Periodic wave solutions and solitary wave solutions of generalized modified Boussinesq equation and evolution relationship between both solutions
Li, S.; Zhang, W.; Bu, X.
Journal of Mathematical Analysis and Applications 449(1): 96-126
2017
ISSN/ISBN: 0022-247X Accession: 086542867
PDF emailed within 1 workday: $29.90
Related References
Zhang, W.; Li, S.; Tian, W.; Zhang, L. 2008: Exact solitary-wave solutions and periodic wave solutions for generalized modified Boussinesq equation and the effect of wave velocity on wave shape Acta Mathematicae Applicatae Sinica, English Series 24(4): 691-704Li, W.; Zhao, Y.; Ding, Y. 2012: Solitary Wave Solutions and Periodic Wave Solutions of the B(m,n) Equation with Generalized Evolution Term Differential Equations and Dynamical Systems 20(1): 77-91
Jibin Li; Yi Zhang 2009: Exact loop solutions, cusp solutions, solitary wave solutions and periodic wave solutions for the special CHDP equation Nonlinear Analysis: Real World Applications 10(4): 2502-2507
Yu, L; Tian, L 2014: Loop solutions, breaking kink (or anti-kink) wave solutions, solitary wave solutions and periodic wave solutions for the two-component Degasperis Procesi equation Nonlinear Analysis: Real World Applications 15: 140-148
Kaya, D. 2006: The exact and numerical solitary-wave solutions for generalized modified Boussinesq equation Physics Letters A 348(3-6): 244-250
Wang, K.; Wang, G. 2021: Solitary and periodic wave solutions of the generalized fourth‐order Boussinesq equation via He's variational methods Mathematical Methods in the Applied Sciences 44(7): 5617-5625
Zhang, W.; Zhao, Y.; Liu, G.; Ning, T. 2010: Periodic Wave Solutions for Pochhammer–chree Equation with Five Order Nonlinear Term and their Relationship with Solitary Wave Solutions International Journal of Modern Physics B 24(19): 3769-3783
Wazwaz, A.M. 2006: Compactons and solitary wave solutions for the boussinesq wave equation and its generalized form Applied Mathematics and Computation 182(1): 529-535
Qi, W; Yong, C; Hong-Qing, Z 2005: Rational Form Solitary Wave Solutions and Doubly Periodic Wave Solutions to (1+1)-Dimensional Dispersive Long Wave Equation Communications in Theoretical Physics 43(6): 975-982
Zhaosheng, F.E.N.G. 2003: Traveling solitary wave solutions to the generalized Boussinesq equation Wave Motion 37(1): 17-23
Yong, C; Zhen-Ya, Y; Biao, L; Hong-Qing, Z 2002: New Explicit Solitary Wave Solutions and Periodic Wave Solutions for the Generalized Coupled Hirota-Satsuma KdV System Communications in Theoretical Physics 38(3): 261-266
Changfu, L.I.U.; Zhengde, D.A.I. 2010: Exact periodic solitary wave solutions for the (2 + 1)-dimensional Boussinesq equation Journal of Mathematical Analysis and Applications 367(2): 444-450
Hongying, L.U.O.; Mianyi, D.U.A.N.; Xi, L.I.U.; Jun, L.I.U. 2010: Explicit periodic solitary wave solutions for the (2 + 1)-dimensional Boussinesq equation Applied Mathematics and Computation 217(2): 826-829
Yan, Z.; Zhang, H. 2001: New explicit solitary wave solutions and periodic wave solutions for Whitham–Broer–Kaup equation in shallow water Physics Letters A 285(5-6): 355-362
Li, Z.; Dai, Z. 2011: Exact periodic cross-kink wave solutions and breather type of two-solitary wave solutions for the (3 + 1)-dimensional potential-YTSF equation Computers-Mathematics with Applications 61(8): 1939-1945
Liu, Y. 2000: Strong Instability of Solitary-Wave Solutions of a Generalized Boussinesq Equation Journal of Differential Equations 164(2): 223-239
Ming, S.O.N.G.; Shuguang, S.H.A.O. 2010: Exact solitary wave solutions of the generalized (2 + 1 ) dimensional Boussinesq equation Applied Mathematics and Computation 217(7): 3557-3563
Li, W. 2013: Solitary Wave Solutions and Periodic Wave Solutions of the K(m,n)Equation witht-Dependent Coefficients Journal of Applied Mathematics 2013: 1-8
Meng, Q.; He, B. 2013: Exact Peakon, Compacton, Solitary Wave, and Periodic Wave Solutions for a Generalized Kd V Equation Mathematical Problems in Engineering 2013: 1-19
Ming, S.O.N.G.; Jionghui, C.A.I. 2010: Solitary wave solutions and kink wave solutions for a generalized Zakharov-Kuznetsov equation Applied Mathematics and Computation 217(4): 1455-1462