Local Large deviation: A McMillian Theorem for Coloured Random Graph Processes

Abstract

For a finite typed graph on n nodes and with type law μ, we define the so-called spectral potential λ(\,·,\,μ), of the graph.From the λ(\,·,\,μ) we obtain Kullback action or the deviation function, Hλ(π\,\|\,), with respect to an empirical pair measure, π, as the Legendre dual. For the finite typed random graph conditioned to have an empirical link measure π and empirical type measure μ, we prove a Local large deviation principle (LLDP), with rate function Hλ(π\,\|\,) and speed n. We deduce from this LLDP, a full conditional large deviation principle and a weak variant of the classical McMillian Theorem for the typed random graphs. Given the typical empirical link measure, λμμ, the number of typed random graphs is approximately equal en\|λμμ\|H(λμμ/\|λμμ\|). Note that we do not require any topological restrictions on the space of finite graphs for these LLDPs.