Effect of diffusion parameters on traveling wave solutions of singular perturbed boussinesq equation

             45. Triki H, Benlalli A, Wazwaz AM. Exact solu-  physics, fluid dynamics, mathematical physics, nonlin-
                tions of the generalized Pochhammer-Chree equa-  ear models, mathematical modeling, stability analysis,
                tion with sixth-order dispersion. Rom J Phys.  partial differential equations, numerical methods, ana-
                2015;60:935-951.                              lytical and computational methods.
             46. Jiao X, Yao R, Lou SY. Approximate similar-     http://orcid.org/0000-0001-7568-2251
                ity reduction for singularly perturbed Boussinesq
                equation via symmetry perturbation and direct
                                                              H¨ulya Durur is Associate Professor of Computer
                method. J Math Phys. 2008;49(9):093505.       Engineering at Ardahan University (T¨urkiye). She re-
                 ¨
             47. Ozge¸c AR. Nonlineer iletim hatlarında dalgaların  ceived the Ph.D. degree in “Mathematics” at Ataturk
                Wavelet ve Fourier transform y¨ontemiyle incelen-  University (T¨urkiye). She is reviewer of several in-
                                                     ¨
                mesi (Master’s thesis, Adnan Menderes Univer-  ternational journals in the frame of pure and applied
                sitesi, Fen Bilimleri Enstit¨us¨u). 2010.     mathematics. Her main research interests are: op-
             48. Greiner W. Quantum mechanics: an introduction.  timal control, computational physics, fluid dynamics,
                Springer Science & Business Media; 2011.      mathematical physics, mathematical modeling, nonlin-
             49. Uthayakumar T, Al Sakkaf L, Al Khawaja       ear models, partial differential equations, analytical
                U. Peregrine solitons of the higher-order, in-  and numerical methods.
                homogeneous, coupled, discrete, and nonlocal     http://orcid.org/0000-0002-9297-6873
                nonlinear Schr¨odinger equations. Front Phys.
                2020;8:596886.
                                                              Mehmet Hakan Ekici received his bachelor’s degree
                                                              in “Mathematics” from Firat University (T¨urkiye).
                                                              He is currently pursuing his master’s degree at Arda-
            Asif Yokus is Associate Professor of Applied Math-  han University (T¨urkiye), Institute of Graduate Stud-
            ematics at Firat University (T¨urkiye). He received  ies, Department of Advanced Technologies. His main
            the Ph.D. degree in “Mathematics” at Firat Univer-  research interests are: Diffusion processes, traveling
            sity (T¨urkiye). He is reviewer of several international  wave solutions, nonlinear wave propagation, fluid dy-
            journals in the frame of pure and applied mathemat-  namics.
            ics. His main research interests are: computational  https://orcid.org/0009-0000-9940-6542



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