k-connectivity threshold for superpositions of Bernoulli random graphs
Abstract
Let G1,…, Gm be independent identically distributed Bernoulli random subgraphs of the complete graph Kn having vertex sets of random sizes X1,…, Xm∈ \0,1,2,…\ and random edge densities Q1,…, Qm∈ [0,1]. Assuming that each Gi has a vertex of degree 1 with positive probability, we establish the k-connectivity threshold as n,m+∞ for the union i=1mGi defined on the vertex set of Kn.
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