Shotgun Assembly of Erdos-Renyi Random Graphs

Abstract

Graph shotgun assembly refers to the problem of reconstructing a graph from a collection of local neighborhoods. In this paper, we consider shotgun assembly of random graphs G(n, pn), where pn = n-α for 0 < α < 1. We consider both reconstruction up to isomorphism as well as exact reconstruction (recovering the vertex labels as well as the structure). We show that given the collection of distance-1 neighborhoods, G is exactly reconstructable for 0 < α < 13, but not reconstructable for 12 < α < 1. Given the collection of distance-2 neighborhoods, G is exactly reconstructable for α ∈ (0, 12) (12, 35), but not reconstructable for 34 < α < 1.