Bayesian inference of planted matchings: Local posterior approximation and infinite-volume limit

Abstract

We study Bayesian inference of an unknown matching π* between two correlated random point sets \Xi\i=1n and \Yi\i=1n in [0,1]d, under a critical scaling \|Xi-Yπ*(i)\|2 n-1/d, in both an exact matching model where all points are observed and a partial matching model where a fraction of points may be missing. Restricting to the simplest setting of d=1, in this work, we address the questions of (1) whether the posterior distribution over matchings is approximable by a local algorithm, and (2) whether marginal statistics of this posterior have a well-defined limit as n ∞. We answer both questions affirmatively for partial matching, where a decay-of-correlations arises for large n. For exact matching, we show that the posterior is approximable locally only after a global sorting of the points, and that defining a large-n limit of marginal statistics requires a careful indexing of points in the Poisson point process limit of the data, based on a notion of flow. We leave as an open question the extensions of such results to dimensions d ≥ 2.

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