Discreteness conditions of the spectrum of Schrödinger operators

## Abstract We show that when a potential __b~n~__ of a discrete Schrödinger operator, defined on __l__^2^(ℤ^+^), slowly oscillates satisfying the conditions __b~n~__ ∈ __l__^∞^ and ∂__b~n~__ = __b__~__n__ +1~ – __b~n~__ ∈ __l^p^__, __p__ < 2, then all solutions of the equation __Ju__ = __Eu__ are

The spectrum and essential spectrum of the Schrödinger operator \(A+V\) on a complete manifold are studied. As applications, we determine the index of the catenoid of any dimension and the essential spectrum for several minimal submanifolds in the Euclidean space of the Jacobi operator arising from

In this article we investigated the spectrum of the quadratic pencil of Schro-Ž . Ž . dinger operators L generated in L ‫ޒ‬ by the equation 2 q 2 w yyЉ q V x q 2U x y y s 0, x g ‫ޒ‬ s 0, ϱ 2 q Ž . about the spectrum of L have also been applied to radial Klein᎐Gordon and one-dimensional Schrodinger