A sharp Adams inequality in dimension four and its extremal functions

Abstract

Let be a smooth oriented bounded domain in R4, H02() be the Sobolev space, and λ1()= ∈f \\| u\|22 : u∈ H02(), \|u\|2 =1\ be the first eigenvalue of the bi-Laplacian operator 2 on . For α ∈ [0,λ1()), we define \|u\|2,α2 = \| u\|22 - α \|u\|22, for u ∈ H02(). In this paper, we will prove the following inequality \[ u∈ H02(),\, \|u\|2,α ≤ 1 ∫ e32 π2 u(x)2 dx < ∞. \] This strengthens a recent result of Lu and Yang LuYang. We also show that there exists a function u*∈ H02() C4() such that \|u*\|2,α =1 and the supremum above is attained by u*. Our proofs are based on the blow-up analysis method.