STABILITY OF HOMOGENEOUS EQUILIBRIA OF THE HARTREE–FOCK EQUATION FOR ITS EQUIVALENT FORMULATION FOR RANDOM FIELDS

Charles Collot; Elena Danesi; Anne Sophie DE SUZZONI; Cyril Malézé

doi:10.2140/pmp.2025.6.241

STABILITY OF HOMOGENEOUS EQUILIBRIA OF THE HARTREE–FOCK EQUATION FOR ITS EQUIVALENT FORMULATION FOR RANDOM FIELDS

Charles Collot, Elena Danesi, Anne Sophie DE SUZZONI, Cyril Malézé

Research output: Contribution to journal › Article › peer-review

Abstract

The Hartree–Fock equation admits homogeneous states that model infinitely many particles at equilibrium. We prove their asymptotic stability in large dimensions, under assumptions on the linearised operator. Perturbations are moreover showed to scatter to linear waves. We obtain this result for the equivalent formulation of the Hartree–Fock equation in the framework of random fields. The main novelty is to study the full Hartree–Fock equation, including for the first time the exchange term in the study of these stationary solutions.

Original language	English
Pages (from-to)	241-279
Number of pages	39
Journal	Probability and Mathematical Physics
Volume	6
Issue number	1
DOIs	https://doi.org/10.2140/pmp.2025.6.241
Publication status	Published - 1 Jan 2025
Externally published	Yes

Keywords

Hartree–Fock
PDEs
dispersive equation
scattering

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10.2140/pmp.2025.6.241

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title = "STABILITY OF HOMOGENEOUS EQUILIBRIA OF THE HARTREE–FOCK EQUATION FOR ITS EQUIVALENT FORMULATION FOR RANDOM FIELDS",

abstract = "The Hartree–Fock equation admits homogeneous states that model infinitely many particles at equilibrium. We prove their asymptotic stability in large dimensions, under assumptions on the linearised operator. Perturbations are moreover showed to scatter to linear waves. We obtain this result for the equivalent formulation of the Hartree–Fock equation in the framework of random fields. The main novelty is to study the full Hartree–Fock equation, including for the first time the exchange term in the study of these stationary solutions.",

keywords = "Hartree–Fock, PDEs, dispersive equation, scattering",

author = "Charles Collot and Elena Danesi and \{DE SUZZONI\}, \{Anne Sophie\} and Cyril Mal{\'e}z{\'e}",

note = "Publisher Copyright: {\textcopyright} 2025 MSP (Mathematical Sciences Publishers).",

year = "2025",

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doi = "10.2140/pmp.2025.6.241",

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AU - Collot, Charles

AU - Danesi, Elena

AU - DE SUZZONI, Anne Sophie

AU - Malézé, Cyril

PY - 2025/1/1

Y1 - 2025/1/1

N2 - The Hartree–Fock equation admits homogeneous states that model infinitely many particles at equilibrium. We prove their asymptotic stability in large dimensions, under assumptions on the linearised operator. Perturbations are moreover showed to scatter to linear waves. We obtain this result for the equivalent formulation of the Hartree–Fock equation in the framework of random fields. The main novelty is to study the full Hartree–Fock equation, including for the first time the exchange term in the study of these stationary solutions.

AB - The Hartree–Fock equation admits homogeneous states that model infinitely many particles at equilibrium. We prove their asymptotic stability in large dimensions, under assumptions on the linearised operator. Perturbations are moreover showed to scatter to linear waves. We obtain this result for the equivalent formulation of the Hartree–Fock equation in the framework of random fields. The main novelty is to study the full Hartree–Fock equation, including for the first time the exchange term in the study of these stationary solutions.

KW - Hartree–Fock

KW - PDEs

KW - dispersive equation

KW - scattering

UR - https://www.scopus.com/pages/publications/85219218752

U2 - 10.2140/pmp.2025.6.241

DO - 10.2140/pmp.2025.6.241

M3 - Article

AN - SCOPUS:85219218752

SN - 2690-0998

VL - 6

SP - 241

EP - 279

JO - Probability and Mathematical Physics

JF - Probability and Mathematical Physics

IS - 1

ER -

STABILITY OF HOMOGENEOUS EQUILIBRIA OF THE HARTREE–FOCK EQUATION FOR ITS EQUIVALENT FORMULATION FOR RANDOM FIELDS

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Keywords

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