Permutations with restricted movement

Abstract

A restricted permutation of a locally finite directed graph G=(V,E) is a vertex permutation π: V V for which (v,π(v))∈ E, for any vertex v∈ V. The set of such permutations, denoted by (G), with a group action induced from a subset of graph isomorphisms form a topological dynamical system. We focus on the particular case presented by Schmidt and Strasser (2016) of restricted Zd permutations, in which (G) is a subshift of finite type. We show a correspondence between restricted permutations and perfect matchings (also known as dimer coverings). We use this correspondence in order to investigate and compute the topological entropy in a class of cases of restricted Zd-permutations. We discuss the global and local admissibility of patterns, in the context of restricted Zd-permutations. Finally, we review the related models of injective and surjective restricted functions.