Shotgun assembly of random graphs

Abstract

In the graph shotgun assembly problem, we are given the balls of radius r around each vertex of a graph and asked to reconstruct the graph. We study the shotgun assembly of the Erdos-R\'enyi random graph G(n,p) for a wide range of values of r. We determine the threshold for reconstructibility for each r≥ 3, extending and improving substantially on results of Mossel and Ross for r=3. For r=2, we give upper and lower bounds that improve on results of Gaudio and Mossel by polynomial factors. We also give a sharpening of a result of Huang and Tikhomirov for r=1.

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