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\begin{document}

\rightline{KFA-IKP(TH)-97-12}

\title{The BFKL-Regge Expansion\\
 for the Proton Structure Function \\
at Small $x$}
\author{Vladimir  R. Zoller}
\address{Institute for Theoretical and Experimental Physics\\
 117218 Moscow, Russia {\thanks  
{Talk at 5th International Workshop on Deep Inelastic Scattering
and QCD (DIS'97), Chicago, April 1997}}}



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\maketitle


\begin{abstract}
We report an evaluation of 
  subleading eigenvalues 
 and eigenfunctions
of the BFKL equation in the color dipole representation
with a running gauge coupling.
We present an expansion of the  small-$x$ proton structure function $F_{2p}(x,Q^2)$
  in terms of
the  rightmost BFKL-singularities.
The  BFKL-Regge 
 phenomenology of  DIS structure functions 
 is developed
which is shown to provide remarkably good
description of the data on  
 $F_{2p}(x,Q^2)$ from E665 to HERA.

\end{abstract}
\vspace{-0.8cm} 

\subsection*{Introduction}
  In this talk I address  the issue 
 of extrapolation of the proton structure functions
to a domain of very small $x$ from the attainable 
kinematical region of 
 $x$ and $Q^2$. So, this is an old problem 
  of predicting  the future from the known past.
The standard predictor
 is the  GLDAP 
 evolution
equation \cite{GRIB72}.
However, the art of predicting is difficult.  
The  numerous 
pre-HERA  GLDAP fits to the proton structure functions 
 are
equally good for large-$x$-data but seldom come close to the
new data points at smaller $x$. The lack of 
predictive power is not surprising and we comment on this point below.
 It is well known that the 
GLDAP evolution breaks down at small $x$ and  is superseded
by the $\log(1/x)$-BFKL-evolution \cite{LIPAT76}. Contrary to the 
GLDAP approach, the BFKL evolution  predicts uniquely 
 the proton structure functions at 
an arbitrarily small $x$  from   the  input
 at a starting point  $x=x_0$.
 DIS structure functions at 
asymptotically large $1/x$
are dominated by the rightmost Regge-singularity
with the intercept $\Delta_0$ \cite{LIPAT86}  
 and
\begin{equation} 
F_{2p}(x,Q^2) = F_2^{(0)}(Q^2)\left(1\over x\right)^{\Delta_0}\,. \label{eq:F20}
\end{equation}
At moderate $x$, however,  the  subleading contributions 
 to $F_{2p}(x,Q^2)$ 
with smaller intercepts $\Delta_1, \Delta_2,...$
can not be neglected.  The task of my talk is to present
an evaluation of the intercepts $\Delta_n$, the pomeron
 trajectory slopes
$\alpha_n^{\prime}$
and the corresponding structure functions $F_2^{n}(Q^2)$,
to arrive finally at the representation 
\begin{equation}
F_{2p}(x,Q^2) =\sum_n  
A_nF_2^{(n)}(Q^2)\left({x_0\over x}\right)^{\Delta_n}\,. \label{eq:REGGE}
\end{equation}
I conclude with the expansion of the proton
structure function $F_2(x,Q^2)$ in terms of the three rightmost
BFKL singularities.
Such a three pole approximation 
 seems to exhaust the existing experimental data  
thus providing a reliable basis  
for the  BFKL-Regge phenomenology of  diffractive 
DIS. 
\subsection*{The BFKL  Eigenvalue Problem in the  Dipole Picture} 
  The virtual photo-absorption cross section $\sigma(r,x)$ , where
$r$ is the  color dipole size, satisfies
 the BFKL equation \cite{PISMA1}
(hereafter $\xi=\log(1/x)$):
\begin{equation}
{\partial \sigma(\xi,r)\over \partial \xi} ={\cal K}\otimes
\sigma(r,x) \label{eq:BFKL}
\end{equation}
with the kernel $\cal K$ which involves the  running
gauge coupling and the infrared cutoff-  
the correlation radius $R_c$ of perturbative gluons.   
We  look for the solution with the Regge behavior 
\begin{equation}
\sigma_n(r,x) =
\sigma_n(r)\left(1\over x\right)^{\Delta_n}\,. \label{eq:SIGMA0}
\end{equation}
Then the eigenfunctions $\sigma_n(r)$ and the eigenvalues $\Delta_n$
are determined from 
\begin{equation}
{\cal K}\otimes \sigma_n(r) =
\Delta_n\sigma_n(r)\,. \label{eq:EIGEN}
\end{equation}
The short-distance asymptotics of the eigenfunctions is known
in the analytic form \cite{PLNZ1}
\begin{equation}
\sigma_{n}(r)=
r^{2}\left[{1\over \alpha_{S}(r)}\right]^{\gamma_{n}-1}\,,
\label{eq:ANAL}
\end{equation}
 where
$\gamma_{n}\Delta_{n}={4/3}$. 
At large distances, $r\gg R_c$,
\begin{equation} 
\sigma_n(r) \equiv \bar\sigma_n= const \label{eq:CONST}
\end{equation}
 due 
to the finite $R_c$. Another useful clue is that
the leading eigenfunction $\sigma_0(r)$ is node 
free and the $ n$-th subleading
solution must have $n$ nodes. Then a practical approach to the 
eigenvalue problem is a variational procedure \cite{NOVIK} applied to a class of
 $n$-node polynomials ${\cal P}_n(z)$ in a variable
$z\sim [1/ \alpha_S(r)]^{\gamma}$.

