Decay of extremals of Morrey's inequality

Abstract

We study the decay (at infinity) of extremals of Morrey's inequality in Rn. These are functions satisfying x≠ y|u(x)-u(y)||x-y|1-np= C(p,n)\|∇ u\|Lp(Rn) , where p>n and C(p,n) is the optimal constant in Morrey's inequality. We prove that if n ≥ 2 then any extremal has a power decay of order β for any β<-13+23(p-1)+(-13+23(p-1))2+13.