over c_{w}^2} {3 \over 16} (C_{\epsilon} - \log {M_{H}^2 \over
\mu^2}
+ {5 \over 6}))\cr
&+q^2 (c_{w}^2 \Delta  Z_{W}
+s_{w}^2 \Delta  Z_{B}
-c_{w}^2 g^2 a_{8} -2
s_{w}^2 g^2 a_{1} -(g^2 + g'^2)a_{13} \cr
&+  {g^2 \over {16 \pi^2 c_{w}^2}} {1 \over
12} (C_{\epsilon} - \log {M_{H}^2 \over \mu^2}
+ {5 \over 6})) = 0  & (5.8)\cr} $$

$$
\Delta \hat{\Sigma}_{\gamma Z}=-
gg'{v^2 \over 4} ({\Delta  g' \over
g'}-{\Delta  g
\over g}) + q^2 s_{w} c_{w} (\Delta  Z_{W}-\Delta  Z_{B} -
g^2 a_{8})
+q^2(c_{w}^2-s_{w}^2) gg'a_{1}=0   \eqno (5.9)
$$
%
where $\Delta$ means the difference between any quantity (self-energy,
renormalization constant) evaluated in the Standard Model
minus the same
quantity evaluated in ${\cal L}^{eff}$.
Since we work in the on-shell
scheme
and the renormalization constants of both theories have been generated
by the same renormalization conditions\footnote{$^1$}{In the
effective theory it is unnatural to demand
${\hat \Sigma}^\prime_H(M_H^2)=0$
as is usually done in the on-shell scheme,
since the Higgs is integrated out. It would be better to demand
a similar condition on the $\pi$ fields. However this does not affect
the present calculation}
we know [9] that they can be expressed
in terms of the
unrenormalized self-energies. One can calculate
their difference in both theories
%
$$ \eqalign{
\Delta  Z_{W}=&{1 \over s_{w}^2} (s_{w}^4-c_{w}^4) g^2
(a_{8}+a_{13}) -2 g^2 (a_{1}+a_{13})
-2 {c_{w}^2 \over s_{w}^2} a_{0}+
{g^2 \over {16 \pi^2}} {5 \over 6} (C_{\epsilon}-\log{M_{H}^2 \over
\mu^2}+{5 \over 6}) \cr
\Delta  Z_{B}=&g^2 (a_{8}+a_{13}) +2 a_{0}
-{g'^2 \over {16 \pi^2}} {5 \over 6} (C_{\epsilon}-\log{M_{H}^2 \over
\mu^2}+{5 \over 6}) + g'^2 a_{13} \cr}\eqno(5.10)$$
$$
\Delta  g  =\Delta  g'=0
$$
%
Putting  together (5.6) to (5.10)
one can determine some  coefficients
%
$$\eqalign{
&a_{0}={g'^2 \over 16 \pi^2} {3 \over 8} (C_{\epsilon}-\log{M_{H}^2
\over \mu^2} + {5 \over 6}) \cr
&a_{1}+a_{13}={1 \over {16 \pi^2}}{1 \over 12}
(C_{\epsilon}-\log{M_{H}^2 \over \mu^2}+{5 \over 6}) \cr
&a_{8}+a_{13}=0 \cr}\eqno(5.11)$$
%
Repeating the same procedure for the three  and four point
Green functions one gets
%
$$\eqalign{
&a_{2}={1 \over {16 \pi^2}}{1 \over 24}
(C_{\epsilon}-\log{M_{H}^2 \over \mu^2}+{17 \over 6}) \cr
&a_{3}=-{1 \over {16 \pi^2}}{1 \over 24}
(C_{\epsilon}-\log{M_{H}^2 \over \mu^2}+{17 \over 6}) \cr
&a_{4}-a_{13}=-{1 \over 16 \pi^2}{1 \over 12}(C_{\epsilon}-\log{M_{H}^2
\over \mu^2} + {17 \over 6}) \cr
&a_{5}+a_{13}={v^2 \over 8 M_{H}^2} -{1 \over 16 \pi^2}{1 \over
24}(C_{\epsilon}-\log{M_{H}^2
\over \mu^2} - {27 \pi \over {2 \sqrt{3}}} + {79 \over 3}) \cr
&a_{6}-a_{13}=a_{7}+a_{13}=a_{9}=a_{10}=0 \cr}\eqno(5.12)$$ %
To determine $a_4$ to $a_7$ and $a_{10}$ we have used the Equivalence
Theorem [2,20-21]. See also [22].

