This paper proposes the calculation of fractional algorithms based on time-delay systems. The study starts by analyzing the memory properties of fractional operators and their relation with time delay. Based on the Fourier analysis an approximation of fractional derivatives through time-delayed samples is developed. Furthermore, the parameters of the proposed approximation are estimated by means of genetic algorithms. The results demonstrate the feasibility of the new perspective.</p
In this paper a new method for the calculation of the fractional expressions in the presence of sens...
This paper addresses the calculation of derivatives of fractional order for non-smooth data. The noi...
This paper aims to demonstrate the superiority of the discrete Chebyshev polynomials over the classi...
This paper explores the calculation of fractional integrals by means of the time delay operator. The...
This study addresses the optimization of rational fraction approximations for the discrete-time calc...
In this work, we study variational problems with time delay and higher-order distributed-order fract...
This paper is concerned with deriving an operational matrix of fractional-order derivative of Fibona...
We survey some representative results on time-delay frac- tional dierential optimal control problem...
This paper presents an approximate method for solving a kind of fractional delay differential equati...
Fractional calculus, as a generalization of ordinary calculus, has been an interesting topic since t...
The theory of fractional calculus goes back to he beginning of the theory of differential calculus b...
The aim of this research was to relate two physical effects forpartial differential equations on the...
This paper examines the approximation of fractional delays by FIR systems using various techniques w...
We survey some representative results on time-delay frac- tional dierential optimal control problem...
This paper addresses the calculation of fractional derivatives of fractional order for non-smooth da...
In this paper a new method for the calculation of the fractional expressions in the presence of sens...
This paper addresses the calculation of derivatives of fractional order for non-smooth data. The noi...
This paper aims to demonstrate the superiority of the discrete Chebyshev polynomials over the classi...
This paper explores the calculation of fractional integrals by means of the time delay operator. The...
This study addresses the optimization of rational fraction approximations for the discrete-time calc...
In this work, we study variational problems with time delay and higher-order distributed-order fract...
This paper is concerned with deriving an operational matrix of fractional-order derivative of Fibona...
We survey some representative results on time-delay frac- tional dierential optimal control problem...
This paper presents an approximate method for solving a kind of fractional delay differential equati...
Fractional calculus, as a generalization of ordinary calculus, has been an interesting topic since t...
The theory of fractional calculus goes back to he beginning of the theory of differential calculus b...
The aim of this research was to relate two physical effects forpartial differential equations on the...
This paper examines the approximation of fractional delays by FIR systems using various techniques w...
We survey some representative results on time-delay frac- tional dierential optimal control problem...
This paper addresses the calculation of fractional derivatives of fractional order for non-smooth da...
In this paper a new method for the calculation of the fractional expressions in the presence of sens...
This paper addresses the calculation of derivatives of fractional order for non-smooth data. The noi...
This paper aims to demonstrate the superiority of the discrete Chebyshev polynomials over the classi...