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Learning a Tree-Structured Ising Model in Order to Make Predictions

Statistics Theory 2018-06-15 v3 Information Theory math.IT Probability Machine Learning Statistics Theory

Abstract

We study the problem of learning a tree Ising model from samples such that subsequent predictions made using the model are accurate. The prediction task considered in this paper is that of predicting the values of a subset of variables given values of some other subset of variables. Virtually all previous work on graphical model learning has focused on recovering the true underlying graph. We define a distance ("small set TV" or ssTV) between distributions PP and QQ by taking the maximum, over all subsets S\mathcal{S} of a given size, of the total variation between the marginals of PP and QQ on S\mathcal{S}; this distance captures the accuracy of the prediction task of interest. We derive non-asymptotic bounds on the number of samples needed to get a distribution (from the same class) with small ssTV relative to the one generating the samples. One of the main messages of this paper is that far fewer samples are needed than for recovering the underlying tree, which means that accurate predictions are possible using the wrong tree.

Keywords

Cite

@article{arxiv.1604.06749,
  title  = {Learning a Tree-Structured Ising Model in Order to Make Predictions},
  author = {Guy Bresler and Mina Karzand},
  journal= {arXiv preprint arXiv:1604.06749},
  year   = {2018}
}

Comments

43 pages, 7 figure

R2 v1 2026-06-22T13:38:50.581Z