Yazar "Gulsu, M" için listeleme
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Approximate solution of general high-order linear nonhomogeneous difference equations by means of Taylor collocation method
In this paper, a Taylor collocation method is developed to find an approximate solution of general high-order linear nonhomogenous difference equations with variable coefficients under the mixed conditions. The solution ... -
The approximate solution of high-order linear difference equations with variable coefficients in terms of Taylor polynomials
This paper presents a numerical method for the approximate solution of mth-order linear difference equations with variable coefficients under the mixed conditions in terms of Taylor polynomials about any point. In addition, ... -
A finite difference approach for solution of Burgers' equation
Gulsu, M (Elsevier Science Inc, 2006)In this paper, we have applied restrictive Pade approximation classical implicit finite difference method to the Burgers' equation with a set of initial and boundary conditions to obtain its numerical solution. The stability ... -
A method for the approximate solution of the high-order linear difference equations in terms of Taylor polynomials
The purpose of this study is to give a Taylor polynomial approximation for the solution of mth-order linear difference equations with variable coefficients under the mixed conditions about any point. For this purpose, the ... -
A new polynomial approach for solving difference and Fredholm integro-difference equations with mixed argument
The purpose of this study is to give a Taylor polynomial approximation for the solution of high-order linear Fredholm difference equations with variable coefficients and mixed argument under the mixed conditions about any ... -
Numerical solution of Burgers' equation with restrictive Taylor approximation
In this paper, we have applied restrictive Taylor approximation classical explicit finite difference method to the Burgers' equation with a set of initial and boundary conditions to obtain its numerical solution. The ... -
On the solution of the Riccati equation by the Taylor matrix method
In this paper, we suggest a matrix method to solve the Riccati differential equation in terms of Taylor polynomials. This method is based on first taking the truncated Taylor series of the function in equations and then ... -
Taylor polynomial solutions of systems of linear differential equations with variable coefficients
Sezer, M; Karamete, A; Gulsu, M (Taylor & Francis Ltd, 2005)A Taylor collocation method has been presented for numerically solving systems of high-order linear ordinary, differential equations with variable coefficients. Using the Taylor collocation points, this method transforms ...