These values basically, but not quite, agree with those obtained in
[19]. As we have discussed in this section we cannot determine
with two, three and four point
gauge Green functions
alone
the values of all coefficients $a_i$
in the effective chiral lagrangian. For
instance $a_1$, $a_8$ and $a_{13}$
always appears in the combinations $a_1+a_{13}$ and $a_8+a_{13}$
while $a_{11}$ and $a_{12}$ drop from all transverse structures
in the Green functions considered. Note that in the evaluation
of the functional integral at the order we are working it is
legitimate to use the equations of motion for the $\pi$ fields coming from
the ${\cal O}(p^2)$ operators in the ${\cal
O}(p^4)$ terms and, if so, ${\cal L}_{11}$ and  ${\cal L}_{12}$ vanish,
and
${\cal L}_{13}$ does not provide new independent structures, so things
really are as they should.
\bigskip

\line{\bf 6. Oblique Corrections\hfil}
\medskip\noindent
Although we are not able to determine with gauge Green
functions alone all
coefficients but only some combinations of them, these are precisely the
ones that enter the physical observables. For instance, we may
choose to parametrize possible departures from the Standard Model
predictions in terms of the quantities $\epsilon_1$, $\epsilon_2$
and $\epsilon_3$[23] (or $S$,$T$,$U$ [24]). Then, the contribution to
these quantities from the operators ${\cal L}_i^\prime$ s are
%
$$2a_{0}\to \epsilon_1 \qquad -g^2 (a_{8}+a_{13})\to\epsilon_2
\qquad -g^2 (a_{1}+a_{13})\to \epsilon_3\eqno(6.1)$$
%
One way to proceed is to parametrize the `universal' part of
the radiative corrections in terms of the $\epsilon_i$ (basically
combinations of self-energies) and use the experimental data
to set constraints on them. In the SM each of the $\epsilon_i$ takes a
well defined value and depends logarithmically on the top-quark mass.
Beyond the Standard model, the Effective Chiral Lagrangian is
non-renormalizable theory and some cut-off effects remain. The latter
can be traced using (5.2) and (6.1) and we can form
combinations that are cut-off independent, at least at the one loop
level.

We prefer however to set the discussion in terms of quantities which
are directly observable. LEP basically measures two quantities of
relevance in the present
discussion, namely the effective mixing angle $\bar{s}_w$, extracted
from the forward-backward asymmetry $A_{FB}$ through
%
$$ \bar{s}^2_w= {1\over 4}(1-g_{V}/g_{A})    \qquad     A_{FB}=
{3 \over 4}\left( {2 g_{V } g_{A } \over g_{V }^2+g_{A }^2}
\right)^2
\eqno(6.2) $$
%
and the
leptonic width
%
$$ \Gamma_l = {G_{F} M_{Z}^3 \over 6 \sqrt{2} \pi}(g_{V}^2+g_{A}^2)
\left ( 1+ {3 \over 4} {\alpha \over \pi} \right)
\eqno(6.3)$$ %
$\Gamma_l$ is proportional to $\rho_Z$. $\rho_Z$
parametrizes
the strength of the neutral current at $s=M_Z^2$ in the improved
Born approximation (at tree level $\rho_Z= 1$). In this sense is
the counterpart of the
more familiar $\rho$ parameter (defined at $s=0$)
%
$${\cal A}^{NC}(s=M_{Z}^2)= \rho_{Z} \sqrt{2} G_{F} M_{Z}^2 {{J_{\mu}
J^{\mu}
} \over {{s - M_{Z}^2+ i {s \over M_{Z}^2} M_{Z} \Gamma_{Z}}}}
\qquad
{\cal A}^{NC}(s=0)=- \rho \sqrt{2} G_{F}  J_{\mu} J^{\mu}
\eqno (6.4)$$
 %
 The  experimental data [5], assuming lepton universality
and correcting for the $\tau$ mass, gives
$A_{FB} = 0.0170 \pm 0.0016   $, $\Gamma_l= 83.98 \pm 0.18$ MeV,
which translates
into $g_{A}^2=0.25123 \pm 0.00056$, $g_{V}^2=0.00144 \pm 0.00014$
and $\bar{s}^2_W= 0.23107 \pm 0.00092$.
Given $m_{top}$ and $M_H$, the
SM value is just a dot in the
($\bar{s}^2_w,\Gamma_l$) plane.
In any effective theory we
have instead a line of points obtained by varying the (unknown) value
of the cut-off.
While we are unsure what value to
take for it, the line itself is unambiguously predicted
by one-loop chiral
perturbation theory, independently of the regulator one
uses[7]. Finding out which self-energies contribute
to $g_A, g_V$ we see that, in agreement with [4],
at the one loop level, we are sensitive to only
one combination of coefficients in the Effective Chiral Lagrangian,
namely
%
$$ L= -{2 \over 9} c_{w}^2 a_{0} + g^2 s_{w}^2 (a_{1}+a_{13})
+g^2 c_{w}^2 (a_{8}+a_{13})
\eqno(6.5)$$ %
{}From (5.11-12), in the Standard Model $L=0$[4].

With a relatively heavy top, such as
the one preliminarily reported in [25], $m_{top}=174 \pm
10^{+13}_{-12}$ GeV) some two-loop corrections are known to be
important.
Sizeable
contributions originate from a few genuine two-loop diagrams
that yield a $m_{top}^4$ dependence[26] and from the iteration of one
loop corrections through resummed propagators. The former, although
not negligible, give a small contribution for our purposes.
We have examined the contribution from the Effective Chiral
Lagrangian to the resummed propagators checking that $a_{11}$,
$a_{12}$ and $a_{13}$ still drop from the observables. Notice
that with a two loop precision we are not entitled to appeal to
the equations of motion derived from the ${\cal O}(p^2)$ terms. The
set of points obtained by varying $\log M_H$ (or $\Lambda$ in the
effective theory) is no longer a straight line, but deviations
are really not perceptible.

