English

Rigidity and tolerance for perturbed lattices

Probability 2014-09-17 v1

Abstract

A perturbed lattice is a point process Π={x+Yx:xZd}\Pi=\{x+Y_x:x\in \mathbb{Z}^d\} where the lattice points in Zd\mathbb{Z}^d are perturbed by i.i.d.\ random variables {Yx}xZd\{Y_x\}_{x\in \mathbb{Z}^d}. A random point process Π\Pi is said to be rigid if ΠB0(1)|\Pi\cap B_0(1)|, the number of points in a ball, can be exactly determined given ΠB0(1)\Pi \setminus B_0(1), the points outside the ball. The process Π\Pi is called deletion tolerant if removing one point of Π\Pi yields a process with distribution indistinguishable from that of Π\Pi. Suppose that YxNd(0,σ2I)Y_x\sim N_d(0,\sigma^2 I) are Gaussian vectors with with dd independent components of variance σ2\sigma^2. Holroyd and Soo showed that in dimensions d=1,2d=1,2 the resulting Gaussian perturbed lattice Π\Pi is rigid and deletion intolerant. We show that in dimension d3d\geq 3 there exists a critical parameter σr(d)\sigma_r(d) such that Π\Pi is rigid if σ<σr\sigma<\sigma_r and deletion tolerant (hence non-rigid) if σ>σr\sigma>\sigma_r.

Keywords

Cite

@article{arxiv.1409.4490,
  title  = {Rigidity and tolerance for perturbed lattices},
  author = {Yuval Peres and Allan Sly},
  journal= {arXiv preprint arXiv:1409.4490},
  year   = {2014}
}
R2 v1 2026-06-22T05:57:30.106Z