Liouville type theorems, a priori estimates and existence of solutions for critical order Hardy-H\'enon equations in Rn

Abstract

In this paper, we consider the critical order Hardy-H\'enon equations equation* (-)n2u(x)=up(x)|x|a, \,\,\,\,\,\,\,\,\,\,\, x \, ∈ \,\, Rn, equation* where n≥4 is even, -∞<a<n, and 1<p<+∞. We first prove a Liouville theorem (Theorem Thm0), that is, the unique nonnegative solution to this equation is u0. Then as an immediate application, we derive a priori estimates and hence existence of positive solutions to critical order Lane-Emden equations in bounded domains (Theorem Thm1 and Thm2). Our results seem to be the first Liouville theorem, a priori estimates, and existence on the critical order equations in higher dimensions (n≥3). Extensions to super-critical order Hardy-H\'enon equations and inequalities will also be included (Theorem Thm0-sc and Thm1-sc).