The results are shown in fig. 2.
We have plotted in addition of
$L=0$ (the value in the Minimal Standard Model) lines for the
values
$L= -{e^2 / 12 \pi^2}$ and $L=-{e^2 / 6 \pi^2}$. These
correspond to theoretical estimates[27] for $L$ in one-generation
technicolor models
with $N_{TC}=2, 4$, respectively. The same estimates in QCD
would give values  which are  between 30\% and 40\% below the
experimental results,
so we regard those as {\it lower bounds}. (A fact that can be rigorously
established in the large $N_{TC}$ limit.)
These lines do not agree in slope
with the one presented in [28].

Unless one is willing to make somewhat uncertain extrapolations
from QCD, the model with $N_{TC}=4$ and one full generation
of technifermions is not quite excluded at the
99\% confidence level, a conclusion that somehow runs contrary
to a widespread belief. A model with $N_{TC}=2$ falls within
the 68\% c.l. boundary. Even allowing for somewhat larger
values for $L$ it is hard to convincingly exclude this
model at this point.


In conclusion, we have revised thoroughly the procedure by means
of which one determines the coefficients in an Effective Chiral
Lagrangian that reproduce the Standard Model in the large
$M_H$ limit. We have pointed out a number of subtleties regarding
gauge invariance, commutation of limits and the precise
formulation of the matching conditions. At the end, we can
determine all experimentally relevant coefficients (but not
{\it all} coefficients). We have included the leading two loop
corrections to take a fresh look at the issue whether LEP
data really excludes technicolor models or not with the current
level of precision and the preliminary determination
of $m_{top}$.

\beginsection{\bf 8. Acknowledgements}

 We thank M.J.Herrero and H.Leutwyler for discussions that have
 triggered different parts of this work. The thank very specially
M.Martinez who has helped us in the analysis of the experimental data.
We acknowledge the financial support from CICYT grant AEN93-0695 and
CEE grant CHRX CT93 0343. J.M. acknowledges a fellowship from Ministerio
 de Educacion y Ciencia. D.E. would like to thank C.Garcia-Canal and
the Theory Group at Universidad de La Plata for
 the hospitality extended to him.

\beginsection{\bf References}

 \item{[1] }{
T.Appelquist and C.Bernard, Phys. Rev. D22 (1980) 200;
A.Longhitano, Phys. Rev. D22 (1980) 1166;
A. Longhitano, Nucl. Phys. B188 (1981) 118}
\item{[2] }{ M. Chanowitz and M.K. Gaillard, Nucl. Phys. B261 (1985)
379;  G.J. Gounaris, R. Kogerler and H. Neufeld, Phys. Rev. D34 (1986)
3257;
M. Chanowitz, M. Golden and H.Georgi, Phys.Rev. D36 (1987) 1490;
O.Cheyette and M.K.Gaillard, Phys. Lett B197 (1987) 205;
Y.P.Yao and C.P.Yuan, Phys. Rev. D38 (1988) 2237;
H.Veltman, Phys. Rev. D41 (1990) 2294
}
\item{[3] }{R. Renken and M.Peskin, Nucl. Phys. B211 (1983)
93; T.Appelquist, T. Takeuchi, M. Einhorn and L.C.R.
Wijewardhana,
Phys. Lett. B 232 (1989) 211;
A.Dobado and M.J.Herrero, Phys.Lett. B228 (1989) 495; J.F.Donoghue and
C.Ramirez, Phys. Lett. B234 (1990) 361;
B.Holdom and J.Terning, Phys. Lett. B247 (1990) 88;
A.Dobado and M.J.Herrero and J.Terron, Z.Phys. C50 (1991) 205, 465;
S.Dawson and G.Valencia, Nucl.Phys. B352 (1991) 27;
 M.Golden and L.Randall, Nucl. Phys. B361 (1991) 3;
T. Appelquist and G. Triantaphyllou, Phys. Lett. B278 (1992) 345;
J.Bagger, S.Dawson and G.Valencia, Fermilab-Pub-92/75-T,1992;
T. Appelquist and G-H. Wu, Phys.Rev.D 48 (1993) 3235}

