The Ehrenfest theorem for the charged quantized Schrödinger field with arbitrary spin

An explicit representation of lower bounds for the spectra of Schrödinger operators with magnetic fields on \(\sigma\)-compact Riemannian manifolds is given, using the positivity of the Pauli Hamiltonian. This representation is applied to show some asymptotic properties of a stochastic oscillatory i

## Abstract The spectrum of the two‐dimensional Schrödinger operator with strong magnetic field and electric potential is contained in a union of intervals centered on the Landau levels. The study of the spectrum in any of these intervals is reduced by unitary equivalence to the study of a one‐dime

## Abstract In this paper we consider a dissipative Schrödinger boundary value problem in the limit‐circle case with the spectral parameter in the boundary condition. The approach is based on the use of the maximal dissipative operator, and the spectral analyzes of this operator is adequate for the

It is proven that the Dirac Hamiltonian H for a spin 1r2 neutral particle with an anomalous magnetic moment in an arbitrary dimensional electrostatic field has supersymmetric quantum mechanical structure. By estimating the number of the zero-energy ground states of H from below, it is proven that th