On the strength of connectedness of unions of random graphs

Abstract

Let G1,…, Gm be independent identically distributed random subgraphs of the complete graph Kn. We analyse the threshold behaviour of the strength of connectedness of the union i=1mGi defined on the vertex set of Kn. Let a=\t 1:\, P\δ(G1)=t>0\\ be the minimal non zero vertex degree attained with positive probability. Given k 0 let λ(k)= n+kmn-mn E X, where X stands for the number of non isolated vertices of G1. Letting n,m+∞ we show that P\i=1mGi is a(k+1)-connected\ 1 for λ(k) -∞, and P\i=1mGi is ak+1-connected\ 0 for λ(k) +∞. In particular, the connectivity strength of the union graph i=1mGi increases in steps of size a. Our results are obtained in a more general setting where the contributing random subgraphs do not need to be identically distributed.