The compactness of Moser-Trudinger functionals with conical metric in the unit ball of RN

Abstract

Let B be the unit ball in RN, W01,N ( B ) is a standard Sobolev space. Zhang proved the extremal function of the Moser-Trudinger inequality as follows, align* ∫ B hε(x) e αN ( 1 + ε) |uε| NN-1 dx, uε ∈ W01,N ( B ) S, align* where αN = ωN 1N-1 , ωN is the area of the unit sphere in RN(see 26) . In this paper, we consider the compactness of the sequence \ uε \ε and prove that it has a subsequence converging to a function in C1 ( B ).