Solitons and traveling waves structure for the Schrödinger–Hirota model in fluids

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 : 2024-02-23 DOI:10.1142/s0219887824501457

Fazal Badshah, Kalim U. Tariq, Jian-Guo Liu, S. M. Raza Kazmi

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Abstract

The Schrödinger–Hirota equation is one of the most important models of contemporary physics which is popular throughout the broad fields of fluid movement as well as in the study of thick-water crests, liquid science, refractive optical components and so on. In this paper, we utilize the Hirota bilinear technique and the unified technique to attain various soliton solutions of the governing model analytically. These approaches are robust, powerful and unique also have many applications in different fields of mathematical physics. The solutions attained from these techniques are highly valuable and useful in various fields of sciences specially in the transmissions of optical fibers, also they give different behaviors including V-shaped and periodic soliton solution behavior. Further, the approaches applied here are not applied in this model previously. Therefore, ours is a new work, which summarizes its novelty. The 3D, 2D and contour plots are included to grasp the understanding of solutions’ behavior. These findings are valuable in electronic communications such as elliptical circuits and in investigation of solitude controlling.

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流体中薛定谔-希罗塔模型的孤子和行波结构

薛定谔-广达方程是当代物理学中最重要的模型之一，在流体运动的广泛领域以及浓水波峰、液体科学、折射光学元件等研究中广为流行。在本文中，我们利用 Hirota 双线性技术和统一技术，通过分析获得了支配模型的各种孤子解。这些方法稳健、强大、独特，在数学物理的不同领域也有很多应用。从这些技术中获得的解在各个科学领域，特别是光纤传输领域，具有很高的价值和实用性，而且它们还给出了不同的行为，包括 V 形和周期性孤子解行为。此外，这里应用的方法以前从未应用于该模型。因此，我们的研究是一项新工作，总结了其新颖性。为了理解解的行为，我们绘制了三维、二维和等值线图。这些发现对椭圆电路等电子通信和孤独控制研究很有价值。

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

International Journal of Geometric Methods in Modern Physics 物理-物理：数学物理

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.