AbstractThe perturbed iterative scheme developed in [3] is extended in this work to solve coupled systems of nonlinear equations. The algorithm consists of computing distinct perturbation parameters for each system at each iteration and adding these to corresponding nonlinear Gauss-Seidel iterates. It has been found computationally that such an algorithm significantly improves the convergence properties of Gauss-Seidel iterations. The method has been successfully applied to several coupled nonlinear systems of equations some of which are discussed in this work
We introduce a new family of iterative methods for solving mathematical models whose governing equat...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
In this paper we outline a general methodology for the solution of the system of algebraic equations...
AbstractThe perturbed iterative scheme developed in [3] is extended in this work to solve coupled sy...
AbstractIn this work a technique has been developed to solve a set of nonlinear equations with the a...
A numerical algorithm dealing with solutions of equations with one variable may not be extended to s...
In this paper we introduce a process we have called "Gauss- Seidelization" for solving nonlinear equ...
ABSTRACT. In the references [i, 2, 3] a perturbed iterative scheme PIS) has been studied both theore...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
In the references [1, 2, 3] a perturbed iterative scheme (PIS) has been studied both theoretically a...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
The convergence of classical iterative procedures, when applied to a system of nonlinear algebraic o...
We look at the computational procedure of computing the response of a coupled fluid-structure intera...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
Outlines a general methodology for the solution of the system of algebraic equations arising from th...
We introduce a new family of iterative methods for solving mathematical models whose governing equat...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
In this paper we outline a general methodology for the solution of the system of algebraic equations...
AbstractThe perturbed iterative scheme developed in [3] is extended in this work to solve coupled sy...
AbstractIn this work a technique has been developed to solve a set of nonlinear equations with the a...
A numerical algorithm dealing with solutions of equations with one variable may not be extended to s...
In this paper we introduce a process we have called "Gauss- Seidelization" for solving nonlinear equ...
ABSTRACT. In the references [i, 2, 3] a perturbed iterative scheme PIS) has been studied both theore...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
In the references [1, 2, 3] a perturbed iterative scheme (PIS) has been studied both theoretically a...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
The convergence of classical iterative procedures, when applied to a system of nonlinear algebraic o...
We look at the computational procedure of computing the response of a coupled fluid-structure intera...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
Outlines a general methodology for the solution of the system of algebraic equations arising from th...
We introduce a new family of iterative methods for solving mathematical models whose governing equat...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
In this paper we outline a general methodology for the solution of the system of algebraic equations...