Conditions for discreteness of the spectrum to multi-dimensional Schr\"odinger operator

Abstract

This work is a continuation of our previos paper Zel1, where for the the Schr\"odinger operator H=-+ V()· (V() 0), acting in the space L2(d)\,(d 3), some constructive sufficient conditions for discreteness of its spectrum have been obtained on the base of well known Mazya -Shubin criterion and an optimization problem for a set function. Using a capacitary strong type inequality of David Adams, the concept of base polyhedron for the harmonic capacity and some properties of Choquet integral by this capacity, we obtain more general sufficient conditions for discreteness of the spectrum of H in terms of a repeated nonincreasing rearrangement of the function Y(,)=V()1|-|d-2V() on cubes that are going to infinity.