This paper deals with some numerical issues about the rational approximation to fractional differential operators provided by the Pad\ub4e approximants. In particular, the attention is focused on the fractional Laplacian and on the Caputo derivative which, in this context, occur into the definition of anomalous diffusion problems and of time fractional differential equations (FDEs), respectively. The paper provides the algorithms for an efficient implementation of the IMEX schemes for semi-discrete anomalous diffusion problems and of the short-memory-FBDF methods for Caputo\u2019s FDEs
We present some new results that deal with the fractional decomposition method (FDM). This method is...
AbstractFractional differentials provide more accurate models of systems under consideration. In thi...
Fractional analog of the reaction diffusion equation is used to model the subdiffusion process. Diff...
This paper deals with some numerical issues about the rational approximation to fractional different...
A Finite Element Method formulation is developed for the solution of the anomalous diffusion equati...
We develop a fully discrete scheme for time-fractional diffusion equations by using a finite differ...
In Chapter 1, we gave a partial contribution to the Mainardi's conjecture, concerning only small int...
This book discusses numerical methods for solving partial differential and integral equations, as we...
In this talk, I’d like to present an overview of our recent works on the finite difference methods f...
In this paper we consider the solution of the fractional differential equations. In particular, we c...
This dissertation presents new numerical methods for the solution of fractional differential equatio...
We present a new numerical tool to solve partial differential equations involving Caputo derivative...
In this paper, we develop a new approximation technique for solving space fractional diffusion equat...
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
We propose an efficient numerical method for a class of fractional diffusion-wave equations with the...
We present some new results that deal with the fractional decomposition method (FDM). This method is...
AbstractFractional differentials provide more accurate models of systems under consideration. In thi...
Fractional analog of the reaction diffusion equation is used to model the subdiffusion process. Diff...
This paper deals with some numerical issues about the rational approximation to fractional different...
A Finite Element Method formulation is developed for the solution of the anomalous diffusion equati...
We develop a fully discrete scheme for time-fractional diffusion equations by using a finite differ...
In Chapter 1, we gave a partial contribution to the Mainardi's conjecture, concerning only small int...
This book discusses numerical methods for solving partial differential and integral equations, as we...
In this talk, I’d like to present an overview of our recent works on the finite difference methods f...
In this paper we consider the solution of the fractional differential equations. In particular, we c...
This dissertation presents new numerical methods for the solution of fractional differential equatio...
We present a new numerical tool to solve partial differential equations involving Caputo derivative...
In this paper, we develop a new approximation technique for solving space fractional diffusion equat...
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
We propose an efficient numerical method for a class of fractional diffusion-wave equations with the...
We present some new results that deal with the fractional decomposition method (FDM). This method is...
AbstractFractional differentials provide more accurate models of systems under consideration. In thi...
Fractional analog of the reaction diffusion equation is used to model the subdiffusion process. Diff...