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中国工业与应用数学学会会刊
主管:中华人民共和国教育部
主办:西安交通大学
ISSN 1005-3085  CN 61-1269/O1

工程数学学报

• • 上一篇    

向量变分不等式和多目标优化高阶严格极小解的关系(英)

张亚萌,   余国林   

  1. 北方民族大学应用数学研究所,银川  750021
  • 收稿日期:2019-01-16 接受日期:2019-07-03 出版日期:2021-06-15 发布日期:2021-08-15
  • 通讯作者: 余国林 E-mail: guolin_yu@126.com
  • 基金资助:
    国家自然科学基金 (11861002);北方民族大学重大专项 (ZDZX201804).

Relationships between Vector Variational Inequality and Multi-objective Optimization for Strict Minimizer of Higher Order

ZHANG Ya-meng,   YU Guo-lin   

  1. Institute of Applied Mathematics, North Minzu University, Yinchuan 750021
  • Received:2019-01-16 Accepted:2019-07-03 Online:2021-06-15 Published:2021-08-15
  • Contact: G. Yu. E-mail address: guolin_yu@126.com
  • Supported by:
    The National Natural Science Foundation of China (11861002); the Key Research Project of North Minzu University (ZDZX201804).

摘要: 本文研究向量变分不等式与非光滑多目标优化问题高阶严格极小解之间的关系.首先,引入了一类广义高阶强伪凸Lipschitz函数的概念,称之为高阶强伪凸type I函数,并且给出具体实例说明其存在性.其次,在高阶强伪凸type I函数假设下,给出了高阶严格极小元,向量关键点和弱向量变分不等式解之间的关系刻画.

关键词: 多目标优化, 高阶严格极小解, 向量变分不等式, 强凸性

Abstract: This paper is devoted to the study of the relations between vector variational inequality and nonsmooth multi-objective optimization in the sense of strict minimizers of higher order. We firstly introduce an extension of higher-order strong pseudoconvexity for Lipschitz functions, termed higher-order strongly pseudoconvex functions of type I, and some examples are presented in the support of this generalization. Then, we identify the strict minimizers of higher order, the vector critical points and the solutions of the weak vector variational inequality problem under the higher-order strong pseudoconvexity of type I hypothesis. It is our understanding that such results have not been established till now.

Key words: multi-objective optimization, strict minimizer of higher order, vector variational inequality, strong convexity

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