Solitary Wave and Quasi-Periodic Wave Solutions to a (3+1)-Dimensional Generalized Calogero-Bogoyavlenskii-Schiff Equation

被引：45

作者：

Qin, Chun-Yan ^{[1
,2
]}

Tian, Shou-Fu ^{[1
,2
]}

Zou, Li ^{[3
,4
]}

Ma, Wen-Xiu ^{[5
,6
,7
]}

机构：

[1] China Univ Min & Technol, Sch Math, Xuzhou 221116, Jiangsu, Peoples R China

[2] China Univ Min & Technol, Inst Math Phys, Xuzhou 221116, Jiangsu, Peoples R China

[3] Dalian Univ Technol, Sch Naval Architecture, State Key Lab Struct Anal Ind Equipment, Dalian 116024, Peoples R China

[4] Collaborat Innovat Ctr Adv Ship & Deep Sea Explor, Shanghai 200240, Peoples R China

[5] Univ S Florida, Dept Math & Stat, 4202 East Fowler Ave, Tampa, FL 33620 USA

[6] Shandong Univ Sci & Technol, Coll Math & Syst Sci, Qingdao 266590, Peoples R China

[7] North West Univ, Int Inst Symmetry Anal & Math Modelling, Dept Math Sci, Mafikeng Campus,Private Bag X2046, ZA-2735 Mmabatho, South Africa

来源：

ADVANCES IN APPLIED MATHEMATICS AND MECHANICS | 2018年 / 10卷 / 04期

关键词：

A (3+1)-dimensional generalized Calogero-Bogoyavlenskii-Schiff equation; Bell polynomial; solitary wave solution; periodic wave solution; asymptotic behavior; HOMOCLINIC BREATHER WAVES; BOUNDARY VALUE-PROBLEMS; DE-VRIES EQUATION; ROGUE WAVES; BELL POLYNOMIALS; RATIONAL CHARACTERISTICS; DARBOUX TRANSFORMATIONS; EVOLUTION-EQUATIONS; BILINEAR EQUATIONS; SYMMETRIES;

D O I：

10.4208/aamm.OA-2017-0220

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

A (3+1)-dimensional generalized Calogero-Bogoyavlenskii-Schiff equation is considered, which can be used to describe many nonlinear phenomena in plasma physics. By virtue of binary Bell polynomials, a bilinear representation of the equation is succinctly presented. Based on its bilinear formalism, we construct soliton solutions and Riemann theta function periodic wave solutions. The relationships between the soliton solutions and the periodic wave solutions are strictly established and the asymptotic behaviors of the Riemann theta function periodic wave solutions are analyzed with a detailed proof.

引用

页码：948 / 977

页数：30

共 50 条

[21] Dynamics of Solitary Waves and Periodic Waves in a (3+1)-Dimensional Nonlinear Evolution Equation
Wang, Xiu-Bin
Tian, Shou-Fu
Zou, Li
Zhang, Tian-Tian
EAST ASIAN JOURNAL ON APPLIED MATHEMATICS, 2018, 8 (03) : 477 - 497
[22] Quasi-periodic solutions of (3+1) generalized BKP equation by using Riemann theta functions
Demiray, Secil
Tascan, Filiz
APPLIED MATHEMATICS AND COMPUTATION, 2016, 273 : 131 - 141
[23] Integrability, bilinearization, exact traveling wave solutions, lump and lump-multi-kink solutions of a (3+1)-dimensional negative-order KdV-Calogero-Bogoyavlenskii-Schiff equation
Mandal, Uttam Kumar
Karmakar, Biren
Das, Amiya
Ma, Wen-Xiu
NONLINEAR DYNAMICS, 2024, 112 (06) : 4727 - 4748
[24] Quasi-periodic wave solutions and asymptotic behavior for an extended (2+1)-dimensional shallow water wave equation
Rui, Wenjuan
ADVANCES IN DIFFERENCE EQUATIONS, 2016,
[25] The Rational Solutions and Quasi-Periodic Wave Solutions as well as Interactions of N-Soliton Solutions for 3+1 Dimensional Jimbo-Miwa Equation
Yang, Hongwei
Zhang, Yong
Zhang, Xiaoen
Chen, Xin
Xu, Zhenhua
ADVANCES IN MATHEMATICAL PHYSICS, 2016, 2016
[26] On quasi-periodic wave solutions and asymptotic behaviors to a (2+1)-dimensional generalized variable-coefficient Sawada-Kotera equation
Tu, Jian-Min
Tian, Shou-Fu
Xu, Mei-Juan
Ma, Pan-Li
MODERN PHYSICS LETTERS B, 2015, 29 (19):
[27] New explicit solitary wave solutions for (2+1)-dimensional Boussinesq equation and (3+1)-dimensional KP equation
Chen, Y
Yan, ZY
Zhang, H
PHYSICS LETTERS A, 2003, 307 (2-3) : 107 - 113
[28] Periodic wave solutions and solitary wave solutions of Kundu equation
Zhang, Weiguo
Guo, Yuli
Zhang, Xue
PHYSICA SCRIPTA, 2025, 100 (03)
[29] Resonance Y-type soliton, hybrid and quasi-periodic wave solutions of a generalized (2+1)-dimensional nonlinear wave equation
He, Lingchao
Zhang, Jianwen
Zhao, Zhonglong
NONLINEAR DYNAMICS, 2021, 106 (03) : 2515 - 2535
[30] Solitary wave, lump and their interactional solutions of the (3+1)-dimensional nonlinear evolution equation
Lan, Lan
Chen, Ai-Hua
Zhou, Ai-Juan
PHYSICA SCRIPTA, 2019, 94 (10)

← 1 2 3 4 5 →