Neighborhood properties of complex networks

Abstract

A concept of neighborhood in complex networks is addressed based on the criterion of the minimal number os steps to reach other vertices. This amounts to, starting from a given network R1, generating a family of networks R, =2,3,... such that, the vertices that are steps apart in the original R1, are only 1 step apart in R. The higher order networks are generated using Boolean operations among the adjacency matrices M that represent R. The families originated by the well known linear and the Erd\"os-Renyi networks are found to be invariant, in the sense that the spectra of M are the same, up to finite size effects. A further family originated from small world network is identified.

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