Spectrum and Spectral Singularities of a Quadratic Pencil of a Schrödinger Operator with a General Boundary Condition

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

For discrete magnetic Schro dinger operators on covering graphs of a finite graph, we investigate two spectral properties: (1) the relationship between the spectrum of the operator on the covering graph and that on a finite graph, (2) the analyticity of the bottom of the spectrum with respect to mag

The two-dimensional Schrodinger operator H a for a spin particle is consid-¨2 ered. The magnetic field b generated by a does not grow in some directions and stabilizes to a positively homogeneous function. It is shown that the spectrum ˜Ž Ž .. Ž Ž .. Ä 4 H a consists of H a and 0 , the latter being

The spectrum of a one-velocity transport operator with Maxwell boundary condition is discussed in L 1 space. First, it is proved that the spectrum of a streaming operator associated with the transport operator consists of infinitely isolated eigenvalues, each of which is simple; furthermore, a formu