\item{[4] }{A.Dobado, D.Espriu and M.J. Herrero, Phys. Lett. B255
(1991) 405}

\item{[5] }{Internal Note LEPEWWG/94-01 ALEPH 94-74 PHYSIC
94-63,DELPHI 94-33 PHYS 364 L3 Note 1599, OPAL Technical Note TN235 ,
May (1994)}
\item{[6] }{R.Haag , Phys. Rev. 112 (1958) 669;S.Coleman, J.Wess and
B.Zumino, Phys.Rev.177 (1969) 2239;C.G.Callan, S Coleman,
J.Wess and B.Zumino, Phys.Rev. 177 (1969) 2247}
\item{[7] }{D. Espriu and J.Matias, Nucl. Phys. B 418 (1994) 494}
\item{[8] }{J.Honerkamp and K.Meetz, Phys. Rev. D3 (1971) 1996;
G.Ecker and J.Honerkamp, Nucl. Phys. B 35(1971) 481;  52(1973) 211;
62 (1973) 509; T. Appelquist and C.Bernard, Phys. Rev D 23 (1981) 425}
\item{[9] }{G. Burgers and W. Hollik, in Polarization at LEP, CERN
Yellow Report, ed. G. Alexander et al. (CERN, Geneva, 1988);
M.Consoli and W.Hollik , in Z Physics at LEP1,
CERN Yellow Report, ed. G.Altarelli et al. (CERN, Geneva, 1989)
G.Burgers and F.Jegerlehner, ibid}
\item{[10]}{M.Bohm,H.Spiesberger and W.Hollik, Fortschr. Phys. 34
(1986) 687}
\item{[11]}{W.J.Marciano and A.Sirlin, Phys.Rev. D22 (1980)
2695, J.Fleischer and  F.Jegerlehner Nucl.Phys. B 228 (1983) 1}
\item{[12]}{K.I.Aoki, Z.Hioki,R.Kawabe,M.Konuma and T.Muta, Suppl. of
the Progress of Theoretical Physics 73 (1982) 1}
\item{[13]}{G. Degrassi and A.Sirlin, Nucl.Phys. B352 (1991) 342; P.Gambino and
Phys.Rev. D49 (1994) 1160}
\item{[14]}{
B.Ovrut and H.Schnitzer,Phys. Rev. D21 (1980) 3369;
Phys. Rev. D22 (1980) 2518;
Phys. Rev. D24 (1981) 1695 and references therein}
\item{[15]}{D. Espriu and M.J. Herrero,
Nucl. Phys. B 373 (1992) 117}
\item{[16]}{M.J.Herrero and E.R. Morales, Phys.Lett. B296 (1992) 397}
\item{[17]}{H.Georgi, in Proc. of the Workshop on Effective
Field Theories of the S.M., Dobogoko, Hungary, August 1991 (ed. U-G.
Meissner, World Scientific);
H.Georgi, L.Kaplan and D.Morin , Phys.Rev. D49 (1994) 2457}
\item{[18]}{F.Feruglio in Lectures at the $2^{nd}$ NATO Seminar,
Parma, Univ. di Padova (1992) DFPD92-TH-/50}
\item{[19]}{M.J.Herrero and E.R.Morales, Nucl.Phys. B418 (1994) 431}
\item{[20]}{A. Dobado and J.R. Pelaez  Preprint SU-ITP-93-33 (to be
published in NPB) and Phys.Lett. B329 (1994) 469; D. Espriu
and J. Matias, in preparation}
\item{[21]}{M.J.G. Veltman and F.J.Yndurain, Nucl.Phys. B325 (1989) 1;
S. Dawson and S. Willenbrock, Phys. Rev. Lett. 62 (1989) 1232}
\item{[22]}{M.J.Herrero and E.R.Morales, Preprint Universidad Autonoma
de Madrid, (1994) FTUAM 94/11 and FTUAM 94/12}
\item{[23]}{G.Altarelli and R.Barbieri, Phys. Lett. B253 (1991) 161;
G.Altarelli and R.Barbieri and S.Jadach, Nucl.Phys. B369 (1992) 3}
\item{[24]}{ M.Peskin and T.Takeuchi, Phys. Rev. Lett. 65 (1990) 964}
\item{[25]}{F.Abe et al. The CDF Collaboration FERMILAB Pub-94/097-E
CDF}
\item{[26]}{R. Barbieri et al., Phys. Lett. B288 (1992) 95;
J. Fleischer, O.V. Tarasov and F.Jegerlehner, Phys. Lett. B319 (1993) 249}
\item{[27]}{D.Espriu, E. de Rafael and J.Taron, Nucl.Phys.
B345 (1990) 22}
\item{[28]}{D.Buskulic et al.,The ALEPH Collaboration, Z.Phys. C60 (1993) 71}

 \vfill
\eject








\vfill\eject



\beginsection{\bf Figure Captions}

\bigskip\bigskip
\item{\bf Fig. 1.-} {a) One-Particle-Irreducible diagrams
that enter the $W^{+} W^{-} Z$ (or $A$) vertex. b)
Reducible
diagrams that restore the equality of the connected gauge
Green functions, as discussed in the text.}
\medskip
\item{\bf Fig. 2.- } {Plot of $\Gamma_l$, the leptonic width, versus the
effective mixing angle $\bar{s}^2_w$ for
 $m_{top}=174 \pm 10$ Gev and
100 GeV $\ge M_H \le$ 1500 Gev in the Minimal Standard Model (solid
line). The leading
two-loop corrections have been included. The dashed line (A)
corresponds to the same quantity (again including the leading two-loop
corrections) calculated in an Effective Lagrangian for $m_{top}=174$.
The agreement is
exact when $M_H\to \infty$. We then modify the coefficients of the
Effective Chiral Lagrangian to include QCD-like models for the
symmetry breaking sector with $N_{TC}\times N_D=$ 8 (B) and
16 (C). The values chosen correspond to theoretical
calculations that are really lower bounds in vector-like
models.
The elipsis corresponds to the experimental data with 68\% and
99\% C.L. The one-loop SM results are also shown (dotted line).}

\medskip
\vfill\eject

\bye


%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%%%%%%                                                      %%%%%%%%
%%%%%%              First postscript file                   %%%%%%%%
%%%%%%                                                      %%%%%%%%
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%


