Many applications in science and engineering lead to models which require solving large-scale fixed point problems, or equivalently, systems of nonlinear equations. Several successful techniques for handling such problems are based on quasi-Newton methods that implicitly update the approximate Jacobian or inverse Jacobian to satisfy a certain secant con-dition. We present two classes of multisecant methods which allows to take into account a variable number of secant equations at each iteration. The first is the Broyden-like class, of which Broyden’s family is a subclass, and Anderson mixing is a particular member. The second class is that of the nonlinear Eirola-Nevanlinna-type methods. This work was motivated by a problem in electronic st...
This dissertation centers on two major aspects dictating the computational time of applications base...
AbstractAn algorithm for solving systems of nonlinear algebraic equations is described. The Jacobian...
The solution of problems involving the interaction of different systems is a domain of ongoing resea...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
We introduce a new algorithm for solving nonlinear simultaneous equations, which is a combination of...
This article investigates two aspects of the generalized Broyden quasi-Newton method that have a maj...
We propose an extension of secant methods for nonlinear equations using a population of previous ite...
A family of SOP-secant methods for solving large-scale nonlinear systems of equations is introduced....
summary:We propose a new Broyden method for solving systems of nonlinear equations, which uses the f...
In this thesis, we present four algorithms for solving sparse nonlinear systems of equations: the pa...
Classical iteration methods for linear systems, such as Jacobi iteration, can be accelerated consid...
Abstract. This paper concerns an acceleration method for fixed-point iterations that originated in w...
International audienceFixed point iterations are still the most common approach to dealing with a v...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
This paper examines a number of extrapolation and acceleration methods and introduces a few modifica...
This dissertation centers on two major aspects dictating the computational time of applications base...
AbstractAn algorithm for solving systems of nonlinear algebraic equations is described. The Jacobian...
The solution of problems involving the interaction of different systems is a domain of ongoing resea...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
We introduce a new algorithm for solving nonlinear simultaneous equations, which is a combination of...
This article investigates two aspects of the generalized Broyden quasi-Newton method that have a maj...
We propose an extension of secant methods for nonlinear equations using a population of previous ite...
A family of SOP-secant methods for solving large-scale nonlinear systems of equations is introduced....
summary:We propose a new Broyden method for solving systems of nonlinear equations, which uses the f...
In this thesis, we present four algorithms for solving sparse nonlinear systems of equations: the pa...
Classical iteration methods for linear systems, such as Jacobi iteration, can be accelerated consid...
Abstract. This paper concerns an acceleration method for fixed-point iterations that originated in w...
International audienceFixed point iterations are still the most common approach to dealing with a v...
A class of iterative methods without restriction on the computation of Fréchet derivatives including...
This paper examines a number of extrapolation and acceleration methods and introduces a few modifica...
This dissertation centers on two major aspects dictating the computational time of applications base...
AbstractAn algorithm for solving systems of nonlinear algebraic equations is described. The Jacobian...
The solution of problems involving the interaction of different systems is a domain of ongoing resea...