Notes/WZCSA07/samples.tex

\section{Signal and Background Modeling}
\label{sec:gen}
\subsection{Monte Carlo generators}
The signal and background samples for the full detector simulation
are generated with the leading order (LO) event generator 
{\sl PYTHIA}~\cite{Sjostrand:2003wg}, {\sl ALPGEN} and {\sl COMPHEP}. 
To accommodate next-to-leading (NLO) effects, constant $k$-factors are applied.
Additionally, the cross section calculator {\sl MCFM}~\cite{Campbell:2005} 
is used to determine the NLO differential cross section for the $\WZ$
production.  To estimate the uncertainty on the cross-section
due to the choice of the PDF, we use NLO event generator
 {\sl MC@NLO 3.1}~\cite{Frixione:2002ik} together with CTEQ6M PDF set.

\subsection{Signal definition}

The goal of this analysis is to study the associative production of the on-shell 
$W$ and $\Z$ bosons that decay into three leptons and a neutrino. In the
following we refer to a lepton to as either a muon or an electron, unless
specified otherwise. The leptonic final state $\ell^+ \ell^- \ell^\pm \nu$ also receives a 
contribution from the $W\gamma^*$ production, where the $\gamma^*$ stands for a 
virtual photon through the $WW\gamma$ vertex. In this analysis, we
restrict this contribution by requiring the $\ell^+\ell^-$ invariant mass to be
consistent with the nominal $\Z$ boson mass. As CMS detector has a very
good energy resolution for electrons and muons, the mass window 
is set to be $\pm$ 10 GeV around 91 GeV.

Using {\sl MCFM} we estimate the total NLO $\WZ$ cross-section to be
\begin{equation}
\sigma_{NLO} ( pp \rightarrow W^+\Z; \sqrt{s}=14~{\rm TeV}) = 30.5~{\rm pb},
\end{equation}
\begin{equation}
\sigma_{NLO} ( pp \rightarrow W^-\Z; \sqrt{s}=14~{\rm TeV}) = 19.1~{\rm pb}.
\end{equation}

The LO and NLO distributions of the \Z boson transverse momentum are 
shown in Fig.~\ref{fig:LOvsNLO} with the case of $W^+$ on the left and $W^-$
on the right side. The NLO/LO ratio, $k$-factor, is also presented on the figure,
and it is increasing with $p_T(\Z)$.  The $p_T$ dependence of the $k$-factor
becomes important when a proper NLO description of the $\Z$ boson transverse
momentum must be obtained, $e.g$ to measure the strength of the $WWZ$ coupling.
As the focus of this analysis is to prepare for the cross-section measurement, 
we take a $p_{T}$-averaged value of the $k$-factor, equal to 1.84.

\begin{figure}[!bt]
  \begin{center}
  \scalebox{0.8}{\includegraphics{figs/LOvsNLOZPtWminuns.eps}\includegraphics{figs/LOvsNLOZPtWplus.eps}}
  \caption{$p_T(Z)$ distribution for LO (solid black histogram) and NLO (dashed black histogram)
  in $W^-\Z$ events (left) and  $W^+\Z$ events (right). The ratio NLO/LO is also given as a red
  solid line.
}
  \label{fig:LOvsNLO}
  \end{center}
\end{figure}

%# for bbll:
%#CS NLO ((Z/gamma*->l+l-)bb) = 830pb = 345 pb * 2.4, where:
%#- 345 pb is LO CS calculated with precision of ~0.15%
%#- 2.4 is MCMF calculated k-factor with precision ~30% (!)
%# 830x0.173 (== XS x eff.) = 143.59pb


\subsection{Signal and background Monte Carlo samples}

The signal Monte Carlo sample is produced using {\sl PYTHIA}
generator. The decay for the \W has been forced to $e\nu_e$ or
$\mu\nu_{mu}$ or $\tau\nu_{\tau}$ final state, while the \Z decays 
into electrons or muons only.