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Mistroke
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Mfstroke
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Mfstroke
P
P
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closepath
clip
newpath
% End of Graphics
MathPictureEnd
end
showpage

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S 2716 3791 M 2731 3798 D 2745 3798 D 2781 3784 D S 2809 3805 M 2809
3784 D 2802 3762 D 2774 3726 D 2766 3712 D 2759 3691 D 2759 3655 D S
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M 2916 3655 D S 2924 3805 M 2924 3655 D S 2924 3805 M 2845 3698 D 2959
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D 3621 3798 D 3606 3805 D S 3942 3784 M 3949 3762 D 3949 3805 D 3942
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2610 D 4924 2617 D 4938 2617 D 4960 2610 D 4967 2596 D 4967 2517 D S
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D S 4860 2517 M 4910 2517 D S 4938 2517 M 4988 2517 D S 5231 2696 M 5217
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2503 D 5217 2481 D 5231 2467 D S 5217 2681 M 5202 2653 D 5195 2631 D
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2517 D S 5367 2517 M 5417 2517 D S 5460 2574 M 5545 2574 D 5545 2588 D
5538 2603 D 5531 2610 D 5517 2617 D 5495 2617 D 5474 2610 D 5460 2596 D
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5531 2524 D 5545 2538 D S 5538 2574 M 5538 2596 D 5531 2610 D S 5495
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2524 D 5495 2517 D S 5588 2667 M 5638 2517 D S 5595 2667 M 5638 2538 D S
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5781 2567 D 5774 2531 D 5760 2503 D 5745 2481 D 5731 2467 D S 5745 2681
M 5760 2653 D 5767 2631 D 5774 2596 D 5774 2567 D 5767 2531 D 5760 2510
D 5745 2481 D S 2506 8484 M 2449 8334 D S 2506 8463 M 2456 8334 D 2449
8334 D S 2506 8463 M 2556 8334 D 2564 8334 D S 2506 8484 M 2564 8334 D S
2471 8377 M 2542 8377 D S 2464 8370 M 2549 8370 D S 3551 8484 M 3551
8334 D S 3558 8484 M 3558 8334 D S 3529 8484 M 3615 8484 D 3636 8477 D
3644 8470 D 3651 8455 D 3651 8441 D 3644 8427 D 3636 8420 D 3615 8413 D
S 3615 8484 M 3629 8477 D 3636 8470 D 3644 8455 D 3644 8441 D 3636 8427
D 3629 8420 D 3615 8413 D S 3558 8413 M 3615 8413 D 3636 8405 D 3644
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8334 D S 3615 8413 M 3629 8405 D 3636 8398 D 3644 8384 D 3644 8363 D
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D 4888 8463 D 4874 8477 D 4853 8484 D 4838 8484 D 4817 8477 D 4803 8463
D 4796 8448 D 4788 8427 D 4788 8391 D 4796 8370 D 4803 8355 D 4817 8341
D 4838 8334 D 4853 8334 D 4874 8341 D 4888 8355 D 4896 8370 D S 4838
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8370 D 4810 8355 D 4824 8341 D 4838 8334 D S 3172 3744 M 3172 3807 D S
3141 3775 M 3210 3775 D S 2452 3340 M 7360 3340 D S 2452 3340 M 2452
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2202 3124 D 2216 3117 D 2238 3117 D 2259 3124 D 2273 3131 D 2281 3145 D
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D S 2209 3174 M 2202 3159 D 2202 3131 D 2209 3124 D S 2202 3124 M 2223
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2266 3181 D S 2273 3181 M 2245 3188 D S 2231 3188 M 2216 3174 D 2209
3159 D 2209 3131 D 2216 3117 D S 2238 3117 M 2252 3124 D 2259 3131 D
2266 3145 D 2266 3174 D 2259 3188 D S 2216 3117 M 2188 3109 D 2173 3095
D 2166 3081 D 2166 3059 D 2173 3045 D 2195 3038 D 2223 3038 D 2252 3045
D 2259 3052 D 2266 3067 D 2266 3088 D 2259 3102 D 2252 3109 D 2238 3117
D S 2223 3117 M 2188 3109 D S 2195 3109 M 2181 3095 D 2173 3081 D 2173
