{"status":"public","external_id":{"arxiv":["2207.07939"]},"publication":"Quantum Mathematics I","article_processing_charge":"No","language":[{"iso":"eng"}],"editor":[{"full_name":"Correggi, Michele","first_name":"Michele","last_name":"Correggi"},{"full_name":"Falconi, Marco","first_name":"Marco","last_name":"Falconi"}],"date_updated":"2026-04-28T10:12:31Z","series_title":"SINDAMS","place":"Singapore","month":"12","publisher":"Springer Nature","OA_type":"green","day":"01","edition":"1","year":"2023","type":"book_chapter","main_file_link":[{"url":"https://doi.org/10.48550/arXiv.2207.07939","open_access":"1"}],"page":"319-333","quality_controlled":"1","abstract":[{"text":"We revisit the derivation of the time-dependent Hartree–Fock equation for interacting fermions in a regime coupling a mean-field and a semiclassical scaling, contributing two comments to the result obtained in 2014 by Benedikter, Porta, and Schlein. First, the derivation holds in arbitrary space dimension. Second, by using an explicit formula for the unitary implementation of particle-hole transformations, we cast the proof in a form similar to the coherent state method of Rodnianski and Schlein for bosons.","lang":"eng"}],"oa_version":"Preprint","title":"Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation","publication_status":"published","scopus_import":"1","OA_place":"repository","_id":"21739","extern":"1","date_created":"2026-04-15T16:38:20Z","author":[{"id":"3DE6C32A-F248-11E8-B48F-1D18A9856A87","full_name":"Benedikter, Niels P","orcid":"0000-0002-1071-6091","last_name":"Benedikter","first_name":"Niels P"},{"orcid":"0000-0001-9840-3809","last_name":"Desio","first_name":"Davide","id":"ea10a57b-23f6-11ef-9085-80d8596d52ef","full_name":"Desio, Davide"}],"doi":"10.1007/978-981-99-5894-8_13","user_id":"2DF688A6-F248-11E8-B48F-1D18A9856A87","arxiv":1,"citation":{"ama":"Benedikter NP, Desio D. Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation. In: Correggi M, Falconi M, eds. Quantum Mathematics I. Vol 57. 1st ed. SINDAMS. Singapore: Springer Nature; 2023:319-333. doi:10.1007/978-981-99-5894-8_13","chicago":"Benedikter, Niels P, and Davide Desio. “Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation.” In Quantum Mathematics I, edited by Michele Correggi and Marco Falconi, 1st ed., 57:319–33. SINDAMS. Singapore: Springer Nature, 2023. https://doi.org/10.1007/978-981-99-5894-8_13.","mla":"Benedikter, Niels P., and Davide Desio. “Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation.” Quantum Mathematics I, edited by Michele Correggi and Marco Falconi, 1st ed., vol. 57, Springer Nature, 2023, pp. 319–33, doi:10.1007/978-981-99-5894-8_13.","short":"N.P. Benedikter, D. Desio, in:, M. Correggi, M. Falconi (Eds.), Quantum Mathematics I, 1st ed., Springer Nature, Singapore, 2023, pp. 319–333.","apa":"Benedikter, N. P., & Desio, D. (2023). Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation. In M. Correggi & M. Falconi (Eds.), Quantum Mathematics I (1st ed., Vol. 57, pp. 319–333). Singapore: Springer Nature. https://doi.org/10.1007/978-981-99-5894-8_13","ista":"Benedikter NP, Desio D. 2023.Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation. In: Quantum Mathematics I. Springer INdAM Series, vol. 57, 319–333.","ieee":"N. P. Benedikter and D. Desio, “Two Comments on the Derivation of the Time-Dependent Hartree–Fock Equation,” in Quantum Mathematics I, 1st ed., vol. 57, M. Correggi and M. Falconi, Eds. Singapore: Springer Nature, 2023, pp. 319–333."},"date_published":"2023-12-01T00:00:00Z","oa":1,"intvolume":" 57","alternative_title":["Springer INdAM Series"],"publication_identifier":{"isbn":["9789819958931"],"eisbn":["9789819958948"],"eissn":["2281-5198"],"issn":["2281-518X"]},"volume":57}