Testing Ising Models

Author(s)

Daskalakis, Constantinos; Dikkala, Sai Nishanth

Abstract

Given samples from an unknown multivariate distribution p, is it possible to distinguish whether p is the product of its marginals versus p being far from every product distribution? Similarly, is it possible to distinguish whether p equals a given distribution q versus p and q being far from each other? These problems of testing independence and goodness-of-fit have received enormous attention in statistics, information theory, and theoretical computer science, with sample-optimal algorithms known in several interesting regimes of parameters. Unfortunately, it has also been understood that these problems become intractable in large dimensions, necessitating exponential sample complexity. Motivated by the exponential lower bounds for general distributions as well as the ubiquity of Markov random fields (MRFs) in the modeling of high-dimensional distributions, we initiate the study of distribution testing on structured multivariate distributions, and in particular, the prototypical example of MRFs: the Ising Model. We demonstrate that, in this structured setting, we can avoid the curse of dimensionality, obtaining sample, and time efficient testers for independence and goodness-of-fit. One of the key technical challenges we face along the way is bounding the variance of functions of the Ising model.

Date issued

2019-11

URI

https://hdl.handle.net/1721.1/129990

Department

Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science

Journal

IEEE Transactions on Information Theory

Publisher

Institute of Electrical and Electronics Engineers (IEEE)

Citation

Daskalakis, Constantinos et al. “Testing Ising Models.” IEEE Transactions on Information Theory, 65, 11 (November 2019): 6829 - 6852 © 2019 The Author(s)

Version: Author's final manuscript

ISSN

0018-9448