\subsection*{Results and Discussion}

The BFKL equation with running coupling and infrared cutoff
has a discrete spectrum. 
The  eigenvalues 
$\Delta_n$ obtained by  the variational
method for $n=0,1,2,3,...$ are as follows
\begin{equation}
\Delta_n = 0.40,\,\,0.220,\,\, 0.148,\,\, 0.111,
\,\,0.088,\,\, 0.073,\,\, 0.063,...\,.
\label{eq:DELTAN}
\end{equation}
To an   accuracy
better than $10\%$ the above  series   follows the  
law 
\begin{equation}
\Delta_n={\Delta_0\over (n+1)} \label{eq:DELTA}
\end{equation} 
derived by Lipatov \cite{LIPAT86} from quasi-classical
considerations. 


The BFKL eigenfunctions are represented  (Figure \ref{figvrz1})
in term of the  quantity  $\sigma_n(r)/r$ which to a crude 
approximation is similar to Lipatov's quasi-classical eigenfunctions,
which are ${\cal E}_n(r)\sim \cos[\phi(r)]$  for $n\gg 1$ \cite{LIPAT86}.
    
\begin{figure}[b!] % fig 1




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\vspace{10pt}
\caption{ BFKL eigenfunctions.}
\label{figvrz1}
\end{figure}


 Once $\sigma_n(r)$ is known, the pomeron trajectory
slope $\alpha_n^{\prime}$ can  readily be derived. In the notations
of ref.\cite{PISMA2}
\begin{equation}
\alpha_n^{\prime}={3\over 32\pi R_c^2}\int d\rho^2\,\rho^2\alpha_S(\rho)
K_1^2(\rho/R_c)\left[1+{\sigma_n(\rho)/ \bar\sigma_n}\right]\,,
\label{eq:ALPHA}
\end{equation}
where (see eq.\ref{eq:CONST})
\begin{equation}
\bar\sigma_n={3\over 2\pi R^2_c}\int d\rho^2 \alpha_S(\rho)
K_1^2(\rho/R_c)\sigma_n(\rho)\,. \label{eq:BARSIG}
\end{equation}
Numerically, $\alpha_0^{\prime}=0.072\, GeV^{-2},\,\alpha_1^{\prime}=0.066\,GeV^{-2},
\,\alpha_2^{\prime}=0.062\, GeV^2,\,\alpha_3^{\prime}=0.060\, GeV^2 $.

The color dipole factorization relates the dipole cross sections
with the structure functions
$F_2^{(n)}(Q^2)$
which are shown in Figure \ref{figvrz2}.
\begin{figure}[b!] % fig 2

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\vspace{10pt}
\caption{The modulus of  structure function $F^{(n)}_2(Q^2)$ for $n=0,1,2,3$}
\label{figvrz2}
\end{figure} 
At large $Q^2$, far beyond the nodal region,
\begin{equation}
F_2^{n}(x,Q^2)\propto 
\left(x_0\over x\right)^{\Delta_n}\left[{1\over \alpha_S(Q^2)}\right]^{4/3\Delta_n} \,.
\label{eq:F2ASS}
\end{equation}
Since the relevant variable is a power of the inverse gauge coupling
the nodes are spaced by 2-3 orders of magnitude in $Q^2$-scale
 and only
the first  two of them  are  in the accessible range of $Q^2$.
The first nodes of $F_2^{(n)}(Q^2)$
are located at $Q^2\sim20-60\, GeV^2$. Hence, only the leading
structure function contributes significantly in this region.
 This explains the precocious  BFKL asymptotics found 
 from the numerical solution of the BFKL equation \cite{PLNZ2}.

In the accessible range of $x$ the subleading contributions
are numerically large. In particular, 
the BFKL expansion of the Born approximation dipole cross section
which is used as the boundary 
condition at $x=x_0=0.03$ suggests more than $60\%$ contribution
from $F_2^{(n)}$ with $n>0$. This implies the  subleading
 terms determine the $Q^2$ dependence of $F_{2p}(Q^2)$ at $x=x_0$
and simultaneously the $x$ dependence of the structure functions.
Notice that in the pre-nodal region of 
$Q^2\lesssim 20 \, GeV^2$  the leading and subleading
 structure functions
are very similar in shape.
This explains the failure of the early GLDAP fits: 
only the  limited region of $Q^2 \lesssim 10\, GeV^2$ was
accessible 
and they  could not catch and 
correctly
describe a very different $x$-evolution of 
  pomerons with
different $n$.

