Distance Reconstruction of Sparse Random Graphs

Abstract

In the distance query model, we are given access to the vertex set of a n-vertex graph G, and an oracle that takes as input two vertices and returns the distance between these two vertices in G. We study how many queries are needed to reconstruct the edge set of G when G is sampled according to the G(n,p) Erdos-Renyi-Gilbert distribution. Our approach applies to a large spectrum of values for p starting slightly above the connectivity threshold: p ≥ 2000 nn. We show that there exists an algorithm that reconstructs G G(n,p) using O( 2 n n ) queries in expectation, where is the expected average degree of G. In particular, for p ∈ [2000 nn, 2 nn] the algorithm uses O(n 5 n) queries.

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