A (φns, φ)-Poincar\'e inequality in John domain

Abstract

Let be a bounded domain in Rn with n2 and s∈(0,1). Assume that φ : [0, ∞) [0, ∞) be a Young function obeying the doubling condition with the constant Kφ<2ns. We demonstrate that supports a (φns, φ)-Poincar\'e inequality if it is is a John domain. Alternately, assume further that is a bounded domain that is quasiconformally equivalent to some uniform domain when n3 or a simply connected domain when n=2. We demonstrate is a John domain if a (φns, φ)-Poincar\'e inequality holds.