数学
非线性共轭梯度法
共轭梯度法
凸性
行搜索
梯度下降
趋同(经济学)
应用数学
非线性系统
标量(数学)
凸优化
正多边形
数学优化
计算机科学
几何学
计算机安全
机器学习
金融经济学
经济
经济增长
物理
量子力学
人工神经网络
半径
作者
L. R. Lucambio Pérez,L. F. Prudente
摘要
In this work, we propose nonlinear conjugate gradient methods for finding critical points of vector-valued functions with respect to the partial order induced by a closed, convex, and pointed cone with nonempty interior. No convexity assumption is made on the objectives. The concepts of Wolfe and Zoutendjik conditions are extended for the vector-valued optimization. In particular, we show that there exist intervals of step sizes satisfying the Wolfe-type conditions. The convergence analysis covers the vector extensions of the Fletcher--Reeves, conjugate descent, Dai--Yuan, Polak--Ribière--Polyak, and Hestenes--Stiefel parameters that retrieve the classical ones in the scalar minimization case. Under inexact line searches and without regular restarts, we prove that the sequences generated by the proposed methods find points that satisfy the first-order necessary condition for Pareto-optimality. Numerical experiments illustrating the practical behavior of the methods are presented.
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