Integrable coupled massive Thirring model with field values in a Grassmann algebra

IF 5 1区物理与天体物理 Q1 PHYSICS, PARTICLES & FIELDS

Journal of High Energy Physics Pub Date : 2023-11-02 DOI:10.1007/jhep11(2023)018

B. Basu-Mallick, F. Finkel, A. González-López, D. Sinha

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引用次数: 2

Abstract

A bstract A coupled massive Thirring model of two interacting Dirac spinors in 1 + 1 dimensions with fields taking values in a Grassmann algebra is introduced, which is closely related to a SU(1) version of the Grassmannian Thirring model also introduced in this work. The Lax pair for the system is constructed, and its equations of motion are obtained from a zero curvature condition. It is shown that the system possesses several infinite hierarchies of conserved quantities, which strongly confirms its integrability. The model admits a canonical formulation and is invariant under space-time translations, Lorentz boosts and global U(1) gauge transformations, as well as discrete symmetries like parity and time reversal. The conserved quantities associated to the continuous symmetries are derived using Noether’s theorem, and their relation to the lower-order integrals of motion is spelled out. New nonlocal integrable models are constructed through consistent nonlocal reductions between the field components of the general model. The Lagrangian, the Hamiltonian, the Lax pair and several infinite hierarchies of conserved quantities for each of these nonlocal models are obtained substituting its reduction in the expressions of the analogous quantities for the general model. It is shown that, although the Lorentz symmetry of the general model breaks down for its nonlocal reductions, these reductions remain invariant under parity, time reversal, global U(1) gauge transformations and space-time translations.

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Grassmann代数中具有场值的可积耦合大质量Thirring模型

本文介绍了1 + 1维中两个相互作用的Dirac旋量的耦合大质量Thirring模型，该模型与本文所介绍的SU(1)版本的Grassmannian Thirring模型密切相关。构造了系统的Lax对，并在零曲率条件下得到了系统的运动方程。结果表明，该系统具有多个守恒量的无限层次，有力地证明了其可积性。该模型承认正则表达式，并且在时空平移、洛伦兹推进和全局U(1)规范变换以及宇称和时间反转等离散对称性下是不变的。利用诺特定理推导了与连续对称相关的守恒量，并阐述了它们与运动低阶积分的关系。通过在一般模型的场分量之间进行一致的非局部约简，构造了新的非局部可积模型。通过将这些非局部模型的拉格朗日量、哈密顿量、Lax对和守恒量的无限层次替换为一般模型的类似量表达式，得到了它们的守恒量的拉格朗日量、哈密顿量和守恒量的无限层次。结果表明，尽管一般模型的洛伦兹对称性因其非局部约化而被破坏，但这些约化在宇称、时间反转、全局U(1)规范变换和时空平移下保持不变。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of High Energy Physics PHYSICS, PARTICLES & FIELDS-

CiteScore

10.00

自引率

46.30%

发文量

2107

审稿时长

12 weeks

期刊介绍： The aim of the Journal of High Energy Physics (JHEP) is to ensure fast and efficient online publication tools to the scientific community, while keeping that community in charge of every aspect of the peer-review and publication process in order to ensure the highest quality standards in the journal. Consequently, the Advisory and Editorial Boards, composed of distinguished, active scientists in the field, jointly establish with the Scientific Director the journal''s scientific policy and ensure the scientific quality of accepted articles. JHEP presently encompasses the following areas of theoretical and experimental physics: Collider Physics Underground and Large Array Physics Quantum Field Theory Gauge Field Theories Symmetries String and Brane Theory General Relativity and Gravitation Supersymmetry Mathematical Methods of Physics Mostly Solvable Models Astroparticles Statistical Field Theories Mostly Weak Interactions Mostly Strong Interactions Quantum Field Theory (phenomenology) Strings and Branes Phenomenological Aspects of Supersymmetry Mostly Strong Interactions (phenomenology).