Multipodal Structure and Phase Transitions in Large Constrained Graphs

Abstract

We study the asymptotics of large, simple, labeled graphs constrained by the densities of edges and of k-star subgraphs, k 2 fixed. We prove that under such constraints graphs are "multipodal": asymptotically in the number of vertices there is a partition of the vertices into M < ∞ subsets V1, V2, …, VM, and a set of well-defined probabilities gij of an edge between any vi ∈ Vi and vj ∈ Vj. For 2 k 30 we determine the phase space: the combinations of edge and k-star densities achievable asymptotically. For these models there are special points on the boundary of the phase space with nonunique asymptotic (graphon) structure; for the 2-star model we prove that the nonuniqueness extends to entropy maximizers in the interior of the phase space.