The Spectrum of Magnetic Schrödinger Operators on a Graph with Periodic Structure

introduced the graph parameter n(G), which is defined as the maximal corank of any positive semidefinite magnetic Schrödinger operator fulfilling a certain transversality condition. He showed that for connected simple graphs, n(G) [ 1 if and only if G is a tree. In this paper we characterize for k=2

## Abstract A system of three quantum particles on the three‐dimensional lattice ℤ^3^ with arbitrary dispersion functions having not necessarily compact support and interacting via short‐range pair potentials is considered. The energy operators of the systems of the two‐and three‐particles on the l

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

In this paper, the periodic and the Dirichlet problems for the Schrödinger operator -(d 2 /dx 2 )+V are studied for singular, complex-valued potentials V in the Sobolev space H -a per [0, 1] (0 [ a < 1). The following results are shown: (1) The periodic spectrum consists of a sequence (l k ) k \ 0

## Abstract A general scheme for factorizing second‐order time‐dependent operators of mathematical physics is given, which allows a reduction of corresponding second‐order equations to biquaternionic equations of first order. Examples of application of the proposed scheme are presented for both con