运用通有的方法,研究了在锥变化和挠动的意义下向量优化问题解的上半连续性。
The purpose of this paper is to study the upper semi-continuity on their solutions of optimisation problems on the cone.
本文给出了集值映射的上半连续性和下半连续性同图象的闭性和开性间的一些关系。
This paper gives some relation of U. S. C. and L. S. C. of set-valued mappings with closed and open property of image.
本文首先给出了集值映射序列的极限映射的上半连续性与J -凸性;其次解决了集值映射序列的极限映射的锥次微分的存在性。
In this paper, we have discussed some problems about the upper semi-continuity and J-convexity of the limit mapping of set-valued mapping sequence.
最后,在恰当的假设条件下,获得了弱扰动映射的二阶邻接导数的上半连续和下半连续性。
Finally, under suitable assumptions, we obtain the upper semicontinuity and the lower semicontinuity of second-order adjacent derivatives for the weak perturbation maps.
最后,在恰当的假设条件下,获得了弱扰动映射的二阶邻接导数的上半连续和下半连续性。
Finally, under suitable assumptions, we obtain the upper semicontinuity and the lower semicontinuity of second-order adjacent derivatives for the weak perturbation maps.
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