Locally biH\"older continuous mappings and their induced embeddings between Besov spaces

Abstract

In this paper, we introduce a class of homeomorphisms between metric spaces, which are locally biH\"older continuous mappings. Then an embedding result between Besov spaces induced by locally biH\"older continuous mappings between Ahlfors regular spaces is established, which extends the corresponding result of Bj\"orn-Bj\"orn-Gill-Shanmugalingam (J. Reine Angew. Math. 725: 63-114, 2017). Furthermore, an example is constructed to show that our embedding result is more general. We also introduce a geometric condition, named as uniform boundedness, to characterize when a quasisymmetric mapping between uniformly perfect spaces is locally biH\"older continuous.