Exact Goodness-of-Fit Testing for the Ising Model

Author(s)

Martín del Campo, Abraham; Cepeda, Sarah; Uhler, Caroline

Abstract

The Ising model is one of the simplest and most famous models of interacting systems. It was originally proposed to model ferromagnetic interactions in statistical physics and is now widely used to model spatial processes in many areas such as ecology, sociology, and genetics, usually without testing its goodness of fit. Here, we propose various test statistics and an exact goodness-of-fit test for the finite-lattice Ising model. The theory of Markov bases has been developed in algebraic statistics for exact goodness-of-fit testing using a Monte Carlo approach. However, finding a Markov basis is often computationally intractable. Thus, we develop a Monte Carlo method for exact goodness-of-fit testing for the Ising model that avoids computing a Markov basis and also leads to a better connectivity of the Markov chain and hence to a faster convergence. We show how this method can be applied to analyze the spatial organization of receptors on the cell membrane.

Date issued

2017-05

URI

http://hdl.handle.net/1721.1/111096

Department

Massachusetts Institute of Technology. Institute for Data, Systems, and Society
Massachusetts Institute of Technology. Laboratory for Information and Decision Systems

Journal

Scandinavian Journal of Statistics

Publisher

Wiley Blackwell

Citation

Martín del Campo, Abraham et al. “Exact Goodness-of-Fit Testing for the Ising Model.” Scandinavian Journal of Statistics 44, 2 (June 2017): 285-306 © 2016 Board of the Foundation of the Scandinavian Journal of Statistics

Version: Original manuscript

ISSN

0303-6898

1467-9469