Existence and non-existence results for the higher order Hardy-H\'enon equation revisited

Abstract

This paper is devoted to studies of non-negative, non-trivial (classical, punctured, or distributional) solutions to the higher order Hardy-H\'enon equations \[ (-)m u = |x|σ up \] in Rn with p > 1. We show that the condition \[ n - 2m - 2m+σp-1 >0 \] is necessary for the existence of distributional solutions. For n ≥ 2m and σ > -2m, we prove that any distributional solution satisfies an integral equation and a weak super polyharmonic property. We establish some sufficient conditions for punctured or classical solution to be a distributional solution. As application, we show that if n ≥ 2m and σ > -2m, there is no non-negative, non-trivial, classical solution to the equation if \[ 1 < p < n+2m+2σn-2m. \] At last, we prove that for for n > 2m, σ > -2m and p ≥ n+2m+2σn-2m, there exist positive, radially symmetric, classical solutions to the equation.