Estimates of sub and super solutions of Schr\"odinger equations with very singular potentials

Abstract

Consider operators LV:= + V in a bounded smooth domain D in RN. Assume that V∈ C1(D) and V may blow up at the boundary at most as 1/δ2 where δ denotes distance to the boundary. Assume also that LV has a ground state V that satsifies an additional condition on its behavior near the boundary (see Section 3). These conditions are satisfied by a large class of potentials (see Section 6). We derive sharp, two-sided estimates of weighted integrals of positive LV harmonic functions and LV potentials. These lead to a-priori estimates of positive LV supersolutions and subsolutions assuming (in the latter case) existence of LV boundary trace.