D. E. Edmunds¹ and R. Hurri–Syrjänen²

Copyright © 1997 D. E. Edmunds and R. Hurri–Syrjänen. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let D be an open subset of ℝn(n≥2) with finite Lebesgue n-measure, let d(x) be the distance from x∈ℝn to the boundary ∂D of D, and let 1<p<∞. We give a simple direct proof that if ℝn\D satisfies the plumpness condition of Martio and Väisälä [10], then the inequality of Hardy type, ∫D(|u(x)|/dα(x))pdx≤C∫D(|∇u(x)|/dβ(x))pdx,  u∈C0∞(D), holds whenever β≥max{0,α−1}. We also show that the plumpness condition may be replaced by ones. which enable domains with lower-dimensional portions of their boundaries to be handled.