A binned likelihood for stochastic models

A bstractMetrics of model goodness-of-fit, model comparison, and model parameter estimation are the main categories of statistical problems in science. Bayesian and frequentist methods that address these questions often rely on a likelihood function, which is the key ingredient in order to assess the plausibility of model parameters given observed data. In some complex systems or experimental setups, predicting the outcome of a model cannot be done analytically, and Monte Carlo techniques are used. In this paper, we present a new analytic likelihood that takes into account Monte Carlo uncertainties, appropriate for use in the large and small sample size limits. Our formulation performs better than semi-analytic methods, prevents strong claims on biased statements, and provides improved coverage properties compared to available methods.

[1]  Anna Gerber Statistics For Nuclear And Particle Physicists , 2016 .

[2]  G. Zech,et al.  Statistics of weighted Poisson events and its applications , 2013, 1309.1287.

[3]  Robert Cousins,et al.  Incorporating systematic uncertainties into an upper limit , 1992 .

[4]  Daniel Foreman-Mackey,et al.  emcee: The MCMC Hammer , 2012, 1202.3665.

[5]  Probabilistic treatment of the uncertainty from the finite size of weighted Monte Carlo data , 2018, The European Physical Journal Plus.

[6]  J. Lykken,et al.  Exploring theory space with Monte Carlo reweighting , 2014, 1404.7129.

[7]  M. Malek,et al.  Measurement of neutrino and antineutrino oscillations by the T2K experiment including a new additional sample of nu(e) interactions at the far detector , 2017, 1707.01048.

[8]  Daniel Fink A Compendium of Conjugate Priors , 1997 .

[9]  M. Hartz,et al.  Search for CP Violation in Neutrino and Antineutrino Oscillations by the T2K Experiment with 2.2×10^{21} Protons on Target. , 2018, Physical review letters.

[10]  K. Pearson On the Criterion that a Given System of Deviations from the Probable in the Case of a Correlated System of Variables is Such that it Can be Reasonably Supposed to have Arisen from Random Sampling , 1900 .

[11]  D. Ernst,et al.  Neutrino oscillations: The ILL experiment revisited , 2018, Physical Review D.

[12]  K. Cranmer,et al.  HistFactory: A tool for creating statistical models for use with RooFit and RooStats , 2012 .

[13]  Karl Pearson F.R.S. X. On the criterion that a given system of deviations from the probable in the case of a correlated system of variables is such that it can be reasonably supposed to have arisen from random sampling , 2009 .

[14]  Siméon-Denis Poisson Recherches sur la probabilité des jugements en matière criminelle et en matiére civile, précédées des règles générales du calcul des probabilités , 1837 .

[15]  D. Chirkin Likelihood description for comparing data with simulation of limited statistics , 2013, 1304.0735.

[16]  Roger Barlow,et al.  Fitting using finite Monte Carlo samples , 1993 .

[17]  G. Cowan Statistical data analysis , 1998 .

[18]  I. Low,et al.  The infrared structure of Nambu-Goldstone bosons , 2018, Journal of High Energy Physics.