An optimal pointwise Morrey-Sobolev inequality

Abstract

Let be a bounded, smooth domain of RN, N≥1. For each p>N we study the optimal function s=sp in the pointwise inequality \[ v(x) ≤ s(x) ∇ v Lp(),∀\,(x,v)∈× W0% 1,p(). \] We show that sp∈ C00,1-(N/p)() and that sp converges pointwise to the distance function to the boundary, as p→∞. Moreover, we prove that if is convex, then sp is concave and has a unique maximum point.