A Novel Method for Solution of Fractional Order Two-Dimensional Nonlocal Heat Conduction Phenomena

Mathematical Problems in Engineering ◽

10.1155/2021/1067582 ◽

2021 ◽

Vol 2021 ◽

pp. 1-17

Author(s):

Hammad Khalil ◽

Ishak Hashim ◽

Waqar Ahmad Khan ◽

Abuzar Ghaffari

Keyword(s):

Heat Conduction ◽

Fractional Order ◽

Operational Matrix ◽

Nonlocal Boundary ◽

Nonlocal Boundary Conditions ◽

Test Problems ◽

Operational Matrices ◽

Two Dimensional ◽

Algebraic Equations ◽

Operational Matrix Method

In this paper, we have extended the operational matrix method for approximating the solution of the fractional-order two-dimensional elliptic partial differential equations (FPDEs) under nonlocal boundary conditions. We use a general Legendre polynomials basis and construct some new operational matrices of fractional order operations. These matrices are used to convert a sample nonlocal heat conduction phenomenon of fractional order to a structure of easily solvable algebraic equations. The solution of the algebraic structure is then used to approximate a solution of the heat conduction phenomena. The proposed method is applied to some test problems. The obtained results are compared with the available data in the literature and are found in good agreement.Dedicated to my father Mr. Sher Mumtaz, (1955-2021), who gave me the basic knowledege of mathematics.

Toward the Approximate Solution for Fractional Order Nonlinear Mixed Derivative and Nonlocal Boundary Value Problems

Discrete Dynamics in Nature and Society ◽

10.1155/2016/5601821 ◽

2016 ◽

Vol 2016 ◽

pp. 1-12 ◽

Cited By ~ 6

Author(s):

Hammad Khalil ◽

Mohammed Al-Smadi ◽

Khaled Moaddy ◽

Rahmat Ali Khan ◽

Ishak Hashim

Keyword(s):

Approximate Solution ◽

Boundary Conditions ◽

Operational Matrix ◽

Nonlocal Boundary ◽

Coupled System ◽

Nonlocal Boundary Conditions ◽

Mixed Derivative ◽

Test Problems ◽

Operational Matrices ◽

Nonlinear Coupled System

The paper is devoted to the study of operational matrix method for approximating solution for nonlinear coupled system fractional differential equations. The main aim of this paper is to approximate solution for the problem under two different types of boundary conditions,m^-point nonlocal boundary conditions and mixed derivative boundary conditions. We develop some new operational matrices. These matrices are used along with some previously derived results to convert the problem under consideration into a system of easily solvable matrix equations. The convergence of the developed scheme is studied analytically and is conformed by solving some test problems.

Haar wavelet operational matrix method for system of fractional nonlinear differential equations

International Journal of Wavelets Multiresolution and Information Processing ◽

10.1142/s0219691317500436 ◽

2017 ◽

Vol 15 (05) ◽

pp. 1750043 ◽

Cited By ~ 3

Author(s):

Umer Saeed

Keyword(s):

Differential Equations ◽

Reliable Method ◽

Nonlinear Differential Equations ◽

Operational Matrix ◽

Implementation Process ◽

Haar Wavelet ◽

Operational Matrices ◽

Algebraic Equations ◽

Operational Matrix Method ◽

Fractional Differential

In this paper, we present a reliable method for solving system of fractional nonlinear differential equations. The proposed technique utilizes the Haar wavelets in conjunction with a quasilinearization technique. The operational matrices are derived and used to reduce each equation in a system of fractional differential equations to a system of algebraic equations. Convergence analysis and implementation process for the proposed technique are presented. Numerical examples are provided to illustrate the applicability and accuracy of the technique.

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.

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.

Fractional Order Operational Matrix Method for Solving Two-Dimensional Nonlinear Fractional Volterra Integro-Differential Equations

Kragujevac Journal of Mathematics ◽

10.46793/kgjmat2104.571k ◽

2021 ◽

Vol 45 (4) ◽

pp. 571-585

Author(s):

AMIRAHMAD KHAJEHNASIRI ◽

◽

M. AFSHAR KERMANI ◽

REZZA EZZATI ◽

◽

...

Keyword(s):

Integral Equation ◽

Differential Equations ◽

Fractional Order ◽

Volterra Integral Equation ◽

Matrix Method ◽

Operational Matrix ◽

Basis Functions ◽

Two Dimensional ◽

Numerical Examples ◽

Operational Matrix Method

This article presents a numerical method for solving nonlinear two-dimensional fractional Volterra integral equation. We derive the Hat basis functions operational matrix of the fractional order integration and use it to solve the two-dimensional fractional Volterra integro-diﬀerential equations. The method is described and illustrated with numerical examples. Also, we give the error analysis.

Sine–cosine wavelets operational matrix method for fractional nonlinear differential equation

International Journal of Wavelets Multiresolution and Information Processing ◽

10.1142/s0219691319500267 ◽

2019 ◽

Vol 17 (04) ◽

pp. 1950026 ◽

Cited By ~ 1

Author(s):

Umer Saeed

Keyword(s):

Differential Equations ◽

Nonlinear Differential Equations ◽

Operational Matrix ◽

Type Equation ◽

Operational Matrices ◽

Algebraic Equations ◽

Operational Matrix Method ◽

Fractional Differential ◽

Quasilinearization Technique ◽

Distribution Equation

In this paper, we present a solution method for fractional nonlinear ordinary differential equations. We propose a method by utilizing the sine–cosine wavelets (SCWs) in conjunction with quasilinearization technique. The fractional nonlinear differential equations are transformed into a system of discrete fractional differential equations by quasilinearization technique. The operational matrices of fractional order integration for SCW are derived and utilized to transform the obtained discrete system into systems of algebraic equations and the solutions of algebraic systems lead to the solution of fractional nonlinear differential equations. Convergence analysis and procedure of implementation for the proposed method are also considered. To illustrate the reliability and accuracy of the method, we tested the method on fractional nonlinear Lane–Emden type equation and temperature distribution equation.