3059 D 2181 3045 D S 2173 3045 M 2209 3038 D 2252 3045 D S 2252 3052 M
2259 3067 D 2259 3088 D 2252 3102 D S 2252 3109 M 2231 3117 D S 2216
3117 M 2202 3109 D 2188 3095 D 2181 3081 D 2181 3059 D 2188 3045 D 2195
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D 2423 3181 D 2431 3167 D 2431 3152 D 2423 3138 D 2416 3131 D 2402 3124
D 2381 3117 D S 2416 3181 M 2423 3167 D 2423 3152 D 2416 3138 D 2409
3131 D S 2402 3188 M 2409 3181 D 2416 3167 D 2416 3152 D 2409 3138 D
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D 2416 3088 D 2416 3067 D 2409 3052 D 2395 3045 D 2373 3038 D 2352 3038
D 2331 3045 D 2323 3052 D 2316 3067 D 2316 3081 D 2331 3081 D 2331 3067
D 2323 3067 D 2323 3074 D S 2402 3102 M 2409 3088 D 2409 3067 D 2402
3052 D S 2381 3117 M 2395 3109 D 2402 3095 D 2402 3067 D 2395 3052 D
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D 2481 3038 D 2488 3045 D 2488 3052 D 2481 3059 D 2473 3059 D S 2473
3052 M 2473 3045 D 2481 3045 D 2481 3052 D 2473 3052 D S 2595 3188 M
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3174 M 2623 3174 D 2652 3181 D 2666 3188 D S 2559 3117 M 2566 3124 D
2588 3131 D 2609 3131 D 2631 3124 D 2638 3117 D 2645 3102 D 2645 3081 D
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2545 3067 D 2545 3081 D 2559 3081 D 2559 3067 D 2552 3067 D 2552 3074 D
S 2631 3117 M 2638 3102 D 2638 3081 D 2631 3059 D 2616 3045 D S 2609
3131 M 2623 3124 D 2631 3109 D 2631 3081 D 2623 3059 D 2609 3045 D 2595
3038 D S 2898 3340 M 2898 3265 D S 3344 3340 M 3344 3265 D S 3790 3340 M
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D 3540 3124 D 3554 3117 D 3576 3117 D 3597 3124 D 3611 3131 D 3619 3145
D 3619 3167 D 3611 3181 D 3597 3188 D 3569 3188 D S 3583 3188 M 3547
3181 D S 3547 3174 M 3540 3159 D 3540 3131 D 3547 3124 D S 3540 3124 M
3561 3117 D S 3569 3117 M 3597 3124 D S 3604 3131 M 3611 3145 D 3611
3167 D 3604 3181 D S 3611 3181 M 3583 3188 D S 3569 3188 M 3554 3174 D
3547 3159 D 3547 3131 D 3554 3117 D S 3576 3117 M 3590 3124 D 3597 3131
D 3604 3145 D 3604 3174 D 3597 3188 D S 3554 3117 M 3526 3109 D 3511
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3045 D 3597 3052 D 3604 3067 D 3604 3088 D 3597 3102 D 3590 3109 D 3576
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3052 M 3597 3067 D 3597 3088 D 3590 3102 D S 3590 3109 M 3569 3117 D S
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3533 3038 D S 3561 3038 M 3576 3045 D 3583 3052 D 3590 3067 D 3590 3095
D 3583 3109 D 3576 3117 D S 3690 3152 M 3690 3159 D 3697 3159 D 3697
3145 D 3683 3145 D 3683 3159 D 3690 3174 D 3697 3181 D 3719 3188 D 3740
3188 D 3761 3181 D 3769 3167 D 3769 3152 D 3761 3138 D 3754 3131 D 3740
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D 3733 3124 D 3719 3117 D S 3704 3117 M 3719 3117 D 3740 3109 D 3747
3102 D 3754 3088 D 3754 3067 D 3747 3052 D 3733 3045 D 3711 3038 D 3690
3038 D 3669 3045 D 3661 3052 D 3654 3067 D 3654 3081 D 3669 3081 D 3669
3067 D 3661 3067 D 3661 3074 D S 3740 3102 M 3747 3088 D 3747 3067 D
3740 3052 D S 3719 3117 M 3733 3109 D 3740 3095 D 3740 3067 D 3733 3052
D 3726 3045 D 3711 3038 D S 3811 3059 M 3804 3052 D 3804 3045 D 3811
3038 D 3819 3038 D 3826 3045 D 3826 3052 D 3819 3059 D 3811 3059 D S
3811 3052 M 3811 3045 D 3819 3045 D 3819 3052 D 3811 3052 D S 3947 3188
M 3926 3181 D 3919 3174 D 3911 3159 D 3911 3138 D 3919 3124 D 3933 3117
D 3954 3117 D 3976 3124 D 3990 3131 D 3997 3145 D 3997 3167 D 3990 3181
D 3976 3188 D 3947 3188 D S 3961 3188 M 3926 3181 D S 3926 3174 M 3919
3159 D 3919 3131 D 3926 3124 D S 3919 3124 M 3940 3117 D S 3947 3117 M
