Fractional-order two-input two-output process identification based on Haar operational matrix

AbstractIn this paper, a numerical technique for a general form of nonlinear fractional-order differential equations with a linear functional argument using Chebyshev series is presented. The proposed equation with its linear functional argument represents a general form of delay and advanced nonlinear fractional-order differential equations. The spectral collocation method is extended to study this problem as a discretization scheme, where the fractional derivatives are defined in the Caputo sense. The collocation method transforms the given equation and conditions to algebraic nonlinear systems of equations with unknown Chebyshev coefficients. Additionally, we present a general form of the operational matrix for derivatives. A general form of the operational matrix to derivatives includes the fractional-order derivatives and the operational matrix of an ordinary derivative as a special case. To the best of our knowledge, there is no other work discussed this point. Numerical examples are given, and the obtained results show that the proposed method is very effective and convenient.

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Solving a System of Fractional-Order Volterra-Fredholm Integro-Differential Equations with Weakly Singular Kernels via the Second Chebyshev Wavelets Method

Fractal and Fractional ◽

10.3390/fractalfract5030070 ◽

2021 ◽

Vol 5 (3) ◽

pp. 70

Author(s):

Esmail Bargamadi ◽

Leila Torkzadeh ◽

Kazem Nouri ◽

Amin Jajarmi

Keyword(s):

Differential Equations ◽

Fractional Order ◽

Algebraic System ◽

Operational Matrix ◽

Approximate Solutions ◽

Chebyshev Wavelets ◽

Weakly Singular Kernels ◽

Weakly Singular ◽

Singular Kernels ◽

Chebyshev Wavelet

In this paper, by means of the second Chebyshev wavelet and its operational matrix, we solve a system of fractional-order Volterra–Fredholm integro-differential equations with weakly singular kernels. We estimate the functions by using the wavelet basis and then obtain the approximate solutions from the algebraic system corresponding to the main system. Moreover, the implementation of our scheme is presented, and the error bounds of approximations are analyzed. Finally, we evaluate the efficiency of the method through a numerical example.

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A new operational matrix of fractional order integration for the Chebyshev wavelets and its application for nonlinear fractional Van der Pol oscillator equation

Proceedings - Mathematical Sciences ◽

10.1007/s12044-018-0393-4 ◽

2018 ◽

Vol 128 (2) ◽

Cited By ~ 8

Author(s):

M H Heydari ◽

M R Hooshmandasl ◽

C Cattani

Keyword(s):

Fractional Order ◽

Operational Matrix ◽

Van Der Pol Oscillator ◽

Van Der Pol ◽

Chebyshev Wavelets

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An Integral Operational Matrix of Fractional-Order Chelyshkov Functions and Its Applications

Symmetry ◽

10.3390/sym12111755 ◽

2020 ◽

Vol 12 (11) ◽

pp. 1755

Author(s):

M. S. Al-Sharif ◽

A. I. Ahmed ◽

M. S. Salim

Keyword(s):

Differential Equations ◽

Fractional Order ◽

Fractional Differential Equations ◽

Fractional Integral ◽

Operational Matrix ◽

Operational Matrices ◽

Algebraic Equations ◽

Science And Engineering ◽

Numerical Examples ◽

Fractional Differential

Fractional differential equations have been applied to model physical and engineering processes in many fields of science and engineering. This paper adopts the fractional-order Chelyshkov functions (FCHFs) for solving the fractional differential equations. The operational matrices of fractional integral and product for FCHFs are derived. These matrices, together with the spectral collocation method, are used to reduce the fractional differential equation into a system of algebraic equations. The error estimation of the presented method is also studied. Furthermore, numerical examples and comparison with existing results are given to demonstrate the accuracy and applicability of the presented method.

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A Comparative Study of Integer and Noninteger Order Wavelets for Fractional Nonlinear Fredholm Integro-Differential Equations

Journal of Computational and Nonlinear Dynamics ◽

10.1115/1.4040343 ◽

2018 ◽

Vol 13 (8) ◽

Author(s):

F. Mohammadi ◽

J. A. Tenreiro Machado

Keyword(s):

Differential Equations ◽

Comparative Study ◽

Fractional Derivative ◽

Fractional Order ◽

Efficient Algorithm ◽

Operational Matrix ◽

Tau Method ◽

Legendre Wavelets ◽

Numerical Examples ◽

Integer Order

This paper compares the performance of Legendre wavelets (LWs) with integer and noninteger orders for solving fractional nonlinear Fredholm integro-differential equations (FNFIDEs). The generalized fractional-order Legendre wavelets (FLWs) are formulated and the operational matrix of fractional derivative in the Caputo sense is obtained. Based on the FLWs, the operational matrix and the Tau method an efficient algorithm is developed for FNFIDEs. The FLWs basis leads to more efficient and accurate solutions of the FNFIDE than the integer-order Legendre wavelets. Numerical examples confirm the superior accuracy of the proposed method.

