Semiclassical limit for the Schrödinger-Poisson equation in a crystal

We study the Whitham equations, which describe the semiclassical limit of the defocusing nonlinear Schrödinger equation. The limit is governed by a pair of hyperbolic equations of two independent variables for a short time starting from the initial time. After this hyperbolic solution breaks down, t

## Abstract We deal with the classical limit of the Schrödinger‐Poisson system to the Vlasov‐Poisson equations as the Planck constant ϵ goes to zero. This limit is also frequently called “semiclassical limit”. The coupled Schrödinger‐Poisson system for the wave functions {ψ(__t, x__)} are transform

We study the time evolution of a quantum particle in a Gaussian random environment. We show that in the weak coupling limit the Wigner distribution of the wave function converges to a solution of a linear Boltzmann equation globally in time. The Boltzmann collision kernel is given by the Born approx

The spectrum of the two-dimensional Schrodinger equation for polynomial oscillators bounded by infinitely high potentials, where the eigenvalue problem is defined on a w . finite interval r g 0, L , is variationally studied. The wave function is expanded into a Fourier᎐Bessel series, and matrix elem

An extension to the theory of Schrodinger equations has been made ẅhich enables the derivation of eigenvalues from a consideration of a very small part of geometric space. The concomitant unwanted continuum effects have been removed. The theory enables very convergent or ''superconvergent'' calculat