Fractional derivatives of Prabhakar type are capturing an increasing interest since their ability to describe anomalous relaxation phenomena (in dielectrics and other fields) showing a simultaneous nonlocal and nonlinear behaviour. In this paper we study the asymptotic stability of systems of differential equations with the Prabhakar derivative, providing an exact characterization of the corresponding stability region. Asymptotic expansions (for small and large arguments) of the solution of linear differential equations of Prabhakar type and a numerical method for nonlinear systems are derived. Numerical experiments are hence presented to validate theoretical findings
This study presents new estimates for fractional derivatives without singular kernels defined by som...
In this paper, the stability with respect to part of the variables of nonlinear Caputo fractional di...
This paper investigates a fractional-order linear system in the frame of Atangana–Baleanu fractional...
Fractional derivatives of Prabhakar type are capturing an increasing interest since their ability to...
In this article, we survey the Lyapunov direct method for distributed-order nonlinear time-varying s...
The fractional calculus (integration and differentiation of fractional-order) is a one of the singul...
In this letter stability analysis of fractional order nonlinear systems is studied. Some new suffici...
In this paper, stability analysis of a fractional-order linear system described by the Caputo⁻...
The Prabhakar function (namely, a three parameter Mittag–Leffler function) is investigated. This fun...
The Prabhakar function (namely, a three parameter MittagâLeffler function) is investigated. This fun...
The fractional differential equations involving different types of fractional derivatives are curren...
We study the Mittag-Leffler and class-K function stability of fractional differential equations with...
In this paper, we study the recently proposed fractional-order operators with general analytic kerne...
International audienceThis paper addresses the numerical computation of periodic solutions of nonlin...
The theory and applications of fractional calculus (FC) had a considerable progress during the last ...
This study presents new estimates for fractional derivatives without singular kernels defined by som...
In this paper, the stability with respect to part of the variables of nonlinear Caputo fractional di...
This paper investigates a fractional-order linear system in the frame of Atangana–Baleanu fractional...
Fractional derivatives of Prabhakar type are capturing an increasing interest since their ability to...
In this article, we survey the Lyapunov direct method for distributed-order nonlinear time-varying s...
The fractional calculus (integration and differentiation of fractional-order) is a one of the singul...
In this letter stability analysis of fractional order nonlinear systems is studied. Some new suffici...
In this paper, stability analysis of a fractional-order linear system described by the Caputo⁻...
The Prabhakar function (namely, a three parameter Mittag–Leffler function) is investigated. This fun...
The Prabhakar function (namely, a three parameter MittagâLeffler function) is investigated. This fun...
The fractional differential equations involving different types of fractional derivatives are curren...
We study the Mittag-Leffler and class-K function stability of fractional differential equations with...
In this paper, we study the recently proposed fractional-order operators with general analytic kerne...
International audienceThis paper addresses the numerical computation of periodic solutions of nonlin...
The theory and applications of fractional calculus (FC) had a considerable progress during the last ...
This study presents new estimates for fractional derivatives without singular kernels defined by som...
In this paper, the stability with respect to part of the variables of nonlinear Caputo fractional di...
This paper investigates a fractional-order linear system in the frame of Atangana–Baleanu fractional...