An explicit iterative algorithm to solve both linear and nonlinear problems of ordinary differential equations with initial conditions is formulated with main focus given on its comparison with some non-standard finite difference schemes. Two first order linear initial value problems (IVPs) with periodic behavior are used to analyze the performance of the proposed algorithm with respect to maximum absolute error and computational effort where proposed algorithm performs better in both cases. The proposed algorithm efficiently follows the oscillatory behavior of models like Lotka-Volterra predator-prey and mass-spring system (damped case) in comparison to the nonstandard schemes. All necessary computations have been carried out through MATLA...
In this paper, we present a reformulation of Mickens' rules for nonstandard finite difference (NSFD)...
Explicit discretization schemes based on NonStandard Finite Differences (NSFD) represent a modicatio...
New preconditioning techniques for the iterative solution of systems of equations arising from discr...
An explicit iterative algorithm to solve both linear and nonlinear problems of ordinary differential...
AbstractSeveral algorithms have been proposed for the stable numerical computation of non-dominant s...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
Thesis (Master)--Izmir Institute of Technology, Mathematics, Izmir, 2005Includes bibliographical ref...
In this paper, the Saul’yev finite difference scheme for a fully nonlinear partial differential equa...
Abstract The paper deals with the oscillation of the first-order linear difference equation with dev...
This paper gives an introduction to nonstandard finite difference methods useful for the constructio...
AbstractIn a recent paper, Chen and Solis investigated the appearance of spurious solutions when fir...
In recent years it has been shown that some unconventional or nonstandard finite difference schemes ...
In this paper, we introduce two nonstandard finite difference (NSFD) methods for solving the mathema...
The goal of this work is to highlight the advantages of using NonStandard Finite Difference (NSFD) n...
In this paper, we present a reformulation of Mickens' rules for nonstandard finite difference (NSFD)...
Explicit discretization schemes based on NonStandard Finite Differences (NSFD) represent a modicatio...
New preconditioning techniques for the iterative solution of systems of equations arising from discr...
An explicit iterative algorithm to solve both linear and nonlinear problems of ordinary differential...
AbstractSeveral algorithms have been proposed for the stable numerical computation of non-dominant s...
The oldest and most useful technique to approximate the solution of differential equations is the fi...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
Thesis (Master)--Izmir Institute of Technology, Mathematics, Izmir, 2005Includes bibliographical ref...
In this paper, the Saul’yev finite difference scheme for a fully nonlinear partial differential equa...
Abstract The paper deals with the oscillation of the first-order linear difference equation with dev...
This paper gives an introduction to nonstandard finite difference methods useful for the constructio...
AbstractIn a recent paper, Chen and Solis investigated the appearance of spurious solutions when fir...
In recent years it has been shown that some unconventional or nonstandard finite difference schemes ...
In this paper, we introduce two nonstandard finite difference (NSFD) methods for solving the mathema...
The goal of this work is to highlight the advantages of using NonStandard Finite Difference (NSFD) n...
In this paper, we present a reformulation of Mickens' rules for nonstandard finite difference (NSFD)...
Explicit discretization schemes based on NonStandard Finite Differences (NSFD) represent a modicatio...
New preconditioning techniques for the iterative solution of systems of equations arising from discr...