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• [1] M.O. Al-Amr, Exact solutions of the generalized (2+1)-dimensional nonlinear evolution equations via the modified simple equation method, Comput. Math. Appl, 69(5) (2015), 390-397.
• [2] M. Najafi, S. Arbabi, New Exact Solutions for the Generalized (2+1)-dimensional Nonlinear Evolution Equations by Tanh-Coth Method,. Int. J. Modern Theoretical Phys., 2(2) (2013), 79-85.
• [3] M. Najafi, S. Arbabi, M. Najafi, New application of sine-cosine method for the generalized (2+ 1) dimensional nonlinear evolution equations, Int. J. Adv. Math. Sci.,1(2) (2013), 45-49.
• [4] M. Darvishi, M. Najafi, M. Najafi, New application of EHTA for the generalized (2+ 1)- dimensional nonlinear evolution equations, Int. J. Math. Comp. Sci., 6(3) (2010), 132-138.
• [5] O. I. Bogoyavlenskii, Overturning solitons in new two-dimensional integrable equations, Mathematics of the USSRIzvestiya, 34(2) (1990), 245-259.
• [6] A. M. Wazwaz, New solutions of distinct physical structures to high-dimensional nonlinear evolution equations, Applied Mathematics and Computation, 196 (2008), 363-370.
• [7] Y. Peng, New types of localized coherent structures in the Bogoyavlenskii-Schiff equation,Int. J. Theor. Phys., 45(9) (2006), 1779-1783.
• [8] T. Kobayashi, K. Toda, The Painleve test and reducibility to the canonical forms for higher-dimensional soliton equations with variable-coefficients, Symmetry, Inerrability and Geometry,Methods and Applications, 2 (2006),1-10.
• [9] M. S. Bruzon, M. L. Gandarias, C. Muriel, J. Rami rez, S. Saez, F. R. Romero, The Calogero-Bogoyavlenskii-Schiff equation in (2 +1)-dimensions,Theoretical and Mathematical Physics, 137(1) (2003), 1367-1377.
• [10] M. L. Gandarias, M. S. Bruzon, Symmetry group analysis and similarity solutions of the CBS equation in (2+1)-dimensions, Proceedings of Applied Mathematics and Mechanics, 8 (2008), 10591-10592, DOI10.1002/pamm.200810591
• [11] H. P. Zhang, Y. Chen, B. Li, Infinitely many symmetries and symmetry reduction of the (2+1)dimensional generalized Calogero-Bogoyavlenskii-Schiff equation, Acta Physica Sinaca, 58 (2009), 7393-7396.
• [12] B. Li, Y. Chen, Exact analytical solutions of the generalized Calogero-Bogoyavlenskii-Schiff equation using symbolic computation, Czechoslovak Journal of Physics, 54 (2004), 517-528.
• [13] J. Wang, X. Yang, Quasi-periodic wave solutions for the (2 + 1)-dimensional generalized Calogero-Bogoyavlenskii-Schiff (CBS) equation, Nonlinear Analysis, 75 (2012), 2256-2261.
• [14] E. Yasar, Y. Yıldırım, A. Adem, Perturbed optical solitons with spatio-temporal dispersion in (2 + 1)-dimensions by extended Kudryashov method,Optik, 158 (2018), 1–14.
• [15] H. Roshid, M. Roshid, N. Rahman, M. R. Pervin, New solitary wave in shallow water, plasma and ion acoustic plasma via the GZK-BBM equation and the RLW equation,Propulsion and Power Research, 6(1) (2017), 49–57.
• [16] H. Roshid, M. A. Hoque, M. A. Akbar, New extended (G’/G)-expansion method for traveling wave solutions of nonlinear partial differential equations (NPDEs) in mathematical physics,Italian. J. Pure Appl. Math., 33 (2014), 175-190.
• [17] L. Feng, T. Zhang, Breather wave, rogue wave and solitary wave solutions of a coupled nonlinear Schrodinger equation, Appl. Math. Lett., 78(2018), 133-140.
• [18] X. Shuwei, H. Jingsong,The rogue wave and breather solution of the Gerdjikov-Ivanov equation,J. Math. Phys. 53 (2012).
• [19] A. Biswas, M. Mirzazadeh, M. Eslami, Q. Zhou, A. Bhrawy, M. Belic,. Optical solitons in nano-fibers with spatio-temporal dispersion by trial solution method, Optik, 127(18) (2016), 7250–7257.
