Determining a Points Configuration from a Subset of the Pairwise Distances

Abstract

We study rigidity without assuming general position. Given n distinct labelled points and a set P⊂eq [n]2 of revealed pairs, we ask when the corresponding distances determine the configuration up to isometry. On the line, we prove an extremal result: if |P|=Ω(n3/2), then there is an induced globally rigid subgraph on Ω(|P|/n) vertices. In other words, any dense enough graph will contain a subset of labels whose locations can be determined from their distances up to isometry. To prove this, we establish a graph-theoretic result, which may be of independent interest: a dense graph in which every non-edge has few common neighbours contains a clique of size Ω(|E|/n). We also study random revealed pairs. For every labelled configuration V of distinct points in R, if each pair is revealed independently with probability p=C n/n, where C>1, then the revealed distances determine V w.h.p. We prove a similar result for d1 under the mild non-degeneracy assumption that every subcollection of more than τn points of V⊂eq Rd affinely spans Rd, for some fixed 0<τ<1. In this case, every C>1/(1-τ) suffices. The same ideas also settle the weak-threshold form of a conjecture of Girão et al. for a giant reconstructable component, and substantially improve in this direction the work of Barnes et al. establishing such a component for p>n-2/(d+4).