Orlicz-Besov imbedding and globally n-regular domains

Abstract

Denote by Bα,φ() the Orlicz-Besov space, where α∈R, φ is a Young function and ⊂Rn is a domain. For α∈(-n,0) and optimal φ, in this paper we characterize domains supporting the imbedding Bα,φ() into Ln/|α|() via globally n-regular domains. This extends the known characterizations for domains supporting the Besov imbedding B spp() into Lnp/(n-sp)() with s∈(0,1) and 1 p<n/s. The proof of the imbedding Bα,φ() Ln/|α|() in globally n-regular domains relies on a geometric inequality involving φ and , which extends a known geometric inequality of Caffarelli et al.