Direct numerical method for isoperimetric fractional variational problems based on operational matrix

Journal of Vibration and Control ◽

10.1177/1077546317700344 ◽

2017 ◽

Vol 24 (14) ◽

pp. 3063-3076 ◽

Cited By ~ 8

Author(s):

Samer S Ezz–Eldien ◽

Ali H Bhrawy ◽

Ahmed A El–Kalaawy

Keyword(s):

Direct Method ◽

Fractional Integration ◽

Operational Matrix ◽

Variational Problems ◽

Test Problems ◽

Operational Matrices ◽

Algebraic Equations ◽

Direct Numerical Method ◽

Fractional Variational Problems ◽

A Direct Method

In this paper, we applied a direct method for a solution of isoperimetric fractional variational problems. We use shifted Legendre orthonormal polynomials as basis function of operational matrices of fractional differentiation and fractional integration in combination with the Lagrange multipliers technique for converting such isoperimetric fractional variational problems into solving a system of algebraic equations. Also, we show the convergence analysis of the presented technique and introduce some test problems with comparisons between our numerical results with those introduced using different methods.

Numerical Solution of the Fractional Partial Differential Equations by the Two-Dimensional Fractional-Order Legendre Functions

Abstract and Applied Analysis ◽

10.1155/2013/562140 ◽

2013 ◽

Vol 2013 ◽

pp. 1-13 ◽

Cited By ~ 10

Author(s):

Fukang Yin ◽

Junqiang Song ◽

Yongwen Wu ◽

Lilun Zhang

Keyword(s):

Partial Differential Equations ◽

Differential Equations ◽

Fractional Order ◽

Approximate Solutions ◽

Operational Matrices ◽

Legendre Functions ◽

Two Dimensional ◽

Algebraic Equations ◽

Fractional Partial Differential Equations ◽

Partial Differential

A numerical method is presented to obtain the approximate solutions of the fractional partial differential equations (FPDEs). The basic idea of this method is to achieve the approximate solutions in a generalized expansion form of two-dimensional fractional-order Legendre functions (2D-FLFs). The operational matrices of integration and derivative for 2D-FLFs are first derived. Then, by these matrices, a system of algebraic equations is obtained from FPDEs. Hence, by solving this system, the unknown 2D-FLFs coefficients can be computed. Three examples are discussed to demonstrate the validity and applicability of the proposed method.

A New Operational Matrix of Fractional Derivatives to Solve Systems of Fractional Differential Equations via Legendre Wavelets

Mathematics ◽

10.3390/math6110238 ◽

2018 ◽

Vol 6 (11) ◽

pp. 238 ◽

Cited By ~ 4

Author(s):

Aydin Secer ◽

Selvi Altun

Keyword(s):

Differential Equations ◽

Fractional Differential Equations ◽

Matrix Method ◽

Fractional Derivatives ◽

Operational Matrix ◽

Operational Matrices ◽

Algebraic Equations ◽

Legendre Wavelets ◽

Operational Matrix Method ◽

Fractional Differential

This paper introduces a new numerical approach to solving a system of fractional differential equations (FDEs) using the Legendre wavelet operational matrix method (LWOMM). We first formulated the operational matrix of fractional derivatives in some special conditions using some notable characteristics of Legendre wavelets and shifted Legendre polynomials. Then, the system of fractional differential equations was transformed into a system of algebraic equations by using these operational matrices. At the end of this paper, several examples are presented to illustrate the effectivity and correctness of the proposed approach. Comparing the methodology with several recognized methods demonstrates that the advantages of the Legendre wavelet operational matrix method are its accuracy and the understandability of the calculations.

Legendre wavelet operational matrix method for solving fractional differential equations in some special conditions

Thermal Science ◽

10.2298/tsci180920034s ◽

2019 ◽

Vol 23 (Suppl. 1) ◽

pp. 203-214

Author(s):

Aydin Secer ◽

Selvi Altun ◽

Mustafa Bayram

Keyword(s):

Differential Equations ◽

Fractional Differential Equations ◽

Operational Matrix ◽

Operational Matrices ◽

Mathematical Tool ◽

Algebraic Equations ◽

Legendre Wavelets ◽

Operational Matrix Method ◽

Fractional Differential ◽

A New Technique

This paper proposes a new technique which rests upon Legendre wavelets for solving linear and non-linear forms of fractional order initial and boundary value problems. In some particular circumstances, a new operational matrix of fractional derivative is generated by utilizing some significant properties of wavelets and orthogonal polynomials. We approached the solution in a finite series with respect to Legendre wavelets and then by using these operational matrices, we reduced the fractional differential equations into a system of algebraic equations. Finally, the introduced technique is tested on several illustrative examples. The obtained results demonstrate that this technique is a very impressive and applicable mathematical tool for solving fractional differential equations.