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% YM changes implemented up to here
The main background that we have to consider are all final states
having at least two isolated leptons from the same flavor and with
opposite charge. The third one can be a real isolated lepton or a misidentified
lepton. The probability to misidentify one isolated lepton is rather low, so
this is why we can considerer safely starting from two
leptons. Moreover we will apply a cut on the invariant mass of the two
isolated leptons so most of the background that we have to study are:\\
\begin{itemize}
\item $W+jets$: $W$ boson will give us one isolated leptons. The probability that 2 additional jets will be misidentified as isolated lepton is very low and the criteria on the lepton invariant mass will definitely reduce such background. This channel is nevertheless useful to study other background for which data sample are not available such as $Wb\bar{b}$. The sample studied for this analysis, has been produced using ALPGEN generator per jet bin.
\item $Z + jets$: $Z$ boson is common between signal and background. The third isolated lepton can come from a misidentified lepton. The cross section of production of this channel is around 35 time greater than the signal.The sample studied for this analysis, has been produced using ALPGEN generator per jet bin.
\item $t\bar{t}$: top quark will decay to \W$b$ pair where each $W$ can decay via an isolated leptons. This leptons will have opposite charged. Even though combining the two leptons, we will not obtain a peak around the \Z mass, the cross section of this process is around 15 time the cross section of the signal. The sample studied for this analysis, has been produced using ALPGEN generator per jet bin. The third lepton will come from a semi leptonic decay of a $b$ quark which will be isolated.
\item $Z + b\bar{b}$: the presence of $Z$ boson will select such events. Moreover due to the semi leptonic decay of a $b$ quark, a third lepton can be easily identified and consider as isolated. The sample used has been produced by COMPHEP generator.
%\item $ZZ$: the inclusive cross section production is smaller than the signal studied but due to branching fraction and if we consider $Z\rightarrow b\bar{b}$ decay, some events can pass the analysis selection. This process has been produced using PYTHIA generator.
\end{itemize}

All the different sample studied are part of the CSA07 production and
have been generated using $CMSSW\_1\_4_\_6$ and went through the full
GEANT simulation of the CMS detector using the same release. The
digitization and reconstruction have been done using $CMSSW\_1\_6_\_7$
release with a misalignment/miscalibration of the detector expected
after 100~pb$^{-1}$ of data. All ALPGEN samples are mixed together in
``Chowder soup''.

The summary of all datasets used for signal and background is given in
table~\ref{tab:MC}. We use the RECO production level to access to
low-level detector information, such as reconstructed hits. This lets
us to use full granularity of the CMS sub-detectors to use a isolation
discriminants.

Analysis of the samples is done using CMSSW$\_1\_6\_7$ CMS software release.
The information is stored in ROOT trees using a code in
CVS:/UserCode/Vuko/WZAnalysis, which is based on Physics Tools candidates.

\begin{table}[!tb]
%\begin{tabular}{llllll} \hline
%Sample & Generator & Sample name & Events & $\sigma \cdot \epsilon
%\cdot k$ & k-factor \\ \hline WZ & Pythia &
%/WZ/CMSSW\_1\_6\_7-CSA07-1195663763/RECO & 58897 & 0.585 pb & 1.92 \\
%$Zb\bar{b}$ & COMPHEP &
%/comphep-bbll/CMSSW\_1\_6\_7-CSA07-1198677426/RECO & 143.59 pb & 2.4
%\\ ``Chowder'' & ALPGEN &
%/CSA07AllEvents/CMSSW\_1\_6\_7-CSA07-Chowder-A1-PDAllEvents-ReReco-100pb/RECO
%& 25 M & event weights & - \\
 \begin{tabular}{|c|c|c|c|c|} \hline
 Sample & cross section [pb]  & Events & Dataset name \\  \hline
 $WZ$  & 1.12 &  59K & /WZ/CMSSW$\_1\_6\_7$-CSA07-1195663763\\ \hline
 $Z b\bar{b}$  & 830*0.173 (NLO) & 1.9M & /comphep-bbll/CMSSW$\_1\_6\_7$-CSA07-1198677426\\ \hline
 Chowder  & Event Weight & $\sim$ 21M &  /CSA07AllEvents/\\ & & & CMSSW$\_1\_6\_7$-CSA07-Chowder-A1-PDAllEvents-ReReco
-100pb\\ \hline
%$ZZ\rightarrow ll l'l'$&  0.846 & 
%\hline
\end{tabular}
\label{tab:MC}
\caption{Monte Carlo samples used in this analysis}
\end{table}


