皮克尔对量子均场极限和量子克里蒙托维奇解的证明

IF 1.3 3区 物理与天体物理 Q3 PHYSICS, MATHEMATICAL Letters in Mathematical Physics Pub Date : 2024-04-06 DOI:10.1007/s11005-023-01768-7
Immanuel Ben Porat, François Golse
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引用次数: 0

摘要

本文讨论的是\({\textbf{R}}^3\)中N个相同玻色子通过具有库仑型奇点的二元势相互作用的量子动力学的均场极限。我们的方法基于 Golse 和 Paul (Commun Math Phys 369:1021-1053, 2019) 中定义的量子克里蒙托维奇解理论。我们的第一个主要结果是定义了一类相互作用势的量子克利蒙托维奇解动力学方程中的相互作用非线性,其通用性略低于加藤(Trans Am Math Soc 70:195-211,1951)所考虑的那些相互作用势。我们的第二个主要结果是量子克利蒙托维奇解在具有库仑型奇异性的相互作用势情况下满足的一个新的算子不等式。当在初始玻色纯态上求值时,这个算子不等式简化为皮克尔(Lett Math Phys 97:151-164,2011)中引入的函数的格伦沃尔不等式,从而得出量子均场极限的收敛率估计,导致与时间相关的哈特里方程。
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Pickl’s proof of the quantum mean-field limit and quantum Klimontovich solutions

This paper discusses the mean-field limit for the quantum dynamics of N identical bosons in \({\textbf{R}}^3\) interacting via a binary potential with Coulomb-type singularity. Our approach is based on the theory of quantum Klimontovich solutions defined in Golse and Paul (Commun Math Phys 369:1021–1053, 2019) . Our first main result is a definition of the interaction nonlinearity in the equation governing the dynamics of quantum Klimontovich solutions for a class of interaction potentials slightly less general than those considered in Kato (Trans Am Math Soc 70:195–211, 1951). Our second main result is a new operator inequality satisfied by the quantum Klimontovich solution in the case of an interaction potential with Coulomb-type singularity. When evaluated on an initial bosonic pure state, this operator inequality reduces to a Gronwall inequality for a functional introduced in Pickl (Lett Math Phys 97:151-164, 2011), resulting in a convergence rate estimate for the quantum mean-field limit leading to the time-dependent Hartree equation.

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来源期刊
Letters in Mathematical Physics
Letters in Mathematical Physics 物理-物理:数学物理
CiteScore
2.40
自引率
8.30%
发文量
111
审稿时长
3 months
期刊介绍: The aim of Letters in Mathematical Physics is to attract the community''s attention on important and original developments in the area of mathematical physics and contemporary theoretical physics. The journal publishes letters and longer research articles, occasionally also articles containing topical reviews. We are committed to both fast publication and careful refereeing. In addition, the journal offers important contributions to modern mathematics in fields which have a potential physical application, and important developments in theoretical physics which have potential mathematical impact.
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