Schreier graphs of the Basilica group

Abstract

With any self-similar action of a finitely generated group G of automorphisms of a regular rooted tree T can be naturally associated an infinite sequence of finite graphs \n\n≥ 1, where n is the Schreier graph of the action of G on the n-th level of T. Moreover, the action of G on ∂ T gives rise to orbital Schreier graphs , ∈ ∂ T. Denoting by n the prefix of length n of the infinite ray , the rooted graph (,) is then the limit of the sequence of finite rooted graphs \(n,n)\n≥ 1 in the sense of pointed Gromov-Hausdorff convergence. In this paper, we give a complete classification (up to isomorphism) of the limit graphs (,) associated with the Basilica group acting on the binary tree, in terms of the infinite binary sequence .