Spectrum of the semi-relativistic Pauli–Fierz model II

IF 1 3区数学 Q1 MATHEMATICS Journal of Spectral Theory Pub Date : 2021-12-02 DOI:10.4171/jst/386

Takeru Hidaka, Fumio Hiroshima, Itaru Sasaki

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Abstract

We consider the ground state of the semi-relativistic Pauli–Fierz Hamiltonian $$ H = |\textbf{p} - \textbf{A(x)}| + H_f + V\textbf{(x)}. $$ Here $\textbf{A(x)}$ denotes the quantized radiation field with an ultraviolet cutoff function and $H_f$ the free field Hamiltonian with dispersion relation $|\textbf{k}|$. The Hamiltonian $H$ describes the dynamics of a massless and semi-relativistic charged particle interacting with the quantized radiation field with an ultraviolet cutoff function. In 2016, the first two authors proved the existence of the ground state $\Phi_m$ of the massive Hamiltonian $H_m$ is proven. Here, the massive Hamiltonian $H_m$ is defined by $H$ with dispersion relation $\sqrt{\textbf{k}^2+m^2}$ $(m>0)$. In this paper, the existence of the ground state of $H$ is proven. To this aim, we estimate a singular and non-local pull-through formula and show the equicontinuity of $\{a(k)\Phi_m\}_{0

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半相对论Pauli-Fierz模型的谱2

考虑半相对论性Pauli-Fierz哈密顿量$$ H = |\textbf{p} - \textbf{A(x)}| + H_f + V\textbf{(x)}的基态。$$其中$\textbf{A(x)}$表示具有紫外截止函数的量子化辐射场，$H_f$表示具有色散关系的自由场哈密顿量$|\textbf{k}|$。哈密顿量H描述了一个无质量半相对论带电粒子与带有紫外截止函数的量子化辐射场相互作用的动力学。2016年，前两位作者证明了大规模哈密顿量H_m$的基态$\Phi_m$的存在性。在这里，大质量哈密顿量H_m$由H$定义，其色散关系为$\sqrt{\textbf{k}^2+m^2}$ $(m>0)$。本文证明了$H$基态的存在性。为此，我们估计了一个奇异的非局部拉通公式，并证明了$\{a(k)\Phi_m\}_{0的等连续性

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来源期刊

Journal of Spectral Theory MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.00

自引率

0.00%

发文量

期刊介绍： The Journal of Spectral Theory is devoted to the publication of research articles that focus on spectral theory and its many areas of application. Articles of all lengths including surveys of parts of the subject are very welcome. The following list includes several aspects of spectral theory and also fields which feature substantial applications of (or to) spectral theory. Schrödinger operators, scattering theory and resonances; eigenvalues: perturbation theory, asymptotics and inequalities; quantum graphs, graph Laplacians; pseudo-differential operators and semi-classical analysis; random matrix theory; the Anderson model and other random media; non-self-adjoint matrices and operators, including Toeplitz operators; spectral geometry, including manifolds and automorphic forms; linear and nonlinear differential operators, especially those arising in geometry and physics; orthogonal polynomials; inverse problems.