The weak coupling limit for the random Schrödinger equation: the average wave function
From MaRDI portal
Publication:1702442
DOI10.1007/s00205-017-1163-7zbMath1384.35117arXiv1609.02623OpenAlexW3103291119MaRDI QIDQ1702442
Tomasz Komorowski, Thomas Chen, Leonid Ryzhik
Publication date: 28 February 2018
Published in: Archive for Rational Mechanics and Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1609.02623
NLS equations (nonlinear Schrödinger equations) (35Q55) PDEs with randomness, stochastic partial differential equations (35R60) Integro-partial differential equations (35R09)
Related Items (4)
Radiative transport limit of Dirac equations with random electromagnetic field ⋮ The Schrödinger equation with spatial white noise: the average wave function ⋮ The 1D Schrödinger equation with a spacetime white noise: the average wave function ⋮ A new spectral analysis of stationary random Schrödinger operators
Cites Work
- Unnamed Item
- Unnamed Item
- Convergence to SPDE of the Schrödinger equation with large, random potential
- Quantum Brownian motion in a simple model system
- Asymptotics of the solutions of the random Schrödinger equation
- Convergence in higher mean of a random Schrödinger to a linear Boltzmann evolution
- Kinetic limit for wave propagation in a random medium
- Diffusion of wave packets in a Markov random potential
- On random Schrödinger operators on \(\mathbb{Z}^2\)
- Classical and quantum transport in random media.
- The Schrödinger equation with spatial white noise potential
- Quantum diffusion for the Anderson model in the scaling limit
- Quantum diffusion of the random Schrödinger evolution in the scaling limit. II: The recollision diagrams
- Localization lengths and Boltzmann limit for the Anderson model at small disorders in dimension 3
- A simple construction of the continuum parabolic Anderson model on \(\mathbf{R}^2\)
- Quantum Brownian motion induced by thermal noise in the presence of disorder
- Linear Boltzmann equation as the weak coupling limit of a random Schrödinger equation
- HOMOGENIZATION OF THE SCHRÖDINGER EQUATION WITH LARGE, RANDOM POTENTIAL
- Derivation of the transport equation for electrons moving through random impurities
This page was built for publication: The weak coupling limit for the random Schrödinger equation: the average wave function
