Bifurcation and solitary waves of the nonlinear wave equation with quartic polynomial potential
被引量:2
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1 HUA Cun-Cai LIU Yan-Zhu.Bifurcation and Solitary Waves of the Combined KdV and KdV Equation[J] .Communications in Theoretical Physics,2002(8):133-138. 被引量:5
2 Hua C C, Li K T. On the solitary wave solutions of the CQNLS[J]. Chaos, Solitons and Fractals, 2005, 25 (5) : 1169 - 1175.
3 HUA C C, LI K T. On the solitary wave solutions of the CQNLS [ J ]. Chaos, Solitons and Fractals ,2005 ,25 (5) : 1 169-1 175.
4 化存才.商品定价的几个数学模型与春运客票价格的政府调控政策研究[C].第十届中国青年信息与管理大会论文集,洛阳:Global-LinkPublisher,2008:12-17.
5 化存才,陈关荣.一类平面Hamilton系统的大范围非线性化近似方法[J] .力学季刊,2009,30(4):569-576. 被引量:1
6 化存才,刘延柱.Bifurcation,Bi—instability and Area Principle for the Solitary Waves of the Nonlinear Wave Equation with Quartic Polynomial Potential[J] .Chinese Physics Letters,2002,19(7):885-888. 被引量:3
7 HUACun-Cai LIUYan-Zhu.Solitary Waves of a Perturbed sine—Gordon Equation[J] .Communications in Theoretical Physics,2002,37(1):21-26. 被引量:2
1 化存才,刘延柱.Bifurcation,Bi—instability and Area Principle for the Solitary Waves of the Nonlinear Wave Equation with Quartic Polynomial Potential[J] .Chinese Physics Letters,2002,19(7):885-888. 被引量:3
2 周盛凡.ATTRACTOR AND DIMENSION FOR STRONGLY DAMPED NONLINEAR WAVE EQUATION[J] .Acta Mathematicae Applicatae Sinica,2000,16(3):266-273.
3 WANG Yan Ping.The Existence and Non-Existence of Global Solutions for a Nonlinear Wave Equation[J] .Journal of Mathematical Research and Exposition,2009,29(1):164-168.
4 张再云,黄建华,孙明保.ALMOST CONSERVATION LAWS AND GLOBAL ROUGH SOLUTIONS OF THE DEFOCUSING NONLINEAR WAVE EQUATION ON R^2[J] .Acta Mathematica Scientia,2017,37(2):385-394.
5 SONG Zhi-hua.Energy Decay of Solution to a Nonlinear Wave Equation of Kirchhoff Type[J] .Chinese Quarterly Journal of Mathematics,2013,28(4):485-491.
6 TIANDe-sheng ZENGXian-wu YUChang-chun LIPei-luan.The Center and the Fine Focus for a Class of Quartic Polynomial Poincare Equations[J] .Wuhan University Journal of Natural Sciences,2004,9(6):867-870. 被引量:2
7 Huabing Jia,Enrang Yan(Dept. of Math.,Baoji University of Arts and Sciences,Baoji 721013,Shaanxi).EXACT SOLUTIONS TO NONLINEAR WAVE EQUATION[J] .Annals of Differential Equations,2011,27(1):13-18.
8 Xuemei DENG,Wei XIANG.Global Solutions of Shock Reflection by Wedges for the Nonlinear Wave Equation[J] .Chinese Annals of Mathematics,Series B,2011,32(5):643-668.
9 袁晓君,王光明,林为干.AN APPROXIMATE SOLUTION OF NONLINEAR WAVE EQUATION[J] .Journal of Electronics(China),1994,11(3):268-272.
10 李想,张卫国,李正明,Ji-bin LI.Shape analysis and damped oscillatory solutions for a class of nonlinear wave equation with quintic term[J] .Applied Mathematics and Mechanics(English Edition),2014,35(1):117-132.
