Homotopy Covers of Graphs

Abstract

We develop a theory of ×-homotopy, fundamental groupoids and covering spaces that apply to non-simple graphs, generalizing existing results for simple graphs. We prove that ×-homotopies from finite graphs can be decomposed into moves which adjust at most one vertex at a time, generalizing the spider lemma of CS1. We define a notion of homotopy covering map and develop a theory of universal covers and deck transformations, generalizing TardifWroncha, Matsushita to non-simple graphs. We examine the case of reflexive graphs, where each vertex has at least one loop. We also prove that these homotopy covering maps satisfy a homotopy lifting property for arbitrary graph homomorphisms, generalizing path lifting results of Matsushita, TardifWroncha.