Results 171 to 180 of about 454 (184)
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Fractals
In this paper, our focus lies in exploring the Kudryashov auxiliary equation method as a means to derive several exact solutions to a conformable nonlinear Schrödinger equation. This particular model combines Kudryashov’s arbitrary refractive index alongside two various non-local nonlinearity.
MUHAMMAD AMIN SADIQ MURAD +4 more
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In this paper, our focus lies in exploring the Kudryashov auxiliary equation method as a means to derive several exact solutions to a conformable nonlinear Schrödinger equation. This particular model combines Kudryashov’s arbitrary refractive index alongside two various non-local nonlinearity.
MUHAMMAD AMIN SADIQ MURAD +4 more
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AIP Conference Proceedings, 2014
In this study, we consider exact solutions of nonlinear time-fractional Klein-Gordon equation by using generalized Kudryashov method (GKM). The nonlinear time-fractional Klein-Gordon equation can be converted into nonlinear ordinary differantial equation by transformation. Consequently, GKM has been implemented to find exact solutions of nonlinear time-
Seyma Tuluce Demiray +2 more
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In this study, we consider exact solutions of nonlinear time-fractional Klein-Gordon equation by using generalized Kudryashov method (GKM). The nonlinear time-fractional Klein-Gordon equation can be converted into nonlinear ordinary differantial equation by transformation. Consequently, GKM has been implemented to find exact solutions of nonlinear time-
Seyma Tuluce Demiray +2 more
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Applications of generalized Kudryashov method to non linear evolution equations
AIP Conference Proceedings, 2022Monika Jangra +2 more
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Application of Generalized Kudryashov Method to the Burger Equation
International Journal of Mathematics Trends and Technology, 2016Rafiqul Islam, Harun-Or Roshid
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Modern Physics Letters A
In this paper, we study variational integrators (VIs) with the help of projection technique for Korteweg–de Vries (KdV) equation. First, we use forward, backward and central difference schemes. After that, we use Lagrangian, Euler–Lagrange equation and discrete Euler–Lagrange equation to find numerical solution to KdV equation.
Syed T. R. Rizvi +4 more
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In this paper, we study variational integrators (VIs) with the help of projection technique for Korteweg–de Vries (KdV) equation. First, we use forward, backward and central difference schemes. After that, we use Lagrangian, Euler–Lagrange equation and discrete Euler–Lagrange equation to find numerical solution to KdV equation.
Syed T. R. Rizvi +4 more
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Optical solitons and conservation laws with generalized Kudryashov’s law of refractive index
Chaos, Solitons and Fractals, 2020Elsayed M E Zayed +2 more
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Solitons and conservation laws in magneto–optic waveguides with generalized Kudryashov’s equation
Chinese Journal of Physics, 2021Elsayed M E Zayed +2 more
exaly
Modified Kudryashov Method to Solve Generalized Kuramoto-Sivashinsky Equation
Symmetry, 2018Adem Kiliçman +1 more
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