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The Characterization of Monte Carlo Errors for the Quantification of the Value of Forensic Evidence

NCJ Number
252364
Journal
Journal of Statistical Computation and Simulation Volume: 87 Issue: 8 Dated: 2017 Pages: 1608-1643
Author(s)
Danica M. Ommen; Christopher P. Saunders; Cedric Neumann
Date Published
2017
Length
36 pages
Annotation
This article reports on the development of a generally applicable method for characterizing the numerical error associated with Monte Carlo integration techniques used in constructing the Bayes Factor.
Abstract
Recent developments in forensic science have precipitated a proliferation of methods for quantifying the probative value of evidence by constructing a Bayes Factor that allows a decision-maker to select between the prosecution and defense models. Unfortunately, the analytical form of a Bayes Factor is often computationally intractable. A typical approach in statistics uses Monte Carlo integration to numerically approximate the marginal likelihoods composing the Bayes Factor. The current article describes the derivation of an asymptotic Monte Carlo standard error (MCSE) for the Bayes Factor, and its applicability to quantifying the value of evidence is explored, using a simulation-based example involving a benchmark data set. The simulation also explores the effect of prior choice on the Bayes Factor approximations and corresponding MCSEs. (Publisher abstract modified)