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chib2s-fit.tex
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chib2s-fit.tex
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\begin{frame}{$\chi_{b1,2}(2,3P) \to \TwoS \gamma$ fit model}
\begin{columns}[T]
\column{.5\textwidth}
\centering
\setlength{\unitlength}{1mm}
\begin{picture}(50,80)
%
\put(0,0){
\includegraphics[width=50mm, height=40mm]{chib2s-fit/f2012_18_40}
}
\put(0,40){
\includegraphics[width=50mm, height=40mm]{chib2s-fit/f2011_18_40}
}
\put(0,15){\tiny \begin{sideways}Candidates/(20\mevcc)\end{sideways}}
\put(2,9){\tiny $m_{\mumu \gamma} - m_{\mumu} + m_{\Y2S}^{PDG} \left[\gevcc\right]$}
\put(25,30){$\sqs=8 \tev$}
\put(20,25){\tiny $ 18 < p_T^{\Y2S} < 40\gevc$}
\put(0,55){\tiny \begin{sideways}Candidates/(20\mevcc)\end{sideways}}
\put(2, 49){\tiny $m_{\mumu \gamma} - m_{\mumu} + m_{\Y2S}^{PDG} \left[\gevcc\right]$}
\put(25,70){$\sqs=7 \tev$}
\put(20,65){\tiny $18 < p_T^{\Y2S} < 40\gevc$}
\put(15,75){\tiny \chibTwoP}
\put(25,60){\tiny \chibThreeP}
\put(15,35){\tiny \chibTwoP}
\put(25,20){\tiny \chibThreeP}
% \graphpaper[5](0,0)(50, 80)
\end{picture}
\column{.5\textwidth}
\begin{itemize}
\item One Crystal Ball (CB) for each $\chi_{b1,2}(2P,3P)$ state: 4 CB in total
\item Exclude the study of $\chi_{b0}$ due to its low radiative branching ratio.
\item Product of exponential and linear combination of polynomials for combinatorial background.
\end{itemize}
\end{columns}
\end{frame}