3976 3124 D S 3983 3131 M 3990 3145 D 3990 3167 D 3983 3181 D S 3990
3181 M 3961 3188 D S 3947 3188 M 3933 3174 D 3926 3159 D 3926 3131 D
3933 3117 D S 3954 3117 M 3969 3124 D 3976 3131 D 3983 3145 D 3983 3174
D 3976 3188 D S 3933 3117 M 3904 3109 D 3890 3095 D 3883 3081 D 3883
3059 D 3890 3045 D 3911 3038 D 3940 3038 D 3969 3045 D 3976 3052 D 3983
3067 D 3983 3088 D 3976 3102 D 3969 3109 D 3954 3117 D S 3940 3117 M
3904 3109 D S 3911 3109 M 3897 3095 D 3890 3081 D 3890 3059 D 3897 3045
D S 3890 3045 M 3926 3038 D 3969 3045 D S 3969 3052 M 3976 3067 D 3976
3088 D 3969 3102 D S 3969 3109 M 3947 3117 D S 3933 3117 M 3919 3109 D
3904 3095 D 3897 3081 D 3897 3059 D 3904 3045 D 3911 3038 D S 3940 3038
M 3954 3045 D 3961 3052 D 3969 3067 D 3969 3095 D 3961 3109 D 3954 3117
D S 4236 3340 M 4236 3265 D S 4683 3340 M 4683 3265 D S 5129 3340 M 5129
3228 D S 4908 3188 M 4886 3181 D 4879 3174 D 4872 3159 D 4872 3138 D
4879 3124 D 4893 3117 D 4915 3117 D 4936 3124 D 4950 3131 D 4958 3145 D
4958 3167 D 4950 3181 D 4936 3188 D 4908 3188 D S 4922 3188 M 4886 3181
D S 4886 3174 M 4879 3159 D 4879 3131 D 4886 3124 D S 4879 3124 M 4900
3117 D S 4908 3117 M 4936 3124 D S 4943 3131 M 4950 3145 D 4950 3167 D
4943 3181 D S 4950 3181 M 4922 3188 D S 4908 3188 M 4893 3174 D 4886
3159 D 4886 3131 D 4893 3117 D S 4915 3117 M 4929 3124 D 4936 3131 D
4943 3145 D 4943 3174 D 4936 3188 D S 4893 3117 M 4865 3109 D 4850 3095
D 4843 3081 D 4843 3059 D 4850 3045 D 4872 3038 D 4900 3038 D 4929 3045
D 4936 3052 D 4943 3067 D 4943 3088 D 4936 3102 D 4929 3109 D 4915 3117
D S 4900 3117 M 4865 3109 D S 4872 3109 M 4858 3095 D 4850 3081 D 4850
3059 D 4858 3045 D S 4850 3045 M 4886 3038 D 4929 3045 D S 4929 3052 M
4936 3067 D 4936 3088 D 4929 3102 D S 4929 3109 M 4908 3117 D S 4893
3117 M 4879 3109 D 4865 3095 D 4858 3081 D 4858 3059 D 4865 3045 D 4872
3038 D S 4900 3038 M 4915 3045 D 4922 3052 D 4929 3067 D 4929 3095 D
4922 3109 D 4915 3117 D S 5086 3159 M 5050 3038 D 5065 3038 D S 5108
3188 M 5093 3159 D 5058 3038 D S 5108 3188 M 5065 3038 D S 5108 3188 M
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D 5158 3038 D 5165 3045 D 5165 3052 D 5158 3059 D 5150 3059 D S 5150
3052 M 5150 3045 D 5158 3045 D 5158 3052 D 5150 3052 D S 5293 3159 M
5258 3038 D 5272 3038 D S 5315 3188 M 5300 3159 D 5265 3038 D S 5315
3188 M 5272 3038 D S 5315 3188 M 5293 3167 D 5272 3152 D 5258 3145 D S
5293 3159 M 5279 3152 D 5258 3145 D S 5575 3340 M 5575 3265 D S 6021
3340 M 6021 3265 D S 6468 3340 M 6468 3228 D S 6247 3188 M 6225 3181 D
6218 3174 D 6211 3159 D 6211 3138 D 6218 3124 D 6232 3117 D 6254 3117 D
6275 3124 D 6289 3131 D 6297 3145 D 6297 3167 D 6289 3181 D 6275 3188 D
6247 3188 D S 6261 3188 M 6225 3181 D S 6225 3174 M 6218 3159 D 6218
3131 D 6225 3124 D S 6218 3124 M 6239 3117 D S 6247 3117 M 6275 3124 D S
6282 3131 M 6289 3145 D 6289 3167 D 6282 3181 D S 6289 3181 M 6261 3188
D S 6247 3188 M 6232 3174 D 6225 3159 D 6225 3131 D 6232 3117 D S 6254
3117 M 6268 3124 D 6275 3131 D 6282 3145 D 6282 3174 D 6275 3188 D S
6232 3117 M 6204 3109 D 6189 3095 D 6182 3081 D 6182 3059 D 6189 3045 D
6211 3038 D 6239 3038 D 6268 3045 D 6275 3052 D 6282 3067 D 6282 3088 D
6275 3102 D 6268 3109 D 6254 3117 D S 6239 3117 M 6204 3109 D S 6211
3109 M 6197 3095 D 6189 3081 D 6189 3059 D 6197 3045 D S 6189 3045 M
6225 3038 D 6268 3045 D S 6268 3052 M 6275 3067 D 6275 3088 D 6268 3102
D S 6268 3109 M 6247 3117 D S 6232 3117 M 6218 3109 D 6204 3095 D 6197
3081 D 6197 3059 D 6204 3045 D 6211 3038 D S 6239 3038 M 6254 3045 D
6261 3052 D 6268 3067 D 6268 3095 D 6261 3109 D 6254 3117 D S 6425 3159