Revision:	1.10
Committed:	Sun Jun 22 17:16:46 2008 UTC (16 years, 10 months ago) by ymaravin
Content type:	application/x-tex
Branch:	MAIN
Changes since 1.9:	+24 -24 lines
Log Message:	More changes, mostly language. Slightly more info on k-factor has been introduced mostly to make the text clearer.
#	User	Rev	Content
1	vuko	1.1	\section{Signal and Background Modeling}
2			\label{sec:gen}
3			\subsection{Monte Carlo generators}
4			The signal and background samples for the full detector simulation
5	ymaravin	1.10	are generated with the leading order (LO) event generator
6	ymaravin	1.9	{\sl PYTHIA}~\cite{Sjostrand:2003wg}, {\sl ALPGEN} and {\sl COMPHEP}.
7			To accommodate next-to-leading (NLO) effects, constant $k$-factors are applied.
8			Additionally, the cross section calculator {\sl MCFM}~\cite{Campbell:2005}
9			is used to determine the NLO differential cross section for the $\WZ$
10			production. To estimate the uncertainty on the cross-section
11			due to the choice of the PDF, we use NLO event generator
12			{\sl MC@NLO 3.1}~\cite{Frixione:2002ik} together with CTEQ6M PDF set.
13
14			\subsection{Signal definition}
15
16			The goal of this analysis is to study the associative production of the on-shell
17			$W$ and $\Z$ bosons that decay into three leptons and a neutrino. In the
18			following we refer to a lepton to as either a muon or an electron, unless
19			specified otherwise. The leptonic final state $\ell^+ \ell^- \ell^\pm \nu$ also receives a
20			contribution from the $W\gamma^$ production, where the $\gamma^$ stands for a
21			virtual photon through the $WW\gamma$ vertex. In this analysis, we
22	ymaravin	1.10	restrict this contribution by requiring the $\ell^+\ell^-$ invariant mass to be
23	ymaravin	1.9	consistent with the nominal $\Z$ boson mass. As CMS detector has a very
24			good energy resolution for electrons and muons, the mass window
25			is set to be $\pm$ 10 GeV around 91 GeV.
26
27	ymaravin	1.10	Using {\sl MCFM} we estimate the total NLO $\WZ$ cross-section to be
28	beaucero	1.5	\begin{equation}
29	ymaravin	1.10	\sigma_{NLO} ( pp \rightarrow W^+\Z; \sqrt{s}=14~{\rm TeV}) = 30.5~{\rm pb},
30	beaucero	1.5	\end{equation}
31			\begin{equation}
32	ymaravin	1.10	\sigma_{NLO} ( pp \rightarrow W^-\Z; \sqrt{s}=14~{\rm TeV}) = 19.1~{\rm pb}.
33	beaucero	1.5	\end{equation}
34
35	ymaravin	1.10	The LO and NLO distributions of the \Z boson transverse momentum are
36			shown in Fig.~\ref{fig:LOvsNLO} with the case of $W^+$ on the left and $W^-$
37			on the right side. The NLO/LO ratio, $k$-factor, is also presented on the figure,
38			and it is increasing with $p_T(\Z)$. The $p_T$ dependence of the $k$-factor
39			becomes important when a proper NLO description of the $\Z$ boson transverse
40			momentum must be obtained, $e.g$ to measure the strength of the $WWZ$ coupling.
41			As the focus of this analysis is to prepare for the cross-section measurement,
42			we take a $p_{T}$-averaged value of the $k$-factor, equal to 1.84.
43	beaucero	1.5
44			\begin{figure}[!bt]
45			\begin{center}
46			\scalebox{0.8}{\includegraphics{figs/LOvsNLOZPtWminuns.eps}\includegraphics{figs/LOvsNLOZPtWplus.eps}}
47	ymaravin	1.10	\caption{$p_T(Z)$ distribution for LO (solid black histogram) and NLO (dashed black histogram)
48			in $W^-\Z$ events (left) and $W^+\Z$ events (right). The ratio NLO/LO is also given as a red
49			solid line.
50	beaucero	1.5	}
51			\label{fig:LOvsNLO}
52			\end{center}
53			\end{figure}
54	vuko	1.1
55	vuko	1.2	%# for bbll:
56			%#CS NLO ((Z/gamma->l+l-)bb) = 830pb = 345 pb 2.4, where:
57			%#- 345 pb is LO CS calculated with precision of ~0.15%
58			%#- 2.4 is MCMF calculated k-factor with precision ~30% (!)
59			%# 830x0.173 (== XS x eff.) = 143.59pb
60
61
62	ymaravin	1.10	\subsection{Signal and background Monte Carlo samples}
63
64			The signal Monte Carlo sample is produced using {\sl PYTHIA}
65			generator. The decay for the \W has been forced to $e\nu_e$ or
66			$\mu\nu_{mu}$ or $\tau\nu_{\tau}$ final state, while the \Z decays
67			into electrons or muons only.
68	beaucero	1.6
69	ymaravin	1.10	%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
70			% YM changes implemented up to here
71	beaucero	1.6	The main background that we have to consider are all final states
72			having at least two isolated leptons from the same flavor and with
73			opposite charge. The third one can be a real isolated lepton or a misidentified
