Sandwiching Random Geometric Graphs and Erdos-Renyi with Applications: Sharp Thresholds, Robust Testing, and Enumeration

Abstract

The distribution RGG(n,Sd-1,p) is formed by sampling independent vectors \Vi\i = 1n uniformly on Sd-1 and placing an edge between pairs of vertices i and j for which Vi,Vj τpd, where τpd is such that the expected density is p. Our main result is a poly-time implementable coupling between Erdos-R\'enyi and RGG such that G(n,p(1 - O(np/d)))⊂eq RGG(n,Sd-1,p)⊂eq G(n,p(1 + O(np/d))) edgewise with high probability when d np. We apply the result to: 1) Sharp Thresholds: We show that for any monotone property having a sharp threshold with respect to the Erdos-R\'enyi distribution and critical probability pcn, random geometric graphs also exhibit a sharp threshold when d npcn, thus partially answering a question of Perkins. 2) Robust Testing: The coupling shows that testing between G(n,p) and RGG(n,Sd-1,p) with ε n2p adversarially corrupted edges for any constant ε>0 is information-theoretically impossible when d np. We match this lower bound with an efficient (constant degree SoS) spectral refutation algorithm when d np. 3) Enumeration: We show that the number of geometric graphs in dimension d is at least (dn-7n), recovering (up to the log factors) the sharp result of Sauermann.