Almost-perfect packings and Tuza's conjecture in the random geometric graph

Abstract

The triangle packing number ν(G) of a graph G is the maximum size of a set of edge-disjoint triangles in G. Tuza conjectured that in any graph G there exists a set of at most 2ν(G) edges intersecting every triangle in G. We show that Tuza's conjecture holds in the random geometric graph for a large range of densities. We also study the problem of covering almost all edges of the random geometric graph with edge-disjoint copies of some fixed graph F. In particular, we show the existence of almost-perfect packings for an infinite family of F, and state some negative results as well.