A sharp trace Adams' inequality in R4 and Existence of the extremals

Abstract

Let ⊂eq R4 be a bounded domain with smooth boundary ∂. In this paper, we establish the following sharp form of the trace Adams' inequality in W2,2() with zero mean value and zero Neumann boundary condition: equation* S(α)=∫udx=0,∂ u∂|∂=0, u2≤1 u∈W2,2()\0\∫∂ eα u2dσ<∞ equation* holds if and only if α≤12π2. Moreover, we prove a classification theorem for the solutions of a class of nonlinear boundary value problem of bi-harmonic equations on the half space R4+. With this classification result, we can show that S(12π2) is attained by using the blow-up analysis and capacitary estimate. As an application, we prove a sharp trace Adams-Onofri type inequality in general four dimensional bounded domains with smooth boundary.