Hierarchical Schr\"odinger-type operators: the case of potentials with local singularities

Abstract

The goal of this paper is twofold. We prove that the operator H=L+V , a perturbation of the Taibleson-Vladimirov multiplier L=Dα by a potential V(x)=b x -α, b≥ b, is essentially self-adjoint and non-negative definite (the critical value b depends on α and will be specified later). While the operator H is non-negative definite the potential V(x) may well take negative values, e.g. b<0 for all 0<α<1. The equation Hu=v admiits a Green function gH(x,y), the integral kernel of the operator H-1. We obtain sharp lower- and upper bounds on the ratio of the functions gH(x,y) and gL(x,y). Examples illustrate our exposition.