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Research paper thumbnail of Numerical approximation of Atangana-Baleanu Caputo derivative for space-time fractional diffusion equations

AIMS mathematics, 2023

In this study, we attempt to obtain the approximate solution for the time-space fractional linear... more In this study, we attempt to obtain the approximate solution for the time-space fractional linear and nonlinear diffusion equations. A finite difference approach is given for the solution of both linear and nonlinear fractional order diffusion problems. The Riesz fractional derivative in space is specifically approximated using the centered difference scheme. A system of Atangana-Baleanu Caputo equations that have been converted through spatial discretization is solved using a newly developed modified Simpson's 1/3 formula. A study of the proposed scheme is done to ascertain its stability and convergence. It has been shown that for mesh size h and time steps $ \delta t $ the recommended method converges at a rate of $ O(\delta t^2 + h^2) $. Based on graphic results and numerical examples, the application of the model is also examined.

Research paper thumbnail of Numerical approximation of Atangana-Baleanu Caputo derivative for space-time fractional diffusion equations

AIMS Mathematics

In this study, we attempt to obtain the approximate solution for the time-space fractional linear... more In this study, we attempt to obtain the approximate solution for the time-space fractional linear and nonlinear diffusion equations. A finite difference approach is given for the solution of both linear and nonlinear fractional order diffusion problems. The Riesz fractional derivative in space is specifically approximated using the centered difference scheme. A system of Atangana-Baleanu Caputo equations that have been converted through spatial discretization is solved using a newly developed modified Simpson's 1/3 formula. A study of the proposed scheme is done to ascertain its stability and convergence. It has been shown that for mesh size h and time steps $ \delta t $ the recommended method converges at a rate of $ O(\delta t^2 + h^2) $. Based on graphic results and numerical examples, the application of the model is also examined.

Research paper thumbnail of Stability Analysis of an Extended SEIR COVID-19 Fractional Model with Vaccination Efficiency

Computational and Mathematical Methods in Medicine

This work is aimed at presenting a new numerical scheme for COVID-19 epidemic model based on Atan... more This work is aimed at presenting a new numerical scheme for COVID-19 epidemic model based on Atangana-Baleanu fractional order derivative in Caputo sense (ABC) to investigate the vaccine efficiency. Our construction of the model is based on the classical SEIR, four compartmental models with an additional compartment V of vaccinated people extending it SEIRV model, for the transmission as well as an effort to cure this infectious disease. The point of disease-free equilibrium is calculated, and the stability analysis of the equilibrium point using the reproduction number is performed. The endemic equilibrium’s existence and uniqueness are investigated. For the solution of the nonlinear system presented in the model at different fractional orders, a new numerical scheme based on modified Simpson’s 1/3 method is developed. Convergence and stability of the numerical scheme are thoroughly analyzed. We attempted to develop an epidemiological model presenting the COVID-19 dynamics in Italy...

Research paper thumbnail of Stability Analysis of COVID-19 via a Fractional Order Mathematical Model

Proceedings of the International Conference on Fractional Differentiation and its Applications (ICFDA’21)

Research paper thumbnail of Numerical framework for the Caputo time-fractional diffusion equation with fourth order derivative in space

Journal of Applied Mathematics and Computing, 2021

Research paper thumbnail of Numerical approximation of Atangana-Baleanu Caputo derivative for space-time fractional diffusion equations

AIMS mathematics, 2023

In this study, we attempt to obtain the approximate solution for the time-space fractional linear... more In this study, we attempt to obtain the approximate solution for the time-space fractional linear and nonlinear diffusion equations. A finite difference approach is given for the solution of both linear and nonlinear fractional order diffusion problems. The Riesz fractional derivative in space is specifically approximated using the centered difference scheme. A system of Atangana-Baleanu Caputo equations that have been converted through spatial discretization is solved using a newly developed modified Simpson's 1/3 formula. A study of the proposed scheme is done to ascertain its stability and convergence. It has been shown that for mesh size h and time steps $ \delta t $ the recommended method converges at a rate of $ O(\delta t^2 + h^2) $. Based on graphic results and numerical examples, the application of the model is also examined.

Research paper thumbnail of Numerical approximation of Atangana-Baleanu Caputo derivative for space-time fractional diffusion equations

AIMS Mathematics

In this study, we attempt to obtain the approximate solution for the time-space fractional linear... more In this study, we attempt to obtain the approximate solution for the time-space fractional linear and nonlinear diffusion equations. A finite difference approach is given for the solution of both linear and nonlinear fractional order diffusion problems. The Riesz fractional derivative in space is specifically approximated using the centered difference scheme. A system of Atangana-Baleanu Caputo equations that have been converted through spatial discretization is solved using a newly developed modified Simpson's 1/3 formula. A study of the proposed scheme is done to ascertain its stability and convergence. It has been shown that for mesh size h and time steps $ \delta t $ the recommended method converges at a rate of $ O(\delta t^2 + h^2) $. Based on graphic results and numerical examples, the application of the model is also examined.

Research paper thumbnail of Stability Analysis of an Extended SEIR COVID-19 Fractional Model with Vaccination Efficiency

Computational and Mathematical Methods in Medicine

This work is aimed at presenting a new numerical scheme for COVID-19 epidemic model based on Atan... more This work is aimed at presenting a new numerical scheme for COVID-19 epidemic model based on Atangana-Baleanu fractional order derivative in Caputo sense (ABC) to investigate the vaccine efficiency. Our construction of the model is based on the classical SEIR, four compartmental models with an additional compartment V of vaccinated people extending it SEIRV model, for the transmission as well as an effort to cure this infectious disease. The point of disease-free equilibrium is calculated, and the stability analysis of the equilibrium point using the reproduction number is performed. The endemic equilibrium’s existence and uniqueness are investigated. For the solution of the nonlinear system presented in the model at different fractional orders, a new numerical scheme based on modified Simpson’s 1/3 method is developed. Convergence and stability of the numerical scheme are thoroughly analyzed. We attempted to develop an epidemiological model presenting the COVID-19 dynamics in Italy...

Research paper thumbnail of Stability Analysis of COVID-19 via a Fractional Order Mathematical Model

Proceedings of the International Conference on Fractional Differentiation and its Applications (ICFDA’21)

Research paper thumbnail of Numerical framework for the Caputo time-fractional diffusion equation with fourth order derivative in space

Journal of Applied Mathematics and Computing, 2021

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