Bibliographic Details
| Title: |
Conjugate duality in set optimization via subdifferential respect to set-order relations. |
| Authors: |
Zhai, Yuwen1 (AUTHOR) zhaiyw7415@163.com, Yu, Guolin1 (AUTHOR) guolin_yu@126.com, Tang, Tian2 (AUTHOR) tangt6304@163.com |
| Source: |
Journal of Optimization Theory & Applications. Jun2026, Vol. 209 Issue 3, p1-25. 25p. |
| Subjects: |
Subdifferentials, Set-valued maps, Multi-objective optimization, Ordered sets, Duality theory (Mathematics), Mathematical optimization |
| Abstract: |
Based on subdifferentials and conjugate functions, we obtain conjugate duality theorems of set optimization problem under set-order relations. This paper has two main purposes. One is to put forward a new notion of subdifferential of set-valued maps based on m-order relations, and establish some properties of the subdifferential, such as convexity, closedness and homogeneity. The other is to propose new conjugate and biconjugate maps of set-valued maps via the Minkowski difference, obtain some relations among the maps and the subdifferential, and establish optimality conditions, weak and strong conjugate duality theorems of set-order solutions to set optimization problem. Finally, we apply the main results of the paper to uncertain optimization problems. communicated by Tuyen Van Nguyen. [ABSTRACT FROM AUTHOR] |
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| Database: |
Engineering Source |