Reconstructing a point set from a random subset of its pairwise distances

Abstract

Let V be a set of n points on the real line. Suppose that each pairwise distance is known independently with probability p. How much of V can be reconstructed up to isometry? We prove that p = ( n)/n is a sharp threshold for reconstructing all of V which improves a result of Benjamini and Tzalik. This follows from a hitting time result for the random process where the pairwise distances are revealed one-by-one uniformly at random. We also show that 1/n is a weak threshold for reconstructing a linear proportion of V.