Concentration-compactness principle of singular Trudinger-Moser inequality involving N-Finsler-Laplacian operator

Abstract

In this paper, suppose F: RN → [0, +∞) be a convex function of class C2(RN \0\) which is even and positively homogeneous of degree 1. We establish the Lions type concentration-compactness principle of singular Trudinger-Moser Inequalities involving N-Finsler--Laplacian operator. Let ⊂ RN(N≥ 2) be a smooth bounded domain. \un\⊂ W01, N() be a sequence such that anisotropic Dirichlet norm∫FN (∇ un)dx=1, un u 0 weakly in W01, N(). Then for any 0 < p < pN(u):=(1-∫FN (∇ u)dx)-1N-1, we have ∫eλN(1-βN)p |un|NN-1Fo(x)βdx<+∞, where 0≤β <N, λN=NNN-1 N1N-1 and N is the volume of a unit Wulff ball. This conclusion fails if p ≥ pN(u). Furthermore, we also obtain the corresponding concentration-compactness principle in the entire Euclidean space RN.