A globally convergent primal-dual interior point method for constrained optimization

IF 1.4 3区数学 Q3 COMPUTER SCIENCE, SOFTWARE ENGINEERING Optimization Methods & Software Pub Date : 1998-01-01 DOI:10.1080/10556789808805723

Hiroshi Yamashita

引用次数: 115

Abstract

This paper proposes a primal-dual interior point method for solving general nonlinearly constrained optimization problems. The method is based on solving the Barrier Karush-Kuhn-Tucker conditions for optimality by the Newton method. To globalize the iteration we introduce the Barrier-penalty function and the optimality condition for minimizing this function. Our basic iteration is the Newton iteration for solving the optimality conditions with respect to the Barrier-penalty function which coincides with the Newton iteration for the Barrier Karush-Kuhn-Tucker conditions if the penalty parameter is sufficiently large. It is proved that the method is globally convergent from an arbitrary initial point that strictly satisfies the bounds on the variables. Implementations of the given algorithm are done for small dense nonlinear programs. The method solves all the problems in Hock and Schittkowski's textbook efficiently. Thus it is shown that the method given in this paper possesses a good theoretical convergen...

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一种全局收敛的原对偶内点法求解约束优化问题

本文提出了一种求解一般非线性约束优化问题的原对偶内点法。该方法基于牛顿法求解最优性垒Karush-Kuhn-Tucker条件。为了使迭代全局化，我们引入了障碍惩罚函数和最小化该函数的最优性条件。我们的基本迭代是求解Barrier-penalty函数最优性条件的牛顿迭代，当惩罚参数足够大时，它与求解Barrier Karush-Kuhn-Tucker条件的牛顿迭代是一致的。证明了该方法从严格满足变量界的任意初始点全局收敛。给出的算法在小型密集非线性程序中实现。该方法有效地解决了Hock和Schittkowski教科书中的所有问题。结果表明，本文方法具有较好的理论收敛性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Optimization Methods & Software 工程技术-计算机：软件工程

CiteScore

4.50

自引率

0.00%

发文量

审稿时长

7 months

期刊介绍： Optimization Methods and Software publishes refereed papers on the latest developments in the theory and realization of optimization methods, with particular emphasis on the interface between software development and algorithm design. Topics include: Theory, implementation and performance evaluation of algorithms and computer codes for linear, nonlinear, discrete, stochastic optimization and optimal control. This includes in particular conic, semi-definite, mixed integer, network, non-smooth, multi-objective and global optimization by deterministic or nondeterministic algorithms. Algorithms and software for complementarity, variational inequalities and equilibrium problems, and also for solving inverse problems, systems of nonlinear equations and the numerical study of parameter dependent operators. Various aspects of efficient and user-friendly implementations: e.g. automatic differentiation, massively parallel optimization, distributed computing, on-line algorithms, error sensitivity and validity analysis, problem scaling, stopping criteria and symbolic numeric interfaces. Theoretical studies with clear potential for applications and successful applications of specially adapted optimization methods and software to fields like engineering, machine learning, data mining, economics, finance, biology, or medicine. These submissions should not consist solely of the straightforward use of standard optimization techniques.