Liouville type theorems, a priori estimates and existence of solutions for non-critical higher order Lane-Emden-Hardy equations

Abstract

In this paper, we are concerned with the non-critical higher order Lane-Emden-Hardy equations equation* (-)mu(x)=up(x)|x|a \,\,\,\,\,\,\,\,\,\,\,\, in \,\,\, Rn equation* with n≥3, 1≤ m<n2, 0≤ a<2m, 1<p<n+2m-2an-2m if 0≤ a<2, and 1<p<∞ if 2≤ a<2m. We prove Liouville theorems for nonnegative classical solutions to the above Lane-Emden-Hardy equations (Theorem Thm0), that is, the unique nonnegative solution is u0. As an application, we derive a priori estimates and existence of positive solutions to non-critical higher order Lane-Emden equations in bounded domains (Theorem Thm1 and Thm2). The results for critical order Hardy-H\'enon equations have been established by Chen, Dai and Qin CDQ recently.