Measures maximizing the entropy for Kan endomorphisms

Abstract: In 1994, Kan provided the first example of maps with intermingled basins. The Kan example corresponds to a partially hyperbolic endomorphism defined on a surface, with the boundary exhibiting two intermingled hyperbolic physical measures. Both measures are supported on the boundary, and they also maximize the topological entropy. In this work, we prove the existence of a third hyperbolic measure supported in the interior of the cylinder that maximizes the entropy. We also prove this statement for a larger clas… Show more

“…The contrast of measurable and topological properties is an interesting subject for the study of dynamics. Very recently, there are some beautiful results focusing on topological transitivity of skew-products (see [Oku17,CO21]), and measures of maximal entropy for some general systems related to the Kan's endomorphism (see [NnRV21,RT22]).…”

Topological transitivity of Kan-type partially hyperbolic diffeomorphisms

“…The contrast of measurable and topological properties is an interesting subject for the study of dynamics. Very recently, there are some beautiful results focusing on topological transitivity of skew-products (see [Oku17,CO21]), and measures of maximal entropy for some general systems related to the Kan's endomorphism (see [NnRV21,RT22]).…”

Topological transitivity of Kan-type partially hyperbolic diffeomorphisms

Equilibrium States for Partially Hyperbolic Maps with One-Dimensional Center

Topological transitivity of Kan-type partially hyperbolic diffeomorphisms