Takip et
Mahmut Modanlı
Mahmut Modanlı
harran.edu.tr üzerinde doğrulanmış e-posta adresine sahip
Başlık
Alıntı yapanlar
Alıntı yapanlar
Yıl
On solutions of fractional order telegraph partial differential equation by Crank-Nicholson finite difference method
AA Mahmut Modanli1
Applied Mathematics and Nonlinear Sciences 5 (1), 163-170, 2020
83*2020
Crank–Nicholson difference method and reproducing kernel function for third order fractional differential equations in the sense of Atangana–Baleanu Caputo derivative
A Akgül, M Modanli
Chaos, Solitons & Fractals 127, 10-16, 2019
662019
Numerical solution of fractional telegraph differential equations by theta-method
M Modanli, A Akgül
The European Physical Journal Special Topics 226, 3693-3703, 2017
492017
An operator method for telegraph partial differential and difference equations
A Ashyralyev, M Modanli
Boundary Value Problems 2015, 1-17, 2015
492015
A residual power series method for solving pseudo hyperbolic partial differential equations with nonlocal conditions
M Modanli, ST Abdulazeez, AM Husien
Numerical Methods for Partial Differential Equations, 2020
352020
Analytic solution of fractional order Pseudo-Hyperbolic Telegraph equation using modified double Laplace transform method
ST Abdulazeez, M Modanli
International Journal of Mathematics and Computer in Engineering 1 (1), 105-114, 2023
262023
Two approximation methods for fractional order Pseudo-Parabolic differential equations
M Modanli, E Göktepe, A Akgül, SAM Alsallami, EM Khalil
Alexandria Engineering Journal 61 (12), 10333-10339, 2022
252022
Solutions of fractional order pseudo-hyperbolic telegraph partial differential equations using finite difference method
ST Abdulazeez, M Modanli
Alexandria Engineering Journal 61 (12), 12443-12451, 2022
242022
Two numerical methods for fractional partial differential equation with nonlocal boundary value problem
M Modanlı
Advances in Difference Equations 2018, 1-19, 2018
242018
On the numerical solution for third order fractional partial differential equation by difference scheme method
M Modanli
An International Journal of Optimization and Control: Theories …, 2019
232019
A numerical solution for a telegraph equation
A Ashyralyev, M Modanli
AIP Conference Proceedings 1611 (1), 300-304, 2014
192014
On solutions to the second‐order partial differential equations by two accurate methods
M Modanli, A Akgül
Numerical Methods for Partial Differential Equations 34 (5), 1678-1692, 2018
172018
Using Difference Scheme Method for the Numerical Solution of Telegraph Partial Differential Equation
B Faraj, M Modanli
Journal of Garmian University, 2017
172017
Nonlocal boundary value problem for telegraph equations
A Ashyralyev, M Modanli
AIP Conference Proceedings 1676 (1), 2015
152015
Using matrix stability for variable telegraph partial differential equation
M Modanli, BM Faraj, FW Ahmed
An International Journal of Optimization and Control: Theories …, 2020
122020
Comparison of third-order fractional partial differential equation based on the fractional operators using the explicit finite difference method
SO Abdulla, ST Abdulazeez, M Modanli
Alexandria Engineering Journal 70, 37-44, 2023
92023
Laplace transform collocation method for telegraph equations defined by Caputo derivative
M Modanli, ME Koksal
Mathematical Modelling and Numerical Simulation with Applications 2 (3), 177-186, 2022
92022
On the stability estimates and numerical solution of fractional order telegraph integro-differential equation
F Ozbag, M Modanli
Physica Scripta 96 (9), 094008, 2021
62021
Comparison of Caputo and Atangana–Baleanu fractional derivatives for the pseudohyperbolic telegraph differential equations
M Modanli
Pramana 96 (1), 7, 2022
52022
Double Laplace decomposition method and finite difference method of time-fractional Schrödinger pseudoparabolic partial differential equation with Caputo derivative
M Modanli, B Bajjah
Journal of Mathematics 2021, 1-10, 2021
52021
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