Anisotropic Moser-Trudinger inequality involving Ln norm

Abstract

The paper is concerned about a sharp form of Anisotropic Moser-Trudinger inequality which involves Ln norm. Let equation* λ1() = ∈fu∈ W01,n(),u 0 ||F(∇ u)||Ln()n / ||u||Ln()n equation* be the first eigenvalue associated with n-Finsler-Laplacian. using blowing up analysis, we obtain that equation* u∈ W01,n(),||F(∇ u)||Ln() = 1 ∫eλn (1+α||u||Ln ()n)1n-1 |u|nn-1dx equation* is finite for any 0≤ α<λ1(),and the supremum is infinite for any α≥ λ1(), where λn = nnn-1 n1n-1 (n is the volume of the unit wulff ball) and the function F is positive,convex and homogeneous of degree 1, and its polar Fo represents a Finsler metric on Rn. Furthermore, the supremum is attained for any 0≤ α<λ1().