Normal and stable approximation to subgraph counts in superpositions of Bernoulli random graphs
Abstract
The clustering property of complex networks indicates the abundance of small dense subgraphs in otherwise sparse networks. For a community-affiliation network defined by a superposition of Bernoulli random graphs, which has a nonvanishing global clustering coefficient and a power-law degree distribution, we establish normal and α--stable approximations to the number of small cliques, cycles and more general 2-connected subgraphs.
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