We analyze the convergence of quasi-Newton methods in exact and finite precision arithmetic using three different techniques. We derive an upper bound for the stagnation level and we show that any sufficiently exact quasi-Newton method will converge quadratically until stagnation. In the absence of sufficient accuracy, we are likely to retain rapid linear convergence. We confirm our analysis by computing square roots and solving bond constraint equations in the context of molecular dynamics. In particular, we apply both a symmetric variant and Forsgren's variant of the simplified Newton method. This work has implications for the implementation of quasi-Newton methods regardless of the scale of the calculation or the machine
In this paper, we study greedy variants of quasi-Newton methods. They are based on the updating foru...
In this paper, we investigate quasi-Newton methods for solving unconstrained optimization problems. ...
Abstract: We investigate the use of reduced precision arithmetic to solve the linear equation for ...
We analyze the convergence of quasi-Newton methods in exact and finite precision arithmetic using th...
This paper highlights the important theoretical developments in the study of quasi-Newton or update...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
Quasi-Newton methods are very popular in Optimization. They have a long, rich history, and perform e...
Newton's method is a well known and often applied technique for computing a zero of a nonlinear func...
Four decades after their invention, quasi- Newton methods are still state of the art in unconstraine...
AbstractWe review the most important theoretical results on Newton's method concerning the convergen...
Abstract. A classical model of Newton iterations which takes into account some error terms is given ...
The focus for quasi-Newton methods is the quasi-Newton equation. A new quasi-Newton equation is deri...
Four decades after their invention, quasi-Newton methods are still state of the art in unconstrained...
Abstract. We prove that the force-based quasicontinuum method converges uniformly with first order a...
The inexact Newton method is widely used to solve systems of non-linear equations. It is well-known ...
In this paper, we study greedy variants of quasi-Newton methods. They are based on the updating foru...
In this paper, we investigate quasi-Newton methods for solving unconstrained optimization problems. ...
Abstract: We investigate the use of reduced precision arithmetic to solve the linear equation for ...
We analyze the convergence of quasi-Newton methods in exact and finite precision arithmetic using th...
This paper highlights the important theoretical developments in the study of quasi-Newton or update...
AbstractPractical quasi-Newton methods for solving nonlinear systems are surveyed. The definition of...
Quasi-Newton methods are very popular in Optimization. They have a long, rich history, and perform e...
Newton's method is a well known and often applied technique for computing a zero of a nonlinear func...
Four decades after their invention, quasi- Newton methods are still state of the art in unconstraine...
AbstractWe review the most important theoretical results on Newton's method concerning the convergen...
Abstract. A classical model of Newton iterations which takes into account some error terms is given ...
The focus for quasi-Newton methods is the quasi-Newton equation. A new quasi-Newton equation is deri...
Four decades after their invention, quasi-Newton methods are still state of the art in unconstrained...
Abstract. We prove that the force-based quasicontinuum method converges uniformly with first order a...
The inexact Newton method is widely used to solve systems of non-linear equations. It is well-known ...
In this paper, we study greedy variants of quasi-Newton methods. They are based on the updating foru...
In this paper, we investigate quasi-Newton methods for solving unconstrained optimization problems. ...
Abstract: We investigate the use of reduced precision arithmetic to solve the linear equation for ...