The Exact Rational Solutions to a Shallow Water Wave-Like Equation by Generalized Bilinear Method

The Exact Rational Solutions to a Shallow Water Wave-Like Equation by Generalized Bilinear Method

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摘要 A Shallow Water Wave-like nonlinear differential equation is considered by using the generalized bilinear equation with the generalized bilinear derivatives D3,x and D3,t, which possesses the same bilinear form as the standard shallow water wave bilinear equation. By symbolic computation, four presented classes of rational solutions contain all rational solutions to the resulting Shallow Water Wave-like equation, which generated from a search for polynomial solutions to the corresponding generalized bilinear equation. A Shallow Water Wave-like nonlinear differential equation is considered by using the generalized bilinear equation with the generalized bilinear derivatives D3,x and D3,t, which possesses the same bilinear form as the standard shallow water wave bilinear equation. By symbolic computation, four presented classes of rational solutions contain all rational solutions to the resulting Shallow Water Wave-like equation, which generated from a search for polynomial solutions to the corresponding generalized bilinear equation.

作者 Minzhi Wei Junning Cai

机构地区 School of Information and Statistics

出处《Journal of Applied Mathematics and Physics》 2017年第3期715-721,共7页 应用数学与应用物理（英文）

关键词 Rational Solution GENERALIZED BILINEAR EQUATION SHALLOW Water Wave EQUATION Rational Solution Generalized Bilinear Equation Shallow Water Wave Equation

分类号 O1 [理学—基础数学]

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1Wen-Xiu MA.Trilinear equations, Bell polynomials, and resonant solutions[J].Frontiers of Mathematics in China,2013,8(5):1139-1156. 被引量：4

二级参考文献31

1Bell E T. Exponential polynomials. Ann Math, 1934, 35: 258-277.
2Bogdan M M, Kovalev A S. Exact multisoliton solution of one-dimensional Landau-Lifshitz equations for an anisotropic ferromagnet. JETP Lett, 1980, 31(8): 424-427.
3Broer L J F. Approximate equations for long wave equations. Appl Sci Res, 1975, 31(5): 377-395.
4Craik ADD. Prehistory of Faa di Bruno's formula. Amer Math Monthly, 2005, 112: 217-234.
5Delzell C N. A continuous, constructive solution to Hilbert's 17th problem. Invent Math, 1984, 76(3): 365-384.
6Gilson C, Lambert F, Nimmo J, Willox R. On the combinatorics of the Hirota D-operators. Proc R Soc Lond A, 1996, 452: 223-234.
7Grammaticos B, Ramani A, Hietarinta J. Multilinear operators: the natural extension of Hirota's bilinear formalism. Phys Lett A, 1994, 190(1): 65-70.
8Hietarinta J. Hirota's bilinear method and soliton solutions. Phys AUC, 2005, 15(part 1): 31-37.
9Hirota R. Exact solution of the Korteweg-de Vries equation for multiple collisions of solitons. Phys Rev Lett, 1971, 27: 1192-1194.
10Hirota R. A new form of Backlund transformations and its relation to the inverse scattering problem. Progr Theoret Phys, 1974, 52: 1498-1512.

共引文献3

1马彩虹,邓爱平.Lump Solution of (2+1)-Dimensional Boussinesq Equation[J].Communications in Theoretical Physics,2016,65(5):546-552. 被引量：5
2嵇纯德.(2+1)维类浅水波方程的有理解[J].山东工业技术,2017(4):221-223.
3张艳妮,庞晶.构造维数约化的变系数的B-type KP方程的解（英文）[J].数学杂志,2019,39(1):121-127. 被引量：1

1刘海蓉.THE HOMOGENEOUS POLYNOMIAL SOLUTIONS FOR THE GRUSHIN OPERATOR[J].Acta Mathematica Scientia,2018,38(1):237-247.
2Raphael Mukaro.Cross-Correlation of Station-to-Station Free Surface Elevation Time Series for Breaking Water Waves[J].Applied Mathematics,2018,9(2):138-152.
3Ningning Hu,Shufang Deng.The Modified Kadomtsev-Petviashvili Equation with Binary Bell Polynomials[J].Journal of Applied Mathematics and Physics,2014,2(7):587-592.
4Souleymanou Abbagari,Saliou Youssoufa,Hermann T. Tchokouansi,Victor K. Kuetche,Thomas B. Bouetou,Timoleon C. Kofane.N-Rotating Loop-Soliton Solution of the Coupled Integrable Dispersionless Equation[J].Journal of Applied Mathematics and Physics,2017,5(6):1370-1379.
5Muhammad Iqbal,Yufeng Zhang.Painleve Analysis for(2+1)Dimensional Non-Linear Schrodinger Equation[J].Applied Mathematics,2017,8(11):1539-1545.
6Shamima Sultana,Zillur Rahman.Hamiltonian Formulation for Water Wave Equation[J].Open Journal of Fluid Dynamics,2013,3(2):75-81.
7方涛,王惠,王云虎,马文秀.High-Order Lump-Type Solutions and Their Interaction Solutions to a (3+1)-Dimensional Nonlinear Evolution Equation[J].Communications in Theoretical Physics,2019,71(8):927-934.
8程雪苹,马文秀,杨云青.Lump-type solutions of a generalized Kadomtsev–Petviashvili equation in(3+1)-dimensions[J].Chinese Physics B,2019,28(10):245-252. 被引量：1
9Amara Chandoul.On Polynomials Solutions of Quadratic Diophantine Equations[J].Advances in Pure Mathematics,2011,1(4):155-159.
10Kezhao Fang,Zifeng Jiao,Jing Yin,Jiawen Sun.A Central Numerical Scheme to 1D Green-Naghdi Wave Equations[J].Journal of Applied Mathematics and Physics,2015,3(8):1032-1037.

Journal of Applied Mathematics and Physics

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The Exact Rational Solutions to a Shallow Water Wave-Like Equation by Generalized Bilinear Method

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