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An efficient approximate method for solving two-dimensional fractional optimal control problems using generalized fractional order of Bernstein functions

IMA Journal of Mathematical Control and Information ◽

10.1093/imamci/dnaa037 ◽

2020 ◽

Author(s):

Ali Ketabdari ◽

Mohammad Hadi Farahi ◽

Sohrab Effati

Keyword(s):

Optimal Control ◽

Fractional Order ◽

Operational Matrix ◽

Two Dimensional ◽

Algebraic Equations ◽

Control Variables ◽

Fractional Optimal Control ◽

Bernstein Functions ◽

Fractional Optimal Control Problems ◽

And Control

Abstract We define a new operational matrix of fractional derivative in the Caputo type and apply a spectral method to solve a two-dimensional fractional optimal control problem (2D-FOCP). To acquire this aim, first we expand the state and control variables based on the fractional order of Bernstein functions. Then we reduce the constraints of 2D-FOCP to a system of algebraic equations through the operational matrix. Now, one can solve straightforward the problem and drive the approximate solution of state and control variables. The convergence of the method in approximating the 2D-FOCP is proved. We demonstrate the efficiency and superiority of the method by comparing the results obtained by the presented method with the results of previous methods in some examples.

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Solving fractional-order delay integro-differential equations using operational matrix based on fractional-order Euler polynomials

Mathematical Sciences ◽

10.1007/s40096-020-00320-1 ◽

2020 ◽

Vol 14 (2) ◽

pp. 97-107

Author(s):

S. Rezabeyk ◽

S. Abbasbandy ◽

E. Shivanian

Keyword(s):

Differential Equations ◽

Fractional Order ◽

Operational Matrix ◽

Euler Polynomials

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Numerical Solutions of Fractional Integrodifferential Equations of Bratu Type by Using CAS Wavelets

Journal of Applied Mathematics ◽

10.1155/2013/801395 ◽

2013 ◽

Vol 2013 ◽

pp. 1-7 ◽

Cited By ~ 2

Author(s):

Mingxu Yi ◽

Kangwen Sun ◽

Jun Huang ◽

Lifeng Wang

Keyword(s):

Numerical Method ◽

Error Estimation ◽

Fractional Order ◽

Numerical Solutions ◽

Operational Matrix ◽

Integrodifferential Equations ◽

Algebraic Equations ◽

Approximation Solution ◽

Cas Wavelets

A numerical method based on the CAS wavelets is presented for the fractional integrodifferential equations of Bratu type. The CAS wavelets operational matrix of fractional order integration is derived. A truncated CAS wavelets series together with this operational matrix is utilized to reduce the fractional integrodifferential equations to a system of algebraic equations. The solution of this system gives the approximation solution for the truncated limited2k(2M+1). The convergence and error estimation of CAS wavelets are also given. Two examples are included to demonstrate the validity and applicability of the approach.

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Solving nonlinear Volterra integro differential equations of fractional order by generalized triangular operational matrix

Third International Conference on Advances in Applied Science and Environmental Engineering - ASEE 2015 ◽

10.15224/978-1-63248-055-2-05 ◽

2015 ◽

Author(s):

MAHNAZ ASGARI

Keyword(s):

Differential Equations ◽

Fractional Order ◽

Operational Matrix

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Systems of nonlinear Volterra integro-differential equations of arbitrary order

Boletim da Sociedade Paranaense de Matemática ◽

10.5269/bspm.v36i4.31478 ◽

2018 ◽

Vol 36 (4) ◽

pp. 33-54 ◽

Cited By ~ 6

Author(s):

Kourosh Parand ◽

Mehdi Delkhosh

Keyword(s):

Differential Equations ◽

Fractional Derivative ◽

Approximate Method ◽

Fractional Order ◽

Chebyshev Polynomials ◽

Arbitrary Order ◽

Operational Matrix ◽

Algebraic Equations ◽

Arbitrary Integer ◽

Orthogonal Functions

In this paper, a new approximate method for solving of systems of nonlinear Volterra integro-differential equations of arbitrary (integer and fractional) order is introduced. For this purpose, the generalized fractional order of the Chebyshev orthogonal functions (GFCFs) based on the classical Chebyshev polynomials of the first kind has been introduced that can be used to obtain the solution of the integro-differential equations (IDEs). Also, we construct the fractional derivative operational matrix of order $\alpha$ in the Caputo's definition for GFCFs. This method reduced a system of IDEs by collocation method into a system of algebraic equations. Some examples to illustrate the simplicity and the effectiveness of the propose method have been presented.

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