At small $x$ only the region $Q^2\lesssim 10^3 \, GeV^2$ is accessible.
In this range the structure functions with $n\geq 3$ 
are hardly distinguishable. Besides, the splitting of the intercept
with $n\geq 3$ is much smaller than for $n=0,1,2$.
 Hence, the Regge expansion (\ref{eq:REGGE})
can be truncated at $n=2$ and  $F_2^{(2)}(Q^2)$ 
comprises contributions from all poles with $n\geq 2$. 

The BFKL equation  allows one
to determine  the intercepts and structure functions $F_2^{(n)}(Q^2)$.
The only adjustable parameters are "the pole residues"
$A_0,\,,A_1\,,A_2$ in (\ref{eq:REGGE}) which are fixed, in fact,
by the boundary condition at $x=x_0$.
With the  proper account of the  valence \cite{GLUCK}
and non-perturbative \cite{PLNZ2} corrections to (\ref{eq:REGGE}) we arrive at 
the three-pole-approximation
 which appears to be very successful when confronted with
the data \cite{DATH1}. 
in a wide kinematical range 
(Figure \ref{figvrz3}). 
\begin{figure}[b!] % fig 3

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\vspace{10pt}
\caption{Three-Pole Approximation vs. H1, ZEUS and E665 data.}
\label{figvrz3}
\end{figure}
The effective pomeron intercept 
\begin{equation}
\Delta_{eff}=-{\partial \log F_{2p}(x,Q^2)\over \partial \log x}
 \label{eq:DELEFF}
\end{equation}
gives an idea of  the role of the subleading singularities.
The intercept $\Delta_{eff}$ 
  calculated with  the experimental kinematic constraints 
 is much smaller than $\Delta_0=0.4$
which is expected to dominate asymptotically. 
 The agreement of our numerical estimates
 with the $H1$ determination (Figure \ref{figvrz4})
is quite satisfactory.

{\bf Acknowledgments} I would like to thank Jos\'e Repond 
for the kind hospitality in Chicago and careful reading the 
manuscript. 
 
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\vspace{10pt}
\caption{Effective intercept vs. H1 data.}
\label{figvrz4}
\end{figure}
\vspace{-0.4cm}

\begin{references}
\bibitem{GRIB72}Gribov V.N., and Lipatov L.N., {\it Sov. J. Nucl.\  Phys.}\
 {\bf 15}, 438 (1972); Dokshitzer Yu.L., {\it Sov.\  Phys.\ JETP}\
 {\bf 46}, 641 (1977); Altarelli G., and Parisi G., {\it Nucl.\  Phys.}\
 {\bf B126}, 297 (1977).
\bibitem{LIPAT76}Fadin V.S., Kuraev E.A.,and Lipatov L.N., {\it Sov.\  Phys.\ JETP}\
 {\bf 44}, 443 (1976); ibid {\bf 45}, 199 (1977).
\bibitem{LIPAT86} Lipatov L.N., {\it Sov.\  Phys.\ JETP}\ {\bf 63}, 904  (1986)
\bibitem{PISMA1}Nikolaev N.N., Zakharov B.G., and Zoller V.R., {\it  JETP\ Letters}\
 {\bf 59}, 8 (1994).
\bibitem{PLNZ1}Nikolaev N.N., Zakharov B.G., {\it Phys.\ Letters}\
 {\bf B327}, 157 (1994).
\bibitem{NOVIK}Karl G., and Novikov V. {\it  Phys.\ Rev}\
 {\bf D51}, 5069 (1995).
\bibitem{PISMA2}Nikolaev N.N., Zakharov B.G., and Zoller V.R., {\it  JETP\ Letters}\
 {\bf 60}, 678 (1994).
\bibitem{PLNZ2}Nikolaev N.N., and Zakharov B.G., {\it Phys.\ Letters}\
 {\bf B333}, 250 (1994).
\bibitem{GLUCK}Gl\"uck M., Reya E., and Vogt A,    {\it Z.\ Phys.}\
 {\bf C67}, 433 (1995).
\bibitem{DATH1} H1 Collab.,  {\it Nucl.\ Phys.}\
 {\bf B439}, 471 (1995);  ZEUS Collab.,   {\it Z.\ Phys.}\
 {\bf C69}, 607 (1996);  E665 Collab.,   {\it Phys.\ Rev.}\
 {\bf D54}, 3006 (1996).



\end{references}
 
\end{document}

  

