Microscopic derivation of the Fröhlich Hamiltonian for the Bose polaron in the mean-field limit
From MaRDI portal
Publication:2216170
DOI10.1007/s00023-020-00969-3zbMath1454.82035arXiv2003.12371OpenAlexW3013666126MaRDI QIDQ2216170
Robert Seiringer, Krzysztof Myśliwy
Publication date: 15 December 2020
Published in: Annales Henri Poincaré (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2003.12371
Many-body theory; quantum Hall effect (81V70) Statistical mechanics of gases (82D05) Bosonic systems in quantum theory (81V73)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- The excitation spectrum for weakly interacting Bosons in a trap
- Excitation spectrum of interacting bosons in the mean-field infinite-volume limit
- The mathematics of the Bose gas and its condensation.
- The excitation spectrum for weakly interacting bosons
- The second order upper bound for the ground energy of a Bose gas
- The Lieb-Liniger model as a limit of dilute bosons in three dimensions
- Bogoliubov correction to the mean-field dynamics of interacting bosons
- Bogoliubov theory in the Gross-Pitaevskii limit
- Effective dynamics of a tracer particle interacting with an ideal Bose gas
- A simple 2nd order lower bound to the energy of dilute Bose gases
- Collective excitations of Bose gases in the mean-field regime
- Ballistic motion of a tracer particle coupled to a Bose gas
- Derivation of Pekar's Polarons from a Microscopic Model of Quantum Crystal
- Fluctuations around Hartree states in the mean-field regime
- Bogoliubov Spectrum of Interacting Bose Gases
- Ground state energy of the one-component charged Bose gas.
This page was built for publication: Microscopic derivation of the Fröhlich Hamiltonian for the Bose polaron in the mean-field limit
