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.