Orlicz-Besov extension and Ahlfors n-regular domains

Abstract

Let n2 and φ : [0,) [0,∞) be a Young's function satisfying x>0 ∫01φ( t x) φ(x)dttn+1 <∞. We show that Ahlfors n-regular domains are Besov-Orlicz Bφ extension domains, which is necessary to guarantee the nontrivially of Bφ. On the other hand, assume that φ grows sub-exponentially at additionally. If is a Besov-Orlicz Bφ extension domain, then it must be Ahlfors n-regular.