Browsing by Author "Kaplan, M"
Now showing 1 - 20 of 48
- Results Per Page
- Sort Options
Web of Science A Mathematical Analysis of a Model Involving an Integrable Equation for Wave Packet Envelope(2022.01.01) Kaplan, M; Akbulut, AWeb of Science A new computational investigation to the new exact solutions of (3(2022.01.01) Zhou, MJ; Akbulut, A; Kaplan, M; Kaabar, MKA; Yue, XGWeb of Science A new exploration of some explicit soliton solutions of q-deformed Sinh-Gordon equation utilizing two novel techniques(2023.01.01) Raza, N; Butt, AR; Arshed, S; Kaplan, MWeb of Science A Variety of Novel Exact Solutions for Different Models With the Conformable Derivative in Shallow Water(2020.01.01) Kumar, D; Kaplan, M; Haque, MR; Osman, MS; Baleanu, DWeb of Science Abundant soliton-type solutions to the new generalized KdV equation via auto-Backlund transformations and extended transformed rational function technique(2022.01.01) Jannat, N; Kaplan, M; Raza, NWeb of Science An effective computational approach and sensitivity analysis to pseudo-parabolic-type equations(2021.01.01) Kaplan, M; Butt, AR; Thabet, H; Akbulut, A; Raza, N; Kumar, DWeb of Science An exploration of novel soliton solutions for propagation of pulses in an optical fiber(2022.01.01) Raza, N; Arshed, S; Kaplan, M; Butt, ARWeb of Science Application of the modified Kudryashov method to the generalized Schrodinger-Boussinesq equations(2018.01.01) Kumar, D; Kaplan, MWeb of Science Publication Applications of two reliable methods for solving a nonlinear conformable time-fractional equation(2017-09-01) Kaplan M.; Kaplan, MThe current work presents analytical solutions of a nonlinear conformable time-fractional equation by using two different techniques. These are the modified simple equation method and the exponential rational function method. Based on the conformable fractional derivative and traveling wave transformation, the fractional partial differential equation is turned into the nonlinear non-fractional ordinary differential equation. Therefore, we implement the algorithms to this nonlinear non-fractional ordinary differential equation. To the best of our knowledge, the exact solutions obtained in this paper might be very useful in various areas of applied mathematics in interpreting some physical phenomena.Web of Science Auto-Backlund transformations and solitary wave solutions for the nonlinear evolution equation(2018.01.01) Kaplan, M; Ozer, MNWeb of Science Auxiliary equation method for time-fractional differential equations with conformable derivative(2018.01.01) Akbulut, A; Kaplan, MWeb of Science Complexiton and resonant multi-solitons of a (4+1)-dimensional Boiti-Leon-Manna-Pempinelli equation(2022.01.01) Raza, N; Kaplan, M; Javid, A; Inc, MWeb of Science Construction of complexiton-type solutions using bilinear form of Hirota-type(2023.01.01) Kaplan, M; Raza, NWeb of Science Different Types of Progressive Wave Solutions via the 2D-Chiral Nonlinear Schrodinger Equation(2020.01.01) Osman, MS; Baleanu, D; Tariq, KUH; Kaplan, M; Younis, M; Rizvi, STRWeb of Science Dynamical investigation of time-fractional order Phi-4 equations(2022.01.01) Younas, HM; Iqbal, S; Siddique, I; Kaabar, MKA; Kaplan, MWeb of Science Exact periodic and explicit solutions of higher dimensional equations with fractional temporal evolution(2018.01.01) Raza, N; Sial, S; Kaplan, MWeb of Science Exact traveling wave solutions of the Wu-Zhang system describing (1+1)-dimensional dispersive long wave(2017.01.01) Kaplan, M; Mayeli, P; Hosseini, KWeb of Science Explicit iteration and unbounded solutions for fractional q-difference equations with boundary conditions on an infinite interval(2022.01.01) Boutiara, A; Benbachir, M; Kaabar, MKA; Martinez, F; Samei, ME; Kaplan, MWeb of Science Exploration of New Solitons for the Fractional Perturbed Radhakrishnan-Kundu-Lakshmanan Model(2023.01.01) Kaplan, M; Alqahtani, RT
- «
- 1 (current)
- 2
- 3
- »