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\begin{document}  
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% Journal macro
\def\Journal#1#2#3#4{{#1} {\bf #2} (#3) #4}
\def\NCA{\em Nuovo Cimento}
\def\NIM{\em Nucl. Instr. Methods}
\def\NIMA{{\em Nucl. Instr. Methods} {\bf A}}
\def\NPB{{\em Nucl. Phys.}   {\bf B}}
\def\PLB{{\em Phys. Lett.}   {\bf B}}
\def\PRL{\em Phys. Rev. Lett.}
\def\PRD{{\em Phys. Rev.}    {\bf D}}
\def\ZPC{{\em Z. Phys.}      {\bf C}}
\def\EJC{{\em Eur. Phys. J.} {\bf C}}
\def\CPC{\em Comp. Phys. Commun.}

\begin{titlepage}

%\noindent
%Version:     17.2.02   \\
%Editors:     A.~Kropivnitskaya, A.~Nikiforov, A.~Rostovtsev  \\
%Referees:           \\
%Comments by         

%\vspace{2cm}

\vspace*{5cm}
\begin{center}
\begin{Large}

{\bf Measurement of inclusive $\bf \eta, \rho^0, f_0(980)$
and $\bf f_2(1270)$ Photoproduction at HERA}

\vspace{2cm}

H1 Collaboration

\end{Large}
\end{center}

\vspace{2cm}


\begin{abstract}
H1 results are presented on the inclusive photoproduction of the neutral 
mesons $\eta$, $\rho^0$, $f_0(980)$ and $f_2(1270)$ at an average
$\gamma{p}$ collision energy $W=210~GeV$. The measurement is based on
about $4\times10^6$ multihadronic events collected in the year 2000,
corresponding to an integrated luminosity of
$38.7$~pb$^{-1}$.
\end{abstract}

\vspace{1.5cm}

\begin{center}
Preliminary results prepared for the DIS2003 workshop, St Petersburg
\end{center}

\end{titlepage}

\newpage
\begin{figure}
\center
\setlength{\unitlength}{1cm}
\hspace*{1.0cm}
\begin{picture}(15.0,10.0)
\epsfig{file=Fig_eta_color.eps,width=13.0cm}
\put(-4.0,-0.1){\large\bf $M_{\gamma\gamma}~[GeV]$}
\put(-13.3,4){\begin{sideways}\Large\bf $dN/dM~[1/GeV]$\end{sideways}}
\put(-5.,10.5){\color{red}\Large\bf H1 prelim.}
\put(-6.8,9.5){\color{darkgreen}\large$3<p_T<8$ GeV, $\;|y|<1$}
\put(-9.8,9.8){\color{blue}\Large$\eta$}
\end{picture}
\caption{Two-photon mass spectrum after the analysis cuts.
The smooth curve represents the result of a fit to a sum of a Gaussian 
 and a third order
polynomial.}
\label{fig:signal} 
\end{figure}

\newpage
\begin{figure}
\center
\setlength{\unitlength}{1cm}
\hspace*{1.5cm}
%\vspace*{4.0cm}
\begin{picture}(15.0,10.0)
\epsfig{file=Fig_rho_color.eps,width=15.0cm}
\put(-9.0,-0.1){\large\bf $M(\pi^+\pi^-)~[GeV]$}
\put(-15.6,5){\begin{sideways}\Large\bf 
$dN/dM~[1/GeV]$\end{sideways}}
\put(-8.5,14.){\color{red}\Large\bf H1 prelim.}
\put(-10.2,12.){\color{darkgreen}\Large$\;|y|<1$} 
\put(-5.3,12.5){\Large\color{blue}$\rho^0$}
\put(-4.5,5.8){\Large\color{DeepPink3}$f_0$}
\put(-3.8,4.5){\Large\color{red}$f_2$}
\put(-9.5,9.2){\sl\large\color{DeepPink3} comb.}
\put(-10.6,8.6){\sl\large\color{DeepPink3} background}
\put(-9.7,7.9){\sl\large $\omega$}
\put(-10.1,6.5){\sl\large\color{red} $K^*(892)^0$}
\end{picture}
%\put(-10.4,12.8){\color{blue}\Large\underline{raw data}} 
%\put(-4.,12.8){\color{blue}\Large\underline{final data}} 
\caption{The $\pi^+\pi^-$ invariant mass spectrum after subtraction of
background using the measured like-sign spectrum.
The full curves show the result of a fit including the $\rho$, $f_0$ and
$f_2$ resonances. In the left plot 
the dashed curve corresponds to the contribution of residual non-resonant 
background, the dotted and dash-dotted curves describe the 
contributions from $\omega$ and $K^*$ reflections, respectively. 
In the right plot the points represent the data after subtraction of the
background and the reflections.}
\label{fig:signal} 
\end{figure}

