claudioc/OSNote2010/limit.tex

\section{Limit on new physics}
\label{sec:limit}

%{\bf \color{red} The numbers in this Section need to be double checked.}

As discussed in Section~\ref{sec:results}, we see one event 
in the signal region, defined as SumJetPt$>$300 GeV and 
\met/$\sqrt{\rm SumJetPt}>8.5$ GeV$^{\frac{1}{2}}$.

The background prediction from the SM Monte Carlo is 
1.3 events.
%, where the uncertainty comes from 
%the jet energy scale (30\%, see Section~\ref{sec:systematics}),
%the luminosity (10\%), and the lepton/trigger 
%efficiency (10\%)\footnote{Other uncertainties associated with 
%the modeling of $t\bar{t}$ in MadGraph have not been evaluated.
%The uncertainty on $pp \to \sigma(t\bar{t})$ is also not included.}.
The data driven background predictions from the ABCD method 
and the $P_T(\ell\ell)$ method are $1.5 \pm 0.9({\rm stat}) \pm 0.3({\rm syst})$ 
and $4.3 \pm 3.0({\rm stat}) \pm 1.2({\rm syst})$, respectively.

These three predictions are in good agreement with each other
and with the observation of one event in the signal region.
We calculate a Bayesian 95\% CL upper limit\cite{ref:bayes.f} 
on the number of non SM events in the signal region to be 4.1.
We have also calculated this limit using a profile likelihood method
as implemented in the cl95cms software, and we also find 4.1.
These limits were calculated using a background prediction of $N_{BG}=1.7 \pm 1.1$
events.  The upper limit is not very sensitive to the choice of
$N_{BG}$ and its uncertainty.

To get a feeling for the sensitivity of this search to some
popular SUSY models, we remind the reader of the number of expected
LM0 and LM1 events from Table~\ref{tab:sigcont}: $6.3 \pm 1.3$ 
events and $2.6 \pm 0.4$ 
respectively, where the uncertainties
are from energy scale (Section~\ref{sec:systematics}), luminosity,
and lepton efficiency.  Note that these expected SUSY yields 
are computed using LO cross-sections, and are therefore underestimated.

Conveying additional useful information about the results of
a generic ``signature-based'' search such as the one described
in this note is a difficult issue.  The next paragraph represent
our attempt at doing so.

Other models of new physics in the dilepton final state 
can be confronted in an approximate way by simple 
generator-level studies that 
compare the expected number of events in 35 pb$^{-1}$
with our upper limit of 4.1 events.  The key ingredients
of such studies are the kinematical cuts described 
in this note, the lepton efficiencies, and the detector
responses for SumJetPt and \met/$\sqrt{\rm SumJetPt}$. These 
quantities have been evaluated with Spring10 MC samples.
The muon identification efficiency is $\approx 95\%$;
the electron identification efficiency varies from $\approx$ 63\% at 
$P_T = 10$ GeV to 91\% for $P_T > 30$ GeV.  The isolation
efficiency in top events varies from $\approx 83\%$ (muons)
and $\approx 89\%$ (electrons) at $P_T=10$ GeV to 
$\approx 95\%$ for $P_T>60$ GeV.  The average detector 
responses for SumJetPt and $\met/\sqrt{\rm SumJetPt}$ are 
$1.00 \pm 0.05$ and $0.94 \pm 0.05$ respectively, where
the uncertainties are from the jet energy scale uncertainty.
The experimental resolutions on these quantities are 10\% and 
14\% respectively.

To justify the statements in the previous paragraph 
about the detector responses, we plot 
in Figure~\ref{fig:response} the average response for 
SumJetPt and \met/$\sqrt{\rm SumJetPt}$ in MC, as well as the
efficiency for the cuts on these quantities used in defining the
signal region.
% (SumJetPt $>$ 300 GeV and \met/$\sqrt{\rm SumJetPt} > 8.5$
% Gev$^{\frac{1}{2}}$).  
We find that the average SumJetPt response 
in the Monte Carlo
is very close to one, with an RMS of order 10\% while
the 
response of \met/$\sqrt{\rm SumJetPt}$ is approximately 0.94 with an
RMS of 14\%.

