Graph limits of random graphs from a subset of connected k-trees

Abstract

For any set of non-negative integers such that \0,1\⊂eq and \0,1\ , we consider a random -k-tree Gn,k that is uniformly selected from all connected k-trees of (n+k) vertices where the number of (k+1)-cliques that contain any fixed k-clique belongs to . We prove that Gn,k, scaled by (kHkσ)/(2n) where Hk is the k-th Harmonic number and σ>0, converges to the Continuum Random Tree T e. Furthermore, we prove the local convergence of the rooted random -k-tree Gn,k to an infinite but locally finite random -k-tree G∞,k.