Two iterative algorithms for solving systems of linear and nonlinear equations are proposed. For linear problems the algorithm is based on a control theoretic approach and it is guaranteed to yield a converging sequence for any initial condition provided a solution exists. Systems of nonlinear equations are then considered and a generalised algorithm, again taking inspiration from control theory, is proposed. Local convergence is guaranteed in the nonlinear setting. Both the linear and the nonlinear algorithms are demonstrated on a series of numerical examples
International audienceNonlinear control algorithms of two types are presented for uncertain linear p...
A class of algorithms, which are linear feedback control equations in structure, are derived for the...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
In a variety of contexts, for example the solution of differential games and the control of power sy...
In this paper we survey numerical methods for solving nonlinear systems of equations F (x) = 0, whe...
International audienceMany iterative processes can be interpreted as discrete dynamical systems and,...
AbstractA new iterative method is proposed for the solution of nonlinear systems. The method does no...
In this paper, the fixed point iteration and Newton's methods for iteratively solving nonlinear...
In this paper, a simple family of one-point iterative schemes for approximating the solutions of non...
In a variety of contexts, for example the solution of differential games and the control of power sy...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
Physical systems are usually modeled by differential equations, but solving these differential equat...
This dissertation considers how to stabilize a nonlinear system by using feedback control. To stabil...
summary:Nonlinear iterative methods are investigated and a generalization of a direct method for lin...
AbstractIterative methods for the solution of nonlinear systems of equations such as Newton's method...
International audienceNonlinear control algorithms of two types are presented for uncertain linear p...
A class of algorithms, which are linear feedback control equations in structure, are derived for the...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
In a variety of contexts, for example the solution of differential games and the control of power sy...
In this paper we survey numerical methods for solving nonlinear systems of equations F (x) = 0, whe...
International audienceMany iterative processes can be interpreted as discrete dynamical systems and,...
AbstractA new iterative method is proposed for the solution of nonlinear systems. The method does no...
In this paper, the fixed point iteration and Newton's methods for iteratively solving nonlinear...
In this paper, a simple family of one-point iterative schemes for approximating the solutions of non...
In a variety of contexts, for example the solution of differential games and the control of power sy...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
Physical systems are usually modeled by differential equations, but solving these differential equat...
This dissertation considers how to stabilize a nonlinear system by using feedback control. To stabil...
summary:Nonlinear iterative methods are investigated and a generalization of a direct method for lin...
AbstractIterative methods for the solution of nonlinear systems of equations such as Newton's method...
International audienceNonlinear control algorithms of two types are presented for uncertain linear p...
A class of algorithms, which are linear feedback control equations in structure, are derived for the...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...