Rotation numbers and rotation classes on one-dimensional tiling spaces

Abstract

We extend rotation theory of circle maps to tiling spaces. Specifically, we consider a 1-dimensional tiling space with finite local complexity and study self-maps F that are homotopic to the identity and whose displacements are strongly pattern equivariant (sPE). In place of the familiar rotation number we define a cohomology class [μ]. We prove existence and uniqueness results for this class, develop a notion of irrationality, and prove an analogue of Poncar\'e's Theorem: If [μ] is irrational, then F is semi-conjugate to uniform translation on a space μ of tilings that is homeomorphic to . In such cases, F is semi-conjugate to uniform translation on itself if and only if [μ] lies in a certain subspace of the first cohomology group of .