'Number Counting Utils' RooStats tutorial
This tutorial shows an example of the RooStats standalone utilities that calculate the p-value or Z value (eg. significance in 1-sided Gaussian standard deviations) for a number counting experiment. This is a hypothesis test between background only and signal-plus-background. The background estimate has uncertainty derived from an auxiliary or sideband measurement.
Documentation for these utilities can be found here: http://root.cern/root/html/RooStats__NumberCountingUtils.html
This problem is often called a proto-type problem for high energy physics. In some references it is referred to as the on/off problem.
The problem is treated in a fully frequentist fashion by interpreting the relative background uncertainty as being due to an auxiliary or sideband observation that is also Poisson distributed with only background. Finally, one considers the test as a ratio of Poisson means where an interval is well known based on the conditioning on the total number of events and the binomial distribution. For more on this, see
expected p-value =0.00094165 Z value (Gaussian sigma) = 3.10804
observed p-value =0.00094165 Z value (Gaussian sigma) = 3.10804
expected p-value =0.00094165 Z value (Gaussian sigma) = 3.10804
observed p-value =0.00094165 Z value (Gaussian sigma) = 3.10804
#include <iostream>
using std::cout, std::endl;
{
double sExpected = 50;
double bExpected = 100;
double relativeBkgUncert = 0.1;
double pExp = NumberCountingUtils::BinomialExpP(sExpected, bExpected, relativeBkgUncert);
double zExp = NumberCountingUtils::BinomialExpZ(sExpected, bExpected, relativeBkgUncert);
cout << "expected p-value =" << pExp << " Z value (Gaussian sigma) = " << zExp << endl;
double observed = 150;
double pObs = NumberCountingUtils::BinomialObsP(observed, bExpected, relativeBkgUncert);
double zObs = NumberCountingUtils::BinomialObsZ(observed, bExpected, relativeBkgUncert);
cout << "observed p-value =" << pObs << " Z value (Gaussian sigma) = " << zObs << endl;
double tau = 1;
double pExpWithTau = NumberCountingUtils::BinomialWithTauExpP(sExpected, bExpected, tau);
double zExpWithTau = NumberCountingUtils::BinomialWithTauExpZ(sExpected, bExpected, tau);
cout << "expected p-value =" << pExpWithTau << " Z value (Gaussian sigma) = " << zExpWithTau << endl;
double pObsWithTau = NumberCountingUtils::BinomialWithTauObsP(observed, bExpected, tau);
double zObsWithTau = NumberCountingUtils::BinomialWithTauObsZ(observed, bExpected, tau);
cout << "observed p-value =" << pObsWithTau << " Z value (Gaussian sigma) = " << zObsWithTau << endl;
}
The namespace RooFit contains mostly switches that change the behaviour of functions of PDFs (or othe...
Namespace for the RooStats classes.
- Author
- Kyle Cranmer
Definition in file rs_numbercountingutils.C.