Low-Degree Hardness of Detection for Correlated Erdos-R\'enyi Graphs

Abstract

Given two Erdos-R\'enyi graphs with n vertices whose edges are correlated through a latent vertex correspondence, we study complexity lower bounds for the associated correlation detection problem for the class of low-degree polynomial algorithms. We provide evidence that any degree-O(-1) polynomial algorithm fails for detection, where is the edge correlation. Furthermore, in the sparse regime where the edge density q=n-1+o(1), we provide evidence that any degree-d polynomial algorithm fails for detection, as long as d=o( n nq n ) and the correlation <α where α≈ 0.338 is the Otter's constant. Our result suggests that several state-of-the-art algorithms on correlation detection and exact matching recovery may be essentially the best possible.

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