This paper deals with the numerical solution of Fractional Differential Equations by means of m-step recursions. For the construction of such formulas, we study a technique based on a rational approximation of the generating functions of Fractional Backward Differentiation Formulas (FBDFs). The so-defined methods simulate very well the properties of the underlying FBDFs with important computational advantages. This fact becomes particularly evident especially in the case when they are used for solving problems arising from the semi-discretization of fractional partial differential equations
AbstractIn this paper, two efficient numerical methods for solving system of fractional differential...
We propose two-step collocation methods for the numerical solution of fractional differential equati...
We present a new numerical method to get the approximate solutions of fractional differential equati...
This paper deals with the numerical solution of Fractional Differential Equations by means of m-step...
This paper deals with the numerical solution of Fractional Differential Equations by means of m-step...
In this paper we consider the numerical solution of fractional differential equations by means of m-...
This paper concerns the numerical approximation of Fractional Initial Value Problems (FIVPs). This i...
We present an extrapolation type algorithm for the numerical solution of fractional order differenti...
This paper presents an extension of the trapezoidal integration rule, that in the present work is ap...
In recent years, fractional differential equations have been extensively applied to model various co...
We present an extrapolation type algorithm for the numerical solution of fractional order differenti...
Solving differential equations of fractional (i.e., non-integer) order in an accurate, reliable and ...
AbstractIn this paper, two efficient numerical methods for solving system of fractional differential...
We propose two-step collocation methods for the numerical solution of fractional differential equati...
We present a new numerical method to get the approximate solutions of fractional differential equati...
This paper deals with the numerical solution of Fractional Differential Equations by means of m-step...
This paper deals with the numerical solution of Fractional Differential Equations by means of m-step...
In this paper we consider the numerical solution of fractional differential equations by means of m-...
This paper concerns the numerical approximation of Fractional Initial Value Problems (FIVPs). This i...
We present an extrapolation type algorithm for the numerical solution of fractional order differenti...
This paper presents an extension of the trapezoidal integration rule, that in the present work is ap...
In recent years, fractional differential equations have been extensively applied to model various co...
We present an extrapolation type algorithm for the numerical solution of fractional order differenti...
Solving differential equations of fractional (i.e., non-integer) order in an accurate, reliable and ...
AbstractIn this paper, two efficient numerical methods for solving system of fractional differential...
We propose two-step collocation methods for the numerical solution of fractional differential equati...
We present a new numerical method to get the approximate solutions of fractional differential equati...