Comparison results for capacity

Abstract

We obtain in this paper bounds for the capacity of a compact set K. If K is contained in an (n+1)-dimensional Cartan-Hadamard manifold, has smooth boundary, and the principal curvatures of ∂ K are larger than or equal to H0>0, then Cap(K)≥ (n-1)\,H0 vol(∂ K). When K is contained in an (n+1)-dimensional manifold with non-negative Ricci curvature, has smooth boundary, and the mean curvature of ∂ K is smaller than or equal to H0, we prove the inequality Cap(K)≤ (n-1)\,H0 vol(∂ K). In both cases we are able to characterize the equality case. Finally, if K is a convex set in Euclidean space Rn+1 which admits a supporting sphere of radius H0-1 at any boundary point, then we prove Cap(K)≥ (n-1)\,H0Hn(∂ K) and that equality holds for the round sphere of radius H0-1.