Meryem Odabaşı scite author profile

Communicated by I. StratisIn this study, the nonlinear fractional partial differential equations have been defined by the modified Riemann-Liouville fractional derivative. By using this fractional derivative and traveling wave transformation, the nonlinear fractional partial differential equations have been converted into nonlinear ordinary differential equations. The modified trial equation method is implemented to obtain exact solutions of the nonlinear fractional Klein-Gordon equation and fractional clannish random walker's parabolic equation. As a result, some exact solutions including single kink solution and periodic and rational function solutions of these equations have been successfully obtained.

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Traveling wave solutions of conformable time-fractional Zakharov–Kuznetsov and Zoomeron equations

Odabaşı

2020

Chinese Journal of Physics

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On the conformable nonlinear schrödinger equation with second order spatiotemporal and group velocity dispersion coefficients

Rezazadeh

Odabaşı

Tariq

et al. 2021

Chinese Journal of Physics

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Exact analytical solutions of the fractional biological population model, fractional EW and modified EW equations

Odabaşı

2020

Int. J. Optim. Control, Theor. Appl. (IJOCTA)

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In this paper, exact analytical solutions of the biological population model, the EW and the modified EW equations with a conformable derivative operator have been examined by means of the trial solution algorithm and the complete discrimination system. Dark, bright and singular traveling wave solutions of the equations have been obtained by algorithm. Also, revealed singular periodic solutions have been listed. All solutions were verified by substituting them into their corresponding equation via Mathematica package program.

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Analytical solutions of some nonlinear fractional‐order differential equations by different methods

Odabaşı

Pınar

Koçak

2020

Math Methods in App Sciences

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In this work, we investigate exact solutions of some fractional‐order differential equations arising in mathematical physics. We consider the space‐time fractional Kaup‐Kupershmidt, the space‐time fractional Fokas, and the space‐time fractional breaking soliton equations, which have important applications in science and engineering. Exact traveling wave solutions of these equations have been established by different efficient methods.

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