74			lepton. The probability to misidentify one isolated lepton is rather low, so
75	beaucero	1.7	this is why we can considerer safely starting from two
76	beaucero	1.6	leptons. Moreover we will apply a cut on the invariant mass of the two
77	beaucero	1.7	isolated leptons so most of the background that we have to study are:\\
78	beaucero	1.6	\begin{itemize}
79			\item $W+jets$: $W$ boson will give us one isolated leptons. The probability that 2 additional jets will be misidentified as isolated lepton is very low and the criteria on the lepton invariant mass will definitely reduce such background. This channel is nevertheless useful to study other background for which data sample are not available such as $Wb\bar{b}$. The sample studied for this analysis, has been produced using ALPGEN generator per jet bin.
80	beaucero	1.7	\item $Z + jets$: $Z$ boson is common between signal and background. The third isolated lepton can come from a misidentified lepton. The cross section of production of this channel is around 35 time greater than the signal.The sample studied for this analysis, has been produced using ALPGEN generator per jet bin.
81			\item $t\bar{t}$: top quark will decay to \W$b$ pair where each $W$ can decay via an isolated leptons. This leptons will have opposite charged. Even though combining the two leptons, we will not obtain a peak around the \Z mass, the cross section of this process is around 15 time the cross section of the signal. The sample studied for this analysis, has been produced using ALPGEN generator per jet bin. The third lepton will come from a semi leptonic decay of a $b$ quark which will be isolated.
82			\item $Z + b\bar{b}$: the presence of $Z$ boson will select such events. Moreover due to the semi leptonic decay of a $b$ quark, a third lepton can be easily identified and consider as isolated. The sample used has been produced by COMPHEP generator.
83			%\item $ZZ$: the inclusive cross section production is smaller than the signal studied but due to branching fraction and if we consider $Z\rightarrow b\bar{b}$ decay, some events can pass the analysis selection. This process has been produced using PYTHIA generator.
84	beaucero	1.6	\end{itemize}
85	beaucero	1.5
86	beaucero	1.7	All the different sample studied are part of the CSA07 production and
87			have been generated using $CMSSW\_1\_4_\_6$ and went through the full
88			GEANT simulation of the CMS detector using the same release. The
89			digitization and reconstruction have been done using $CMSSW\_1\_6_\_7$
90			release with a misalignment/miscalibration of the detector expected
91			after 100~pb$^{-1}$ of data. All ALPGEN samples are mixed together in
92			``Chowder soup''.
93
94			The summary of all datasets used for signal and background is given in
95			table~\ref{tab:MC}. We use the RECO production level to access to
96			low-level detector information, such as reconstructed hits. This lets
97			us to use full granularity of the CMS sub-detectors to use a isolation
98			discriminants.
99
100			Analysis of the samples is done using CMSSW$\_1\_6\_7$ CMS software release.
101			The information is stored in ROOT trees using a code in
102			CVS:/UserCode/Vuko/WZAnalysis, which is based on Physics Tools candidates.
103
104			\begin{table}[!tb]
105			%\begin{tabular}{llllll} \hline
106			%Sample & Generator & Sample name & Events & $\sigma \cdot \epsilon
107			%\cdot k$ & k-factor \\ \hline WZ & Pythia &
108			%/WZ/CMSSW\_1\_6\_7-CSA07-1195663763/RECO & 58897 & 0.585 pb & 1.92 \\
109			%$Zb\bar{b}$ & COMPHEP &
110			%/comphep-bbll/CMSSW\_1\_6\_7-CSA07-1198677426/RECO & 143.59 pb & 2.4
111			%\\ ``Chowder'' & ALPGEN &
112			%/CSA07AllEvents/CMSSW\_1\_6\_7-CSA07-Chowder-A1-PDAllEvents-ReReco-100pb/RECO
113			%& 25 M & event weights & - \\
114			\begin{tabular}{\|c\|c\|c\|c\|c\|} \hline
115			Sample & cross section [pb] & Events & Dataset name \\ \hline
116			$WZ$ & 1.12 & 59K & /WZ/CMSSW$\_1\_6\_7$-CSA07-1195663763\\ \hline
117			$Z b\bar{b}$ & 830*0.173 (NLO) & 1.9M & /comphep-bbll/CMSSW$\_1\_6\_7$-CSA07-1198677426\\ \hline
118			Chowder & Event Weight & $\sim$ 21M & /CSA07AllEvents/\\ & & & CMSSW$\_1\_6\_7$-CSA07-Chowder-A1-PDAllEvents-ReReco
119			-100pb\\ \hline
120			%$ZZ\rightarrow ll l'l'$& 0.846 &
121	beaucero	1.8	%\hline
122	vuko	1.2	\end{tabular}
123	beaucero	1.7	\label{tab:MC}
124	vuko	1.2	\caption{Monte Carlo samples used in this analysis}
125			\end{table}
126
127	vuko	1.1
128
129