Extremal functions for Morrey's inequality in convex domains

Abstract

For a bounded domain ⊂ Rn and p>n, Morrey's inequality implies that there is c>0 such that c\|u\|p∞ ∫|Du|pdx for each u belonging to the Sobolev space W1,p0(). We show that the ratio of any two extremal functions is constant provided that is convex. We also explain why this property fails to hold in general and verify that convexity is not a necessary condition for a domain to have this property. As a by product, we obtain the uniqueness of an optimization problem involving the Green's function for the p-Laplacian.