Rigidity and tolerance for perturbed lattices

Abstract

A perturbed lattice is a point process =\x+Yx:x∈ Zd\ where the lattice points in Zd are perturbed by i.i.d.\ random variables \Yx\x∈ Zd. A random point process is said to be rigid if | B0(1)|, the number of points in a ball, can be exactly determined given B0(1), the points outside the ball. The process is called deletion tolerant if removing one point of yields a process with distribution indistinguishable from that of . Suppose that Yx Nd(0,σ2 I) are Gaussian vectors with with d independent components of variance σ2. Holroyd and Soo showed that in dimensions d=1,2 the resulting Gaussian perturbed lattice is rigid and deletion intolerant. We show that in dimension d≥ 3 there exists a critical parameter σr(d) such that is rigid if σ<σr and deletion tolerant (hence non-rigid) if σ>σr.