A note on target distribution ambiguity of likelihood-free samplers

Methods for Bayesian simulation in the presence of computationally intractable likelihood functions are of growing interest. Termed likelihood-free samplers, standard simulation algorithms such as Markov chain Monte Carlo have been adapted for this setting. In this article, by presenting generalisations of existing algorithms, we demonstrate that likelihood-free samplers can be ambiguous over the form of the target distribution. We also consider the theoretical justification of these samplers. Distinguishing between the forms of the target distribution may have implications for the future development of likelihood-free samplers.

[1]  P. Donnelly,et al.  Inferring coalescence times from DNA sequence data. , 1997, Genetics.

[2]  S. Coles,et al.  Inference for Stereological Extremes , 2007 .

[3]  Jinhong Yuan,et al.  Bayesian Symbol Detection in Wireless Relay Networks via Likelihood-Free Inference , 2010, IEEE Transactions on Signal Processing.

[4]  Mark M. Tanaka,et al.  Sequential Monte Carlo without likelihoods , 2007, Proceedings of the National Academy of Sciences.

[5]  M. Feldman,et al.  Population growth of human Y chromosomes: a study of Y chromosome microsatellites. , 1999, Molecular biology and evolution.

[6]  Paul Fearnhead,et al.  Semi-automatic Approximate Bayesian Computation , 2010 .

[7]  D. Balding,et al.  Approximate Bayesian computation in population genetics. , 2002, Genetics.

[8]  Gareth W. Peters,et al.  On sequential Monte Carlo, partial rejection control and approximate Bayesian computation , 2008, Statistics and Computing.

[9]  Paul Marjoram,et al.  Markov chain Monte Carlo without likelihoods , 2003, Proceedings of the National Academy of Sciences of the United States of America.

[10]  L. Excoffier,et al.  Efficient Approximate Bayesian Computation Coupled With Markov Chain Monte Carlo Without Likelihood , 2009, Genetics.

[11]  David Welch,et al.  Approximate Bayesian computation scheme for parameter inference and model selection in dynamical systems , 2009, Journal of The Royal Society Interface.

[12]  Arnaud Doucet,et al.  An adaptive sequential Monte Carlo method for approximate Bayesian computation , 2011, Statistics and Computing.

[13]  S. Sisson,et al.  Likelihood-free Markov chain Monte Carlo , 2010, 1001.2058.