Litcius/Paper detail

<b>BFpack</b>: Flexible Bayes Factor Testing of Scientific Theories in <i>R</i>

Joris Mulder, Donald R. Williams, Xin Gu, Andrew J. Tomarken, Florian Böing-Messing, Anton Olsson-Collentine, Marlyne Meijerink-Bosman, Janosch Menke, Robbie Van Aert, Jean‐Paul Fox, Herbert Hoijtink, Yves Rosseel, Eric‐Jan Wagenmakers, Caspar J. Van Lissa

2021Journal of Statistical Software55 citationsDOIOpen Access PDF

Abstract

There have been considerable methodological developments of Bayes factors for hypothesis testing in the social and behavioral sciences, and related fields. This development is due to the flexibility of the Bayes factor for testing multiple hypotheses simultaneously, the ability to test complex hypotheses involving equality as well as order constraints on the parameters of interest, and the interpretability of the outcome as the weight of evidence provided by the data in support of competing scientific theories. The available software tools for Bayesian hypothesis testing are still limited however. In this paper we present a new R package called BFpack that contains functions for Bayes factor hypothesis testing for the many common testing problems. The software includes novel tools for (i) Bayesian exploratory testing (e.g., zero vs positive vs negative effects), (ii) Bayesian confirmatory testing (competing hypotheses with equality and/or order constraints), (iii) common statistical analyses, such as linear regression, generalized linear models, (multivariate) analysis of (co)variance, correlation analysis, and random intercept models, (iv) using default priors, and (v) while allowing data to contain missing observations that are missing at random.

Topics & Concepts

Bayes factorInterpretabilityStatistical hypothesis testingBayesian probabilityBayes' theoremPrior probabilityComputer scienceEconometricsMarginal likelihoodMachine learningMathematicsData miningStatisticsArtificial intelligenceSensory Analysis and Statistical MethodsAdvanced Statistical Methods and ModelsStatistical Methods and Bayesian Inference