\newpage
\begin{figure}
\center
\setlength{\unitlength}{1cm}
%\hspace*{1.5cm}
%\vspace*{4.0cm}
\begin{picture}(17.0,16.0)
\epsfig{file=sigma_color.eps,width=16.0cm}
\put(-16.3,8){\rotatebox[origin=c]{90}{\Large\bf $d\sigma/dy[nb]$}}
\put(-8.7,8){\rotatebox[origin=c]{90}{\Large\bf $d\sigma/(dydp_T^2)[nb/(GeV)^2]$}}
\put(-11.7,0.3){\large\bf $y$}
\put(-5.,0.3){\large\bf $p_T[GeV]$}
\put(-9.9,13.5){\large\bf $a)$}
\put(-2.2,13.5){\large\bf $b)$}
\put(-5.7,5.7){\color{blue}\Large\bf $-\:\rho^0$}
\put(-5.7,4.6){\color{DeepPink3}\Large\bf $-\:f_0$}
\put(-5.7,3.6){\color{red}\Large\bf $-\:f_2$}
\put(-5.7,2.5){\Large\bf $-\:\eta$} 
\put(-9.5,15.6){\color{red}\Large\bf H1 prelim.} 
\end{picture}
\caption{The differential cross sections for the inclusive photoproduction
of $\eta$ (filled downpointing 
triangles), $\rho^0$~(filled uppointing triangles), $f_0(980)$~(filled 
circles) and $f_2(1270)$~(filled squares) mesons. (a) Cross sections
as a function of laboratory rapidity, $y$, 
for meson transverse momentum $p_T>0$ GeV 
($\rho^0$, $f_0$ and $f_2$ mesons) and 
$3<pt<8$ GeV ($\eta$ meson). (b) Cross sections as a function of
$p_T$ for $y=0$.} 
\label{fig:sigma} 
\end{figure}

\begin{figure}[ht]
\center
\setlength{\unitlength}{1cm}
%\hspace*{1.5cm}
%\vspace*{4.0cm}
\begin{picture}(17.0,16.0)
\epsfig{file=sigmaptplusm_color.eps,width=16.0cm}
\put(-16.2,8){\rotatebox[origin=c]{90}{\Large\bf $1/(2j+1)d\sigma/(dydp_T^2)[nb/(GeV)^2]$}}
\put(-9.0,0.1){\large\bf $p_T+m[GeV]$}
\put(-13.5,6.45){\color{blue}\Large\bf $-\:\rho^0$}
\put(-13.5,5.6){\color{DeepPink3}\Large\bf $-\:f_0$}
\put(-13.5,4.8){\color{red}\Large\bf $-\:f_2$}
\put(-13.5,3.95){\Large\bf $-\:\eta$}
\put(-13.5,3.1){\Large\sl $-\:\pi^+$ published }
\put(-5.,13.){\color{red}\Large\bf H1 prelim.}
\end{picture}
\caption{The differential cross sections for $\eta$ (filled downpointing 
triangles), $\rho^0$~(filled uppointing triangles), $f_0(980)$~(filled 
circles) and $f_2(1270)$~(filled squares) plotted as function of 
 $(m+p_T)$, with $m$ being
the nominal meson mass. The open symbols show the
$\pi$ production cross section calculated from measurement of the
charged particle spectrum in photoproduction.}
\label{fig:sigma} 
\end{figure}


\end{document}