Fuchsian-type singularity for the Finsler p-Laplacian with potential

Abstract

Let Ω⊂eqRn (2≤ n∈N) be a domain and let ζ∈\0,∞\ be an isolated point of the boundary of Ω in the one-point compactification of Rn with the ideal point ∞. Under some further conditions, we study Fuchsian-type singularity at ζ for the Finsler p-Laplace equation with a potential -divA(x,∇ u)+V|u|p-2u=0 (1<p<∞) in Ω, where A(x,ξ)∇ξ(H(x,ξ)p/p) for almost all x∈Ω and all ξ∈Rn, H is a family of norms on Rn (n≥ 2) parameterized by points x∈Ω, and V belongs to a local Morrey space. In particular, we investigate asymptotic behaviors of positive solutions of the equation near ζ and asymptotic behaviors of their quotients.