| 一个基于非单调技术的超记忆梯度法 |
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| 引用本文: | 林海婵,李靖雅,欧宜贵.一个基于非单调技术的超记忆梯度法[J].应用数学,2020,33(1):116-125. |
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| 作者姓名: | 林海婵 李靖雅 欧宜贵 |
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| 作者单位: | 海南大学理学院, 海南 海口 570228 |
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| 基金项目: | 国家自然科学基金项目(11961018,11761025) |
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| 摘 要: | 本文给出一个修正的非单调线搜索策略,并结合该策略提出一个求解无约束优化问题的超记忆梯度算法.该算法的主要特点是:在每一次迭代中,它所产生的搜索方向总是满足充分下降条件.这一特性不依赖于目标函数的凸性以及方法所采用的线搜索策略.在较弱的条件下,该方法具有全局收敛和局部R-线性收敛性.数值实验表明了该方法的有效性.
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| 关 键 词: | 无约束优化 非单调技术 超记忆梯度法 收敛性分析 数值实验 |
A Supermemory Gradient Method Based on the Nonmonotone Technique |
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| LIN Haichan,LI Jingya,OU Yigui.A Supermemory Gradient Method Based on the Nonmonotone Technique[J].Mathematica Applicata,2020,33(1):116-125. |
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| Authors: | LIN Haichan LI Jingya OU Yigui |
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| Institution: | (Faculty of Science,Hainan University,Haikou 570228,China) |
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| Abstract: | In this paper,we present a modified nonmonotone strategy.Based on this strategy,a supermemory gradient method for unconstrained problems is proposed.An attractive property of the proposed method is that the search direction always provides sufficient descent step at each iteration.The property is independent of convexity of objective function and the line search used.Under mild assumptions,the global convergence and R-linear convergence properties of the proposed algorithm are established respectively.Numerical results are also reported to show that the proposed method is effective. |
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| Keywords: | Unconstrained optimization Nonmonotone technique Supermemory gradient method Convergence analysis Numerical experiment |
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