Sharp anisotropic singular Trudinger-Moser inequalities in the entire space

Abstract

In this paper, we investigate sharp singular Trudinger-Moser inequalities involving the anisotropic Dirichlet norm (∫FN(∇ u)\;dx)1N in the Sobolev-type space DN,q(RN), q≥ 1, here F:RN→[0,+∞) is a convex function of class C2(RN\0\), which is even and positively homogeneous of degree 1, its polar F0 represents a Finsler metric on RN. Combing with the connection between convex symmetrization and Schwarz symmetrization, we will establish anisotropic singular Trudinger-Moser inequalities and discuss their sharpness under several different situations, including the case \|F(∇ u)\|N≤ 1, the case \|F(∇ u)\|Na+\|u\|qb≤ 1, and whether they are associated with exact growth.