On random k-out sub-graphs of large graphs

Abstract

We consider random sub-graphs of a fixed graph G=(V,E) with large minimum degree. We fix a positive integer k and let Gk be the random sub-graph where each v∈ V independently chooses k random neighbors, making kn edges in all. When the minimum degree δ(G)≥ (12+ε)n,\,n=|V| then Gk is k-connected w.h.p. for k=O(1); Hamiltonian for k sufficiently large. When δ(G) ≥ m, then Gk has a cycle of length (1-ε)m for k≥ kε. By w.h.p. we mean that the probability of non-occurrence can be bounded by a function φ(n) (or φ(m)) where n∞φ(n)=0.