Strong Detection Threshold for Correlated Erdos-R\'enyi Graphs with Constant Average Degree

Abstract

Consider a pair of correlated Erdos-R\'enyi graphs G(n,λn;s) that are subsampled from a common parent Erdos-R\'enyi graph with average degree λ and subsampling probability s. We establish a sharp information-theoretic threshold for the detection problem between this model and two independent Erdos-R\'enyi graphs G(n,λn), showing that strong detection is information-theoretically possible if and only if s>\ 1λ, α \ where α≈ 0.338 is the Otter's constant. Our result resolves a constant gap between arXiv:2203.14573 and arXiv:2008.10097.