A Review of Well-Known Robust Line Search and Trust Region Numerical Optimization Algorithms for Solving Nonlinear Least-Squares Problems

International science review series Pub Date : 2021-11-09 DOI:10.47285/isr.v2i3.106

Jacques Sabiti Kiseta, Roger Liendi Akumoso

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Abstract

The conditional, unconditional, or the exact maximum likelihood estimation and the least-squares estimation involve minimizing either the conditional or the unconditional residual sum of squares. The maximum likelihood estimation (MLE) approach and the nonlinear least squares (NLS) procedure involve an iterative search technique for obtaining global rather than local optimal estimates. Several authors have presented brief overviews of algorithms for solving NLS problems. Snezana S. Djordjevic (2019) presented a review of some unconstrained optimization methods based on the line search techniques. Mahaboob et al. (2017) proposed a different approach to estimate nonlinear regression models using numerical methods also based on the line search techniques. Mohammad, Waziri, and Santos (2019) have briefly reviewed methods for solving NLS problems, paying special attention to the structured quasi-Newton methods which are the family of the search line techniques. Ya-Xiang Yuan (2011) reviewed some recent results on numerical methods for nonlinear equations and NLS problems based on online searches and trust regions techniques, particularly on Levenberg-Marquardt type methods, quasi-Newton type methods, and trust regions algorithms. The purpose of this paper is to review some online searches and trust region's more well-known robust numerical optimization algorithms and the most used in practice for the estimation of time series models and other nonlinear regression models. The line searches algorithms considered are: Gradient algorithm, Steepest Descent (SD) algorithm, Newton-Raphson (NR) algorithm, Murray’s algorithm, Quasi-Newton (QN) algorithm, Gauss-Newton (GN) algorithm, Fletcher and Powell algorithm (FP), Broyden-Fletcher-Goldfarb-Shanno (BFGS) algorithm. While the only trust-region algorithm considered is the Levenberg-Marquardt (LM) algorithm. We also give some main advantages and disadvantages of these different algorithms.

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求解非线性最小二乘问题的鲁棒线搜索和信赖域数值优化算法综述

条件、无条件或精确最大似然估计和最小二乘估计涉及最小化条件或无条件残差平方和。最大似然估计(MLE)方法和非线性最小二乘(NLS)方法是一种迭代搜索技术，用于获得全局而不是局部最优估计。几位作者简要概述了解决NLS问题的算法。Snezana S. Djordjevic(2019)综述了一些基于线搜索技术的无约束优化方法。Mahaboob等人(2017)提出了一种不同的方法，使用同样基于线搜索技术的数值方法来估计非线性回归模型。Mohammad, Waziri和Santos(2019)简要回顾了解决NLS问题的方法，特别关注结构化准牛顿方法，这是搜索线技术的家族。袁亚香(2011)回顾了基于在线搜索和信任域技术的非线性方程和NLS问题数值方法的一些最新成果，特别是Levenberg-Marquardt型方法、准牛顿型方法和信任域算法。本文的目的是回顾一些在线搜索和信任域比较知名的鲁棒数值优化算法，以及在实际中最常用的时间序列模型和其他非线性回归模型的估计。考虑的线搜索算法有:梯度算法、最陡下降(SD)算法、牛顿-拉斐尔(NR)算法、默里算法、准牛顿(QN)算法、高斯-牛顿(GN)算法、弗莱彻和鲍威尔算法(FP)、布罗伊登-弗莱彻-戈德法布-夏诺(BFGS)算法。而唯一考虑的信任域算法是Levenberg-Marquardt (LM)算法。并给出了这些算法的主要优缺点。

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International science review series

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