%Using this information as well as the kinematical
%cuts described in Section~\ref{sec:eventSel} and the lepton efficiencies
%of Figures~\ref{fig:effttbar}, one should be able to confront
%any existing or future model via a relatively simple generator 
%level study by comparing the expected number of events in 35 pb$^{-1}$
%with our upper limit of 4.1 events.

\begin{figure}[tbh]
\begin{center}
\includegraphics[width=\linewidth]{selectionEff.png}
\caption{\label{fig:response} Left plots: the efficiencies
as a function of the true quantities for the SumJetPt (top) and
tcMET/$\sqrt{\rm SumJetPt}$ (bottom) requirements for the signal 
region as a function of their true values.  The value of the 
cuts is indicated by the vertical line.
Right plots: The average response and its RMS for the SumJetPt
(top) and tcMET/$\sqrt{\rm SumJetPt}$ (bottom) measurements.
The response is defined as the ratio of the reconstructed quantity
to the true quantity in MC.  These plots are done using the LM0
Monte Carlo, but they are not expected to depend strongly on 
the underlying physics.}
\end{center}
\end{figure}
Revision:	1.18
Committed:	Fri Dec 3 15:01:01 2010 UTC (14 years, 5 months ago) by benhoob
Content type:	application/x-tex
Branch:	MAIN
Changes since 1.17:	+5 -3 lines
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#	User	Rev	Content
1	claudioc	1.1	\section{Limit on new physics}
2			\label{sec:limit}
3	claudioc	1.2
4	claudioc	1.10	%{\bf \color{red} The numbers in this Section need to be double checked.}
5	claudioc	1.2
6			As discussed in Section~\ref{sec:results}, we see one event
7			in the signal region, defined as SumJetPt$>$300 GeV and
8			\met/$\sqrt{\rm SumJetPt}>8.5$ GeV$^{\frac{1}{2}}$.
9
10			The background prediction from the SM Monte Carlo is
11	benhoob	1.15	1.3 events.
12			%, where the uncertainty comes from
13			%the jet energy scale (30\%, see Section~\ref{sec:systematics}),
14			%the luminosity (10\%), and the lepton/trigger
15			%efficiency (10\%)\footnote{Other uncertainties associated with
16			%the modeling of $t\bar{t}$ in MadGraph have not been evaluated.
17			%The uncertainty on $pp \to \sigma(t\bar{t})$ is also not included.}.
18	claudioc	1.2	The data driven background predictions from the ABCD method
19	benhoob	1.14	and the $P_T(\ell\ell)$ method are $1.5 \pm 0.9({\rm stat}) \pm 0.3({\rm syst})$
20			and $4.3 \pm 3.0({\rm stat}) \pm 1.2({\rm syst})$, respectively.
21	claudioc	1.2
22			These three predictions are in good agreement with each other
23			and with the observation of one event in the signal region.
24	benhoob	1.5	We calculate a Bayesian 95\% CL upper limit\cite{ref:bayes.f}
25	benhoob	1.17	on the number of non SM events in the signal region to be 4.1.
26	benhoob	1.18	We have also calculated this limit using a profile likelihood method
27			as implemented in the cl95cms software, and we also find 4.1.
28			These limits were calculated using a background prediction of $N_{BG}=1.7 \pm 1.1$
29	claudioc	1.2	events. The upper limit is not very sensitive to the choice of
30			$N_{BG}$ and its uncertainty.
31
32			To get a feeling for the sensitivity of this search to some
33			popular SUSY models, we remind the reader of the number of expected
34	benhoob	1.15	LM0 and LM1 events from Table~\ref{tab:sigcont}: $6.3 \pm 1.3$
35	benhoob	1.16	events and $2.6 \pm 0.4$
36	benhoob	1.14	respectively, where the uncertainties
37	claudioc	1.2	are from energy scale (Section~\ref{sec:systematics}), luminosity,
38	claudioc	1.10	and lepton efficiency. Note that these expected SUSY yields
