A family of partitions of the set of walks on a directed graph

Abstract

We present a family of partitions of WG, the set of walks on a directed graph G. Each partition in this family is identified by an integer sequence K, which specifies a collection of cycles on G with a certain well-defined structure. We term such cycles resummable, and a walk that does not traverse any such cycles K-irreducible. For a given value of K, the corresponding partition of WG consists of a collection of cells that each contain a single K-irreducible walk i plus all walks that can be formed from i by attaching one or more resummable cycles to its vertices. We characterise the entire family of partitions of WG by giving explicit expressions for the structure of the K-irreducible walks and the resummable cycles for arbitrary values of K. We demonstrate how these results can be exploited to recast the sum over all walks on a directed graph as a sum over dressed K-irreducible walks, and discuss the applications of this reformulation to matrix computations.