Compactness of Extremals for Singular Anisotropic Trudinger-Moser functionals on bounded domain
Abstract
In this paper, we investigate the compactness of extremal functions for a critical singular anisotropic Trudinger-Moser inequality established by Lu-Shen-Xue-Zhuref1. We prove by means of blow-up analysis that the extremals uβ converge in W01,n() C1() to some function u0 which achieves the supremum equation u∈ W01,n(), uF()≤1∫eτn unn-1dx, equation as β 0, where τn=nnn-1n1n-1, n denotes the volume of the unit Wulff ball in Rn and uF() is the anisotropic norm of u.
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