This article investigates two aspects of the generalized Broyden quasi-Newton method that have a major impact on its convergence: the initial approximation of the Jacobian and the presence of nonlinearities in the secant conditions. After reformulating the common representation of generalized Broyden, a straightforward interpretation is given. This leads to a natural extension of the method in which an application-dependent physics-based surrogate model is used as initial approximation of the (inverse) Jacobian. A carefully chosen surrogate has the potential to greatly reduce the required number of iterations. The behavior of generalized Broyden depends strongly on the parameter that determines how many secant conditions are satisfied by th...
Quasi-Newton methods were introduced by Charles Broyden [A class of methods for solving nonlinear si...
International audienceNewton's method is an ubiquitous tool to solve equations, both in the archimed...
In 1965 Broyden introduced a family of algorithms called(rank-one) quasi—New-ton methods for itera...
This article investigates two aspects of the generalized Broyden quasi-Newton method that have a maj...
AbstractQuasi-Gauss-Newton methods for nonlinear equations are investigated. A Quasi-Gauss-Newton me...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
The solution of problems involving the interaction of different systems is a domain of ongoing resea...
Broyden’s method is a quasi-Newton iterative method used to find roots of non-linear systems of equa...
We suggested a Broyden's-Like method in which the Jacobian of the system has some special structure...
summary:We propose a new Broyden method for solving systems of nonlinear equations, which uses the f...
The thesis concerns mainly in finding the numerical solution of non-linear unconstrained problems. ...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...
AbstractAn algorithm for solving systems of nonlinear algebraic equations is described. The Jacobian...
International audienceWe propose a new Broyden-like method that we call autoadaptative limited memor...
We present a new diagonal quasi-Newton update with an improved diagonal Jacobian approximation for s...
Quasi-Newton methods were introduced by Charles Broyden [A class of methods for solving nonlinear si...
International audienceNewton's method is an ubiquitous tool to solve equations, both in the archimed...
In 1965 Broyden introduced a family of algorithms called(rank-one) quasi—New-ton methods for itera...
This article investigates two aspects of the generalized Broyden quasi-Newton method that have a maj...
AbstractQuasi-Gauss-Newton methods for nonlinear equations are investigated. A Quasi-Gauss-Newton me...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
The solution of problems involving the interaction of different systems is a domain of ongoing resea...
Broyden’s method is a quasi-Newton iterative method used to find roots of non-linear systems of equa...
We suggested a Broyden's-Like method in which the Jacobian of the system has some special structure...
summary:We propose a new Broyden method for solving systems of nonlinear equations, which uses the f...
The thesis concerns mainly in finding the numerical solution of non-linear unconstrained problems. ...
A theory of inexact Newton methods with secant preconditioners for solving large nonlinear systems o...
AbstractAn algorithm for solving systems of nonlinear algebraic equations is described. The Jacobian...
International audienceWe propose a new Broyden-like method that we call autoadaptative limited memor...
We present a new diagonal quasi-Newton update with an improved diagonal Jacobian approximation for s...
Quasi-Newton methods were introduced by Charles Broyden [A class of methods for solving nonlinear si...
International audienceNewton's method is an ubiquitous tool to solve equations, both in the archimed...
In 1965 Broyden introduced a family of algorithms called(rank-one) quasi—New-ton methods for itera...