Abstract
We study the quantum evolution of many-body Fermi gases in three dimensions, in arbitrarily large domains. We consider both particles with non-relativistic and with relativistic dispersion. We focus on the high-density regime, in the semiclassical scaling, and we consider a class of initial data describing zero-temperature states. In the non-relativistic case we prove that, as the density goes to infinity, the many-body evolution of the reduced one-particle density matrix converges to the solution of the time-dependent Hartree equation, for short macroscopic times. In the case of relativistic dispersion, we show convergence of the many-body evolution to the relativistic Hartree equation for all macroscopic times. With respect to previous work, the rate of convergence does not depend on the total number of particles, but only on the density: in particular, our result allows us to study the quantum dynamics of extensive many-body Fermi gases.
Item Type: | Journal Article, refereed, original work |
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Communities & Collections: | 07 Faculty of Science > Institute of Mathematics |
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Dewey Decimal Classification: | 510 Mathematics |
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Scopus Subject Areas: | Physical Sciences > Statistical and Nonlinear Physics
Physical Sciences > Mathematical Physics |
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Uncontrolled Keywords: | Mathematical Physics, Statistical and Nonlinear Physics |
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Language: | English |
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Date: | 1 July 2023 |
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Deposited On: | 16 Apr 2023 15:54 |
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Last Modified: | 29 Dec 2024 02:37 |
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Publisher: | Springer |
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ISSN: | 0010-3616 |
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Additional Information: | Acknowledgements.
We thank Alessandro Giuliani for suggesting the relation of our result with the Kac limit. The work of L.F. has been supported by the European Research Council through the ERC-AdG CLaQS and by the Swiss National Science Foundation grant number 200160. The work of M.P. has been supported by the European Research Council (ERC) under the European Union’s Horizon 2020 research and innovation program ERC StG MaMBoQ, n.80290. The work of M.P. has been carried out under the auspices of the GNFM of INdAM. B.S. acknowledges partial support from the NCCR SwissMAP, from the Swiss National Science Foundation through the Grant “Dynamical and energetic properties of Bose-Einstein condensates” and from the European Research Council through the ERC-AdG CLaQS.
Funding
Open Access funding enabled and organized by Projekt DEAL. |
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OA Status: | Hybrid |
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Free access at: | Publisher DOI. An embargo period may apply. |
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Publisher DOI: | https://doi.org/10.1007/s00220-023-04677-x |
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Project Information: | - Funder: SNSF
- Grant ID: 200160
- Project Title: Stochastic Quantization in Random Media
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