39			are computed using LO cross-sections, and are therefore underestimated.
40	claudioc	1.2
41	claudioc	1.10	Conveying additional useful information about the results of
42			a generic ``signature-based'' search such as the one described
43	claudioc	1.11	in this note is a difficult issue. The next paragraph represent
44	claudioc	1.10	our attempt at doing so.
45
46			Other models of new physics in the dilepton final state
47			can be confronted in an approximate way by simple
48			generator-level studies that
49			compare the expected number of events in 35 pb$^{-1}$
50			with our upper limit of 4.1 events. The key ingredients
51			of such studies are the kinematical cuts described
52			in this note, the lepton efficiencies, and the detector
53	benhoob	1.18	responses for SumJetPt and \met/$\sqrt{\rm SumJetPt}$. These
54			quantities have been evaluated with Spring10 MC samples.
55	claudioc	1.10	The muon identification efficiency is $\approx 95\%$;
56			the electron identification efficiency varies from $\approx$ 63\% at
57			$P_T = 10$ GeV to 91\% for $P_T > 30$ GeV. The isolation
58			efficiency in top events varies from $\approx 83\%$ (muons)
59			and $\approx 89\%$ (electrons) at $P_T=10$ GeV to
60			$\approx 95\%$ for $P_T>60$ GeV. The average detector
61			responses for SumJetPt and $\met/\sqrt{\rm SumJetPt}$ are
62			$1.00 \pm 0.05$ and $0.94 \pm 0.05$ respectively, where
63			the uncertainties are from the jet energy scale uncertainty.
64			The experimental resolutions on these quantities are 10\% and
65			14\% respectively.
66
67			To justify the statements in the previous paragraph
68			about the detector responses, we plot
69			in Figure~\ref{fig:response} the average response for
70	claudioc	1.8	SumJetPt and \met/$\sqrt{\rm SumJetPt}$ in MC, as well as the
71			efficiency for the cuts on these quantities used in defining the
72	claudioc	1.9	signal region.
73			% (SumJetPt $>$ 300 GeV and \met/$\sqrt{\rm SumJetPt} > 8.5$
74			% Gev$^{\frac{1}{2}}$).
75			We find that the average SumJetPt response
76	claudioc	1.8	in the Monte Carlo
77	claudioc	1.10	is very close to one, with an RMS of order 10\% while
78	claudioc	1.9	the
79	claudioc	1.8	response of \met/$\sqrt{\rm SumJetPt}$ is approximately 0.94 with an
80	claudioc	1.9	RMS of 14\%.
81	claudioc	1.8
82	claudioc	1.10	%Using this information as well as the kinematical
83			%cuts described in Section~\ref{sec:eventSel} and the lepton efficiencies
84			%of Figures~\ref{fig:effttbar}, one should be able to confront
85			%any existing or future model via a relatively simple generator
86			%level study by comparing the expected number of events in 35 pb$^{-1}$
87			%with our upper limit of 4.1 events.
88	claudioc	1.8
89			\begin{figure}[tbh]
90			\begin{center}
91			\includegraphics[width=\linewidth]{selectionEff.png}
92			\caption{\label{fig:response} Left plots: the efficiencies
93			as a function of the true quantities for the SumJetPt (top) and
94			tcMET/$\sqrt{\rm SumJetPt}$ (bottom) requirements for the signal
95			region as a function of their true values. The value of the
96			cuts is indicated by the vertical line.
97			Right plots: The average response and its RMS for the SumJetPt
98			(top) and tcMET/$\sqrt{\rm SumJetPt}$ (bottom) measurements.
99			The response is defined as the ratio of the reconstructed quantity
100			to the true quantity in MC. These plots are done using the LM0
101			Monte Carlo, but they are not expected to depend strongly on
102			the underlying physics.}
103			\end{center}
104			\end{figure}