Lp mapping properties for nonlocal Schr\"odinger operators with certain potential

Abstract

In this paper, we consider nonlocal Schr\"odinger equations with certain potentials V given by an integro-differential operator LK as follows; equation*LK u+V u=f\,\, in n equation* where V∈q for q>n2s and 0<s<1. We denote the solution of the above equation by V f:=u, which is called the inverse of the nonlocal Schr\"odinger operator LK+V with potential V; that is, V=(LK+V)-1. Then we obtain a weak Harnack inequality of weak subsolutions of the nonlocal equation equationcasesLK u+V u=0\,\,& in , u=g\,\,& in n, casesequation where g∈ Hs(n) and is a bounded open domain in n with Lipschitz boundary, and also get an improved decay of a fundamental solution V for LK+V. Moreover, we obtain Lp and Lp-Lq mapping properties of the inverse V of the nonlocal Schr\"odinger operator LK+V.