Hardy and Rellich inequalities on the complement of convex sets

Abstract

We establish existence of weighted Hardy and Rellich inequalities on the spaces Lp() where = d K with K a closed convex subset of d. Let =∂ denote the boundary of and d the Euclidean distance to . We consider weighting functions c=c d with c(s)=sδ(1+s)δ'-δ and δ,δ'≥0. Then the Hardy inequalities take the form \[ ∫ c\,|∇|p≥ bp∫ c\,d\;-p\,||p \] and the Rellich inequalities are given by \[ ∫|H|p≥ dp∫ |c\,d\,-2|p \] with H=-(c∇). The constants bp, dp depend on the weighting parameter δ,δ'≥0 and the Hausdorff dimension of the boundary. We compute the optimal constants in a broad range of situations.