A combinatorial proof of Aldous-Broder theorem for general Markov chains

Abstract

Aldous-Broder algorithm is a famous algorithm used to sample a uniform spanning tree of any finite connected graph G, but it is more general: given an irreducible and reversible Markov chain M on G started at r, the tree rooted at r formed by the first entrance steps in each node (different from the root) has a probability proportional to Πe=(e-,e+)∈ Edges(t,r) Me-,e+, where the edges are directed toward r. In this paper we give proofs of Aldous-Broder theorem in the general case, where the kernel M is irreducible but not assumed to be reversible (this generalized version appeared recently in Hu, Lyons and Tang )