The intersection of a random geometric graph with an Erdos-R\'enyi graph

Abstract

We study the intersection of a random geometric graph with an Erdos-R\'enyi graph. Specifically, we generate the random geometric graph G(n, r) by choosing n points uniformly at random from D=[0, 1]2 and joining any two points whose Euclidean distance is at most r. We let G(n, p) be the classical Erdos-R\'enyi graph, i.e. it has n vertices and every pair of vertices is adjacent with probability p independently. In this note we study G(n, r, p):=G(n, r) G(n, p). One way to think of this graph is that we take G(n, r) and then randomly delete edges with probability 1-p independently. We consider the clique number, independence number, connectivity, Hamiltonicity, chromatic number, and diameter of this graph where both p(n) 0 and r(n) 0; the same model was studied by Kahle, Tian and Wang (2023) for r(n) 0 but p fixed.

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