Automatic Logarithm and Associated Measures

Abstract

We introduce the notion of the Automatic Logarithm L A, B with the purpose of studying the expanding properties of Schreier graphs of action of the group generated by two finite initial Mealy automata A and B on the levels of a regular d-ary rooted tree T, where A is level-transitive and of bounded activity. L A, B computes the lengths of chords in this family of graphs. Formally, L is a map ∂ T → Zd from the boundary of the tree to the integer p-adics whose values are determined by a Moore machine. The distribution of its outputs yields a probabilistic measure μ on ∂ T, which in some cases can be computed by a Mealy-type machine (we then say that μ is finite-state). We provide a criterion to determine whether μ is finite-state. A number of examples illustrating the different cases with A being the adding machine is provided.