Topological structure and entropy of mixing graph maps

Abstract

Let PG be the family of all topologically mixing, but not exact self-maps of a topological graph G. It is proved that the infimum of topological entropies of maps from PG is bounded from below by ( 3/ (G)), where (G) is a constant depending on the combinatorial structure of G. The exact value of the infimum on PG is calculated for some families of graphs. The main tool is a refined version of the structure theorem for mixing graph maps. It also yields new proofs of some known results, including Blokh's theorem (topological mixing implies specification property for maps on graphs).