A REDUCED HESSIAN METHOD FOR LARGE-SCALE CONSTRAINED OPTIMIZATION

被引：104

作者：

BIEGLER, LT

NOCEDAL, J

SCHMID, C

机构：

[1] NORTHWESTERN UNIV,DEPT ELECT ENGN & COMP SCI,EVANSTON,IL 60208

[2] ARGONNE NATL LAB,DIV MATH & COMP SCI,ARGONNE,IL 60439

来源：

SIAM JOURNAL ON OPTIMIZATION | 1995年 / 5卷 / 02期

关键词：

SUCCESSIVE QUADRATIC PROGRAMMING; REDUCED HESSIAN METHODS; CONSTRAINED OPTIMIZATION; QUASI-NEWTON METHOD; LARGE-SCALE OPTIMIZATION;

D O I：

10.1137/0805017

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We propose a quasi-Newton algorithm for solving large optimization problems with nonlinear equality constraints. It is designed for problems with few degrees of freedom and is motivated by the need to use sparse matrix factorizations. The algorithm incorporates a correction vector that approximates the cross term Z(T)WYp(Y) in order to estimate the curvature in both the range and null spaces of the constraints. The algorithm can be considered to be, in some sense, a practical implementation of an algorithm of Coleman and Conn. We give conditions under which local and superlinear convergence is obtained.

引用

页码：314 / 347

页数：34

共 29 条

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