Embedding asymptotically expansive system

Abstract

We prove a Krieger like embedding theorem for asymptotically expansive systems with the small boundary property. We show that such a system (X; T) embeds in the K-full shift with htop(T) < K and Pern(X; T) ≤ Pern(\1,...,K\Z;σ) for any integer n. The embedding is in general not continuous (unless the system is expansive and X is zero-dimensional) but the induced map on the set of invariant measures is a topological embedding. It is shown that this property implies asymptotical expansiveness. We prove also that the inverse of the embedding map may be continuously extended to a faithful principal symbolic extension.