Quasi-classical ground states. I. Linearly coupled Pauli–Fierz Hamiltonians

IF 0.9 3区 数学 Q2 MATHEMATICS Documenta Mathematica Pub Date : 2023-11-14 DOI:10.4171/dm/929
Sébastien Breteaux, Jérémy Faupin, Jimmy Payet
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Abstract

We consider a spinless, non-relativistic particle bound by an external potential and linearly coupled to a quantized radiation field. The energy $\mathcal{E}(u,f)$ of product states of the form $u\otimes \Psi_f$, where $u$ is a normalized state for the particle and $\Psi_f$ is a coherent state in Fock space for the field, gives the energy of a Klein-Gordon--Schr\''odinger system. We minimize the functional $\mathcal{E}(u,f)$ on its natural energy space. We prove the existence and uniqueness of a ground state under general conditions on the coupling function. In particular, neither an ultraviolet cutoff nor an infrared cutoff is imposed. Our results establish the convergence in the ultraviolet limit of both the ground state and ground state energy of the Klein-Gordon--Schr\''odinger energy functional, and provide the second-order asymptotic expansion of the ground state energy at small coupling.
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准经典基态。1 .线性耦合Pauli-Fierz hamilton量
我们考虑一个无自旋的非相对论性粒子,它被一个外部势束缚并与量子化的辐射场线性耦合。形式为$u\otimes \Psi_f$的乘积态的能量$\mathcal{E}(u,f)$,其中$u$是粒子的归一化状态,$\Psi_f$是场在Fock空间中的相干状态,给出了Klein-Gordon- Schr\ odinger系统的能量。我们在其自然能量空间上最小化函数$\mathcal{E}(u,f)$。证明了耦合函数在一般条件下基态的存在唯一性。特别是,既不施加紫外截止,也不施加红外截止。我们的结果建立了Klein-Gordon- Schr\ odinger能量泛函的基态和基态能量在紫外极限处的收敛性,并提供了小耦合下基态能量的二阶渐近展开式。
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来源期刊
Documenta Mathematica
Documenta Mathematica 数学-数学
CiteScore
1.60
自引率
11.10%
发文量
0
审稿时长
>12 weeks
期刊介绍: DOCUMENTA MATHEMATICA is open to all mathematical fields und internationally oriented Documenta Mathematica publishes excellent and carefully refereed articles of general interest, which preferably should rely only on refereed sources and references.
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