The classical limit of Floquet operators with singular spectrum

## Abstract The present paper is concerned with the essential spectrum of the singular matrix differential operator of mixed order over the interval (__a__, __b__), where __D__ = __d__/__dt__. It is shown that if the coefficients are locally integrable functions and __T__ is in the limit circle ca

## Abstract We consider a system of ordinary differential operators of mixed order on an interval (0, __r__~0~), __r__~0~ > 0, where some of the coefficients are singular at 0. A special case has been dealt with by Kako, where the essential spectrum of an operator associated with a linearized magne

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

Estimates for the infimum of the spectrum of the SCHR~DINGER operator I-lQu= -du at ti half space with boundary coridition u, =&u (with u, denoting the inner normal derivative of u, and Q being a retLl-valued function defined at the boundary), nnd for the number resp. density of surface states of H