M 6389 3038 D 6404 3038 D S 6447 3188 M 6432 3159 D 6397 3038 D S 6447
3188 M 6404 3038 D S 6447 3188 M 6332 3081 D 6447 3081 D S 6489 3059 M
6482 3052 D 6482 3045 D 6489 3038 D 6497 3038 D 6504 3045 D 6504 3052 D
6497 3059 D 6489 3059 D S 6489 3052 M 6489 3045 D 6497 3045 D 6497 3052
D 6489 3052 D S 6654 3159 M 6618 3038 D 6632 3038 D S 6675 3188 M 6661
3159 D 6625 3038 D S 6675 3188 M 6632 3038 D S 6675 3188 M 6561 3081 D
6675 3081 D S 6914 3340 M 6914 3265 D S 7360 3340 M 7360 3265 D S 1760
3704 M 1760 8940 D S 1760 3704 M 1648 3704 D S 944 3779 M 922 3772 D 908
3758 D 894 3736 D 887 3715 D 879 3686 D 879 3665 D 887 3643 D 894 3636 D
908 3629 D 922 3629 D 944 3636 D 958 3650 D 972 3672 D 979 3693 D 987
3722 D 987 3743 D 979 3765 D 972 3772 D 958 3779 D 944 3779 D S 922 3765
M 908 3750 D 901 3736 D 894 3715 D 887 3686 D 887 3658 D 894 3643 D S
944 3643 M 958 3658 D 965 3672 D 972 3693 D 979 3722 D 979 3750 D 972
3765 D S 944 3779 M 929 3772 D 915 3750 D 908 3736 D 901 3715 D 894 3686
D 894 3650 D 901 3636 D 908 3629 D S 922 3629 M 937 3636 D 951 3658 D
958 3672 D 965 3693 D 972 3722 D 972 3758 D 965 3772 D 958 3779 D S 1029
3650 M 1022 3643 D 1022 3636 D 1029 3629 D 1037 3629 D 1044 3636 D 1044
3643 D 1037 3650 D 1029 3650 D S 1029 3643 M 1029 3636 D 1037 3636 D
1037 3643 D 1029 3643 D S 1137 3743 M 1137 3750 D 1144 3750 D 1144 3736
D 1129 3736 D 1129 3750 D 1137 3765 D 1144 3772 D 1165 3779 D 1187 3779
D 1208 3772 D 1215 3758 D 1215 3743 D 1208 3729 D 1194 3715 D 1122 3672
D 1108 3658 D 1094 3629 D S 1201 3772 M 1208 3758 D 1208 3743 D 1201
3729 D 1187 3715 D 1165 3700 D S 1187 3779 M 1194 3772 D 1201 3758 D
1201 3743 D 1194 3729 D 1179 3715 D 1122 3672 D S 1101 3643 M 1108 3650
D 1122 3650 D 1158 3643 D 1194 3643 D 1201 3650 D S 1122 3650 M 1158
3636 D 1194 3636 D S 1122 3650 M 1158 3629 D 1179 3629 D 1194 3636 D
1201 3650 D 1201 3658 D S 1287 3743 M 1287 3750 D 1294 3750 D 1294 3736
D 1279 3736 D 1279 3750 D 1287 3765 D 1294 3772 D 1315 3779 D 1337 3779
D 1358 3772 D 1365 3758 D 1365 3743 D 1358 3729 D 1344 3715 D 1272 3672
D 1258 3658 D 1244 3629 D S 1351 3772 M 1358 3758 D 1358 3743 D 1351
3729 D 1337 3715 D 1315 3700 D S 1337 3779 M 1344 3772 D 1351 3758 D
1351 3743 D 1344 3729 D 1329 3715 D 1272 3672 D S 1251 3643 M 1258 3650
D 1272 3650 D 1308 3643 D 1344 3643 D 1351 3650 D S 1272 3650 M 1308
3636 D 1344 3636 D S 1272 3650 M 1308 3629 D 1329 3629 D 1344 3636 D
1351 3650 D 1351 3658 D S 1465 3779 M 1444 3772 D 1437 3765 D 1429 3750
D 1429 3729 D 1437 3715 D 1451 3708 D 1472 3708 D 1494 3715 D 1508 3722
D 1515 3736 D 1515 3758 D 1508 3772 D 1494 3779 D 1465 3779 D S 1479
3779 M 1444 3772 D S 1444 3765 M 1437 3750 D 1437 3722 D 1444 3715 D S
1437 3715 M 1458 3708 D S 1465 3708 M 1494 3715 D S 1501 3722 M 1508
3736 D 1508 3758 D 1501 3772 D S 1508 3772 M 1479 3779 D S 1465 3779 M
1451 3765 D 1444 3750 D 1444 3722 D 1451 3708 D S 1472 3708 M 1487 3715
D 1494 3722 D 1501 3736 D 1501 3765 D 1494 3779 D S 1451 3708 M 1422
3700 D 1408 3686 D 1401 3672 D 1401 3650 D 1408 3636 D 1429 3629 D 1458
3629 D 1487 3636 D 1494 3643 D 1501 3658 D 1501 3679 D 1494 3693 D 1487
3700 D 1472 3708 D S 1458 3708 M 1422 3700 D S 1429 3700 M 1415 3686 D
1408 3672 D 1408 3650 D 1415 3636 D S 1408 3636 M 1444 3629 D 1487 3636
D S 1487 3643 M 1494 3658 D 1494 3679 D 1487 3693 D S 1487 3700 M 1465
3708 D S 1451 3708 M 1437 3700 D 1422 3686 D 1415 3672 D 1415 3650 D
1422 3636 D 1429 3629 D S 1458 3629 M 1472 3636 D 1479 3643 D 1487 3658
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