The Dynamics of One-Dimensional Quasi-Affine Maps

Abstract

We study the dynamics of the one-dimensional quasi-affine map x λ x +μ , providing a complete description of the map's periodic points, and of the limit points of every x∈R under the map, for all real parameter values. Specifically, we establish the existence of regions of parameter values for which the map possesses n fixed points for all n∈N0 \∞\, an explicit formula for the number of 2-cycles possessed by the map, and the ω-limit set of any x∈R under the map, which, depending on the parameter values, is either a singleton of a fixed point, a 2-cycle, \-∞,∞\, \∞\, or \-∞\.