[PDF] Top 20 A Numerical Method For Solving Physiology Problems By Shifted Chebyshev Operational Matrix

A Numerical Method For Solving Physiology Problems By Shifted Chebyshev Operational Matrix

... T h plications in fluid mechanics, biology, physics e differential equations arise from various ap- and engineering [1]-[16]. Such equations also ap- pear in electromagnetic and electrodynamic, elas- ticity and dynamic ... See full document

8

A spectral collocation method based on integrated Chebyshev polynomials for two-dimensional biharmonic boundary-value problems

... collocation method based on integrated Chebyshev polynomials for numerically solving biharmonic boundary-value ...proposed method employs exactly the same spectral tensor product grid and ... See full document

36

$Wavelets operational methods for fractional differential equations and systems of fractional differential equations$

Wavelets operational methods for fractional differential equations and systems of fractional differential equations

... introduced shifted Legendre operational matrix for fractional derivatives and applied it with spectral methods for numerical solution of multi-term linear and nonlinear ...of shifted ... See full document

63

$The operational matrix of fractional derivative of the fractional-order Chebyshev functions and its applications$

The operational matrix of fractional derivative of the fractional-order Chebyshev functions and its applications

... construct operational matrix of fractional derivative for some types of classical orthogonal ...to numerical solution of some linear fractional diﬀerential ...introduced shifted Legendre ... See full document

21

$A wavelet operational matrix method for solving initial - boundary value problems for fractional partial differential equations$

A wavelet operational matrix method for solving initial - boundary value problems for fractional partial differential equations

... the numerical solutions of Initial - Boundary value problems for FPDEs have been approximated using Haar wavelet operational matrix ...proposed method are illustrated by providing ... See full document

13

A novel approximation method for the solution of Convection Diffusion Equation using Bernstein polynomials

... the Chebyshev wavelet spectral method for solving the variational ...the Chebyshev wavelet methods for solving Abel’s integral ...the Chebyshev wavelet method for ... See full document

6

$An efficient numerical scheme based on the shifted orthonormal Jacobi polynomials for solving fractional optimal control problems$

An efficient numerical scheme based on the shifted orthonormal Jacobi polynomials for solving fractional optimal control problems

... the shifted orthonormal polynomials. In Section , we derive the operational matrix of fractional integrals based on the shifted Jacobi orthonormal ...the operational matrix of ... See full document

17

Numerical solution of Hammerstein integral equation using Chebyshev wavelet method

... the numerical solution of integral and differential equations such as Chebyshev [24], Legendre [2, 10], Daubechies [20], Alpert [12], Modifed Homotopy Perturbation [7] and Haar [17] ...of Chebyshev ... See full document

20

$A fractional type of the Chebyshev polynomials for approximation of solution of linear fractional differential equations$

A fractional type of the Chebyshev polynomials for approximation of solution of linear fractional differential equations

... use shifted Chebyshev polynomials of second kind and recall some important ...the operational matrix of fractional derivative. This matrix is introduced and applied with the Galerkin ... See full document

12

$Collocation method based on Genocchi operational matrix for solving generalized fractional pantograph equations$

Collocation method based on Genocchi operational matrix for solving generalized fractional pantograph equations

... for solving generalized pantograph equations with linear functional ...spectral-collocation method for fractional pantograph delay integrodifferential equations and in [9] Y¨uzbasi and Sezer presented an ... See full document

11

$A Chebyshev spectral method based on operational matrix for fractional differential equations involving non singular Mittag Leffler kernel$

A Chebyshev spectral method based on operational matrix for fractional differential equations involving non singular Mittag Leffler kernel

... eﬃcient numerical method to solve the system (1) using the operational matrix based on Chebyshev ...the operational matrix approximation for fractional integral ...an ... See full document

23

On the Analysis and Numerical Formulation of Miscible Fluid Flow in Porous Media Using Chebyshev Wavelets Collocation Method

... the Chebyshev wavelet method together with the operational matrix of integration as a numerical scheme for approximating the pressure distribution of the single phase flow of fluid in a ... See full document

12

A New Operational Matrix Method for Solving Nonlinear Caputo Fractional Derivative Integro-Differential Static Beam Problems via Chebyshev Polynomials

... new operational method based on Chebyshev polynomials for Caputo fractional derivative is applied to solve boundary value problems of the non-local Caputo fractional integro-differential ... See full document

6

$Numerical solution of nonlinear fractional integro-differential equation by Collocation method$

Numerical solution of nonlinear fractional integro-differential equation by Collocation method

... Trapezoidal method, Legendre spline interpolation method, Adomain decomposition method, Taylor series method, Pi- card’s iterative method, Variational principle method, Iterative ... See full document

7

Bernstein ‎M‎ulti-Scaling Operational Matrix Method for Nonlinear Matrix Differential Models of Second-‎Order‎

... tional matrix have been utilized to numerically solve a class of the second order matrix differential ...proposed method converts the main problem to a linear matrix ...equations. ... See full document

5

V-Matrix Method of Solving Statistical Inference Problems

... An important application of data adaptation method is the case of binary classification problem with unbalanced training data (du Plessis and Sugiyama, 2012). In this case, the numbers of training examples for ... See full document

48

A Bootstrap Method for Error Estimation in Randomized Matrix Multiplication

... canonical matrix problems, the relationship between cost and accuracy has been the focus of a growing body of theoretical work, and the literature provides many performance guarantees for RNLA ... See full document

40

An efficient iterative scheme using family of chebyshev's operations

... proposed method is also confirmed by FCW, while it requires the less number of iterations compared with Newton’s ...proposed method is not discovered well through this application, where the similar number ... See full document

11

Laguerre wavelet and its programming

... [15-17], numerical analysis and many other fields in recent ...the problems [18, 19], such as Haar wavelets method [8], SAC wavelets method, Harmonic wavelets method, first and second ... See full document

9

On the Approximate Solution of Fractional Logistic Differential Equation Using Operational Matrices of Bernstein Polynomials

... The numerical results of the proposed problem (1) are given in Figure 1 and Figure 2 with different values of α in the interval [ ] 0,1 with ρ = ...proposed method at α = ... See full document

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