Shotgun threshold for sparse Erdos-R\'enyi graphs

Abstract

In the shotgun assembly problem for a graph, we are given the empirical profile for rooted neighborhoods of depth r (up to isomorphism) for some r≥ 1 and we wish to recover the underlying graph up to isomorphism. When the underlying graph is an Erdos-R\'enyi G(n, λn), we show that the shotgun assembly threshold r* ≈ n (λ2 γλ)-1 where γλ is the probability for two independent Poisson-Galton-Watson trees with parameter λ to be rooted isomorphic with each other. Our result sharpens a constant factor in a previous work by Mossel and Ross (2019) and thus solves a question therein.