Connectivity of inhomogeneous random graphs
Abstract
We find conditions for the connectivity of inhomogeneous random graphs with intermediate density. Our results generalize the classical result for G(n, p), when p = c log n/n. We draw n independent points Xi from a general distribution on a separable metric space, and let their indices form the vertex set of a graph. An edge (i,j) is added with probability min(1, (Xi,Xj) log n/n), where 0 is a fixed kernel. We show that, under reasonably weak assumptions, the connectivity threshold of the model can be determined.
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