Topological entropy in totally disconnected locally compact groups

Abstract

Let G be a topological group, let φ be a continuous endomorphism of G and let H be a closed φ-invariant subgroup of G. We study whether the topological entropy is an additive invariant, that is, htop(φ)=htop(φH)+htop(φ)\,, where φ:G/H G/H is the map induced by φ. We concentrate on the case when G is locally compact totally disconnected and H is either compact or normal. Under these hypotheses, we show that the above additivity property holds true whenever φ H=H and (φ)≤ H. As an application we give a dynamical interpretation of the scale s(φ), by showing that s(φ) is the topological entropy of a suitable map induced by φ. Finally, we give necessary and sufficient conditions for the equality s(φ)=htop(φ) to hold.