无约束优化的一种具有充分下降性质的无内存对称秩一方法

Q4 Decision Sciences

Journal of the Operations Research Society of Japan Pub Date : 2018-01-01 DOI:10.15807/JORSJ.61.53

Shummin Nakayama, Yasushi Narushima, H. Yabe

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引用次数: 10

摘要

准牛顿方法被广泛用于求解无约束优化问题。然而，拟牛顿方法很难直接应用于大规模的无约束优化问题，因为它们需要存储矩阵的存储器。为了克服这一困难，提出了无记忆拟牛顿方法。Shanno(1978)导出了无记忆BFGS方法。最近，一些研究者研究了基于对称秩一公式的无记忆拟牛顿方法。然而，现有的无内存对称秩一方法并不一定满足充分下降条件。本文研究了基于谱标度割线条件的对称秩一公式，并在此基础上导出了一种无记忆拟牛顿方法。对于一般目标函数，该方法总是满足充分下降条件，并具有全局收敛性。最后给出了初步的数值结果。

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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A MEMORYLESS SYMMETRIC RANK-ONE METHOD WITH SUFFICIENT DESCENT PROPERTY FOR UNCONSTRAINED OPTIMIZATION

Quasi-Newton methods are widely used for solving unconstrained optimization problems. However, it is difficult to apply quasi-Newton methods directly to large-scale unconstrained optimization problems, because they need the storage of memories for matrices. In order to overcome this difficulty, memoryless quasi-Newton methods were proposed. Shanno (1978) derived the memoryless BFGS method. Recently, several researchers studied the memoryless quasi-Newton method based on the symmetric rank-one formula. However existing memoryless symmetric rank-one methods do not necessarily satisfy the sufficient descent condition. In this paper, we focus on the symmetric rank-one formula based on the spectral scaling secant condition and derive a memoryless quasi-Newton method based on the formula. Moreover we show that the method always satisfies the sufficient descent condition and converges globally for general objective functions. Finally, preliminary numerical results are shown.

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来源期刊

Journal of the Operations Research Society of Japan 管理科学-运筹学与管理科学

CiteScore

0.70

自引率

0.00%

发文量

审稿时长

12 months

期刊介绍： The journal publishes original work and quality reviews in the field of operations research and management science to OR practitioners and researchers in two substantive categories: operations research methods; applications and practices of operations research in industry, public sector, and all areas of science and engineering.