On super polyharmonic property of high-order fractional Laplacian

Abstract

Let 0<α<2, p≥ 1, m∈N+. Consider u to be the positive solution of the PDE equationabstract PDE (-)α2+m u(x)=up(x) Rn. equation Cao, Dai and Qin( Transactions of the American mathematical society, 2021) showed that, under the condition u∈Lα, the PDE possesses super polyharmonic property (-)k+α2u≥ 0 for k=0,1,...,m-1. In this paper, we show another kind of super polyharmonic property (-)k u> 0 for k=1,...m under different conditions (-)mu∈Lα and (-)m u≥ 0. Both kinds of super polyharmonic properties can lead to the equivalence between the PDE and the integral equation u(x)=∫Rnup(y)|x-y|n-2m-αdy.