Liouville-type theorems, radial symmetry and integral representation of solutions to Hardy-H\'enon equations involving higher order fractional Laplacians

Abstract

We study nonnegative solutions to the following Hardy-H\'enon type equations involving higher order fractional Laplacians (-)σ u = |x|-αup ~~~~~~ in ~ Rn \0\ with a possible singularity at the origin, where σ is a real number satisfying 0 < σ < n/2, -∞ < α < 2σ and p>1. By a more direct approach without using the super poly-harmonic properties, we establish an integral representation for nonnegative solutions to the above higher order fractional equations whether the singularity \0\ is removable or not. As the first application, we prove an optimal Liouville-type theorem for the above equations with removable singularity for all σ ∈ (0, n/2) when 1 < p < pσ,α*:=n+2σ -2αn-2σ ~~~ and ~~~ -∞ < α < 2σ. This, in particular, covers a gap occurring for non-integral σ ∈ (1, n/2) and α ∈ (0, 2σ) in the current literature. As the second application, we show the radial symmetry of solutions in the critical case or in the case when the origin is a non-removable singularity. Such radial symmetry would be useful in studying the singular Yamabe-type problems.