• [20] J. Heris, I. Zamanpour,Analytical treatment of the Coupled Higgs Equation and the Maccari System via Exp-Function Method,Acta Universitatis Apulensis, 33 (2013), 203-216.
• [21] Y. Zhao,New Exact Solutions for a Higher-Order Wave Equation of KdV Type Using the Multiple Simplest Equation Method,Journal of Applied Mathematics,(2014), 1-13.
• [22] M. Islam, H. Roshid,Application of -expansion method for Tzitzeica type nonlinear evolution equations,Journal for Foundations and Applications of Physics, 4 (1) (2017).
• [23] N. Rahman, S. Akter,H. Roshid,M. Alam,Traveling Wave Solutions of The (1+1)-Dimensional Compound KdVB equation by $\exp ( - \phi (\xi ))$ –Expansion Method,Global Journal of Science Frontier Research, 13 (8) (2014), 7-13.
• [24] R. Islam, M. Alam, A. Hossain, H. Roshid, M. Akbar, Traveling wave solutions of nonlinear evolution equations via $\exp ( - \phi (\xi ))$ –Expansion Method,Global Journal of Scientific Frontier Research, 13 (11) (2014), 63-71.
• [25] N. Kadkhoda, H. Jafari,Analytical solutions of the Gerdjikov–Ivanov equation by using $\exp ( - \phi (\xi ))$–expansion method,Optik, 139 (2017), 72–76.
• [26] B. Amfilokhiev, I. Voitkunskii, P. Mazaeva, S. Khodorkovskii,Flows of polymer solutions in the case of convective accelerations,Tr. Leningr. Korablestroit. Inst., 96 (1975),3-9.
• [27] M. Roshid,H. Roshid, Exact and explicit traveling wave solutions to two nonlinear evolution equations which describe incompressible viscoelastic Kelvin-Voigt fluid,Heliyon, 4 (2018).
• [28] O. Gozukızıl, S. Akcagıl, The tanh-coth method for some nonlinear pseudoparabolic equations with exact solutions, Advances in Difference Equations, 143 (2013).
• [29] A. Turgut, T. Aydemir, A. Saha, A. Kara, Propagation of nonlinear shock waves for the generalised Oskolkov equation and its dynamic motions in the presence of an external periodic perturbation,Pramana – J. Phys., (2018), 78-90.
• [30] J.L.G Guirao .,H. M. Baskonus , A. Kumar, M.S. Rawat , G. Yel, Complex Patterns to the (3+1)-Dimensional B-type Kadomtsev-Petviashvili-Boussinesq Equation, Symmetry, 12(1) (2020).
• [31] W. Gao, G. Yel,H. M. Baskonus, C. Cattani, Complex solitons in the conformable (2+1)-dimensional Ablowitz-Kaup- Newell-Segur equation, Aims Math., 5(1) (2020), 507–521.
• [32] W. Gao, H. F. Ismael, H. Bulut, .H. M Baskonus, Instability modulation for the (2+1)-dimension paraxial wave equation and its new optical soliton solutions in Kerr media, Physica Scripta, (2019),DOI:10.1088/1402-4896/ab4a50.
• [33] W. Gao, M. Partohaghighi, H. M. Baskonus, S. Ghavi, Regarding the group preserving scheme and method of line to the numerical simulations of Klein–Gordon model,Results Phys., 15 (102555) (2019), 1-7.
• [34] H. M. Baskonus, S. Ghavi, New singular soliton solutions to the longitudinal wave equation in a magneto-electro-elastic circular rod with MM-derivative,Modern Phys. Letters B, 33(21) (2019), 1950251-(1-16).
• [35] H. M. Baskonus, Complex Soliton Solutions to the Gilson–Pickering Model, Axioms, 8(1) (2019), 18.
• [36] O.A. Ilhan , A. Esen, H. Bulut, H. M. Baskonus, Singular solitons in the pseudo-parabolic model arising in nonlinear surface waves, Results Phys , 12 (2019), 1712–1715.
• [37] G. Yel, H. M. Baskonus, H. Bulut, Regarding some novel exponential travelling wave solutions to the Wu–Zhang system arising in nonlinear water wave model, Indian J. Phys., 93(8) (2019), 1031–1039.
• [38] A. Yokus, Numerical solution for space and time fractional order Burger type equation, Alexandria Eng. J. 57(3) (2018), 2085-2091.