多分量Boussinesq和Degasperis-Procesi方程的背景变换

IF 2.1 3区 物理与天体物理 Q2 PHYSICS, MATHEMATICAL International Journal of Geometric Methods in Modern Physics Pub Date : 2023-11-09 DOI:10.1142/s021988782450066x
Lixiang Zhang, Chuanzhong Li, Haifeng Wang
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引用次数: 0

摘要

新的可积耦合系统的发现已成为数学物理研究的一个重要领域,它的研究将有助于多组分可积系统的分类。代数展开是生成可积耦合系统的一种基本方法,如Frobenius代数、Lie代数、超代数等。本文引入了基于Frobenius代数的Frobenius Boussinesq方程,并给出了它的Lax对。由此,我们给出了Frobenius Boussinesq方程的Bäcklund变换。在此基础上,对Frobenius Boussinesq方程进行了三次Bäcklund变换,得到了其格方程的精确解。此外,我们通过Bäcklund变换得到了Frobenius Boussinesq方程的守恒定律。强耦合和弱耦合系统在物理上分别表示强相互作用和弱相互作用。本文引入了一类弱耦合Degasperis-Procesi (DP)方程,并构造了它的Lax对。此外,应用Bäcklund变换和叠加原理对弱耦合DP方程进行了研究。我们还得到了弱耦合DP方程的守恒定律。然后,我们引入了强耦合DP方程,并用同样的方法研究了强耦合DP方程。得到了这两个方程的精确解。此外,我们还引入了一个[公式:见文本]-DP方程。根据叠加原理,利用Bäcklund变换,得到了一个相关联的[公式:见文]-DP方程的解。这些新的多分量可积系统可以丰富现有的可积模型,并可能描述新的非线性现象。
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Backlund Transformations of Multi-Component Boussinesq and Degasperis-Procesi Equations
The finding of new integrable coupling systems has become an important area of research in mathematical physics and their study will aid in the classification of multi-component integrable systems. A basic method for generating integrable coupling systems is algebraic expansion, for example, the Frobenius algebra, the Lie algebra, the superalgebra, and so on. In this paper, we introduce a Frobenius Boussinesq equation based on the Frobenius algebra, and then we present a Lax pair of it. It follows that we give a Bäcklund transformation of the Frobenius Boussinesq equation. Furthermore, the lattice equation of the Frobenius Boussinesq equation is presented by using three Bäcklund transformations, and then obtain the exact solutions. Additionally, we obtain the conservation laws of the Frobenius Boussinesq equation via the Bäcklund transformation. Strongly coupled and weakly coupled systems physically represent strong and weak interactions, respectively. In this paper, we introduce a weakly coupled Degasperis–Procesi (DP) equation, and construct a Lax pair of it. In addition, the Bäcklund transformation and superposition principle are applied to investigate the weakly coupled DP equation. We also obtain the conservation laws of the weakly coupled DP equation. Then, we introduce a strongly coupled DP equation, and use the same method to study the strongly coupled DP equation. The exact solutions of these two equations are obtained. Moreover, we introduce a [Formula: see text]-DP equation. Considering the superposition principle, we obtain the solution of an associated [Formula: see text]-DP equation by using Bäcklund transformations. These new multi-component integrable systems can enrich the existing integrable models and possibly describe new nonlinear phenomena.
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来源期刊
CiteScore
3.40
自引率
22.20%
发文量
274
审稿时长
6 months
期刊介绍: This journal publishes short communications, research and review articles devoted to all applications of geometric methods (including commutative and non-commutative Differential Geometry, Riemannian Geometry, Finsler Geometry, Complex Geometry, Lie Groups and Lie Algebras, Bundle Theory, Homology an Cohomology, Algebraic Geometry, Global Analysis, Category Theory, Operator Algebra and Topology) in all fields of Mathematical and Theoretical Physics, including in particular: Classical Mechanics (Lagrangian, Hamiltonian, Poisson formulations); Quantum Mechanics (also semi-classical approximations); Hamiltonian Systems of ODE''s and PDE''s and Integrability; Variational Structures of Physics and Conservation Laws; Thermodynamics of Systems and Continua (also Quantum Thermodynamics and Statistical Physics); General Relativity and other Geometric Theories of Gravitation; geometric models for Particle Physics; Supergravity and Supersymmetric Field Theories; Classical and Quantum Field Theory (also quantization over curved backgrounds); Gauge Theories; Topological Field Theories; Strings, Branes and Extended Objects Theory; Holography; Quantum Gravity, Loop Quantum Gravity and Quantum Cosmology; applications of Quantum Groups; Quantum Computation; Control Theory; Geometry of Chaos.
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