1) multivalued vector variational inequality
集值向量变分不等式
1.
In this paper,we investigate the relationship of strict feasibility and solv- ability for the multivalued vector variational inequality.
本文研究集值向量变分不等式的严格可行性与可解性之间的关系。
2) Generalized implicit vector variational inequality problems with set-valued map
广义集值隐向量变分不等式问题
4) Random vector variational inequality
随机向量值变分不等式
5) Set-valued variational inequality
集值变分不等式
6) vector variational inequality
向量变分不等式
1.
In this paper,we first establish an equivalence between a vector variational inequality problem and a generalized variational inequality problem.
文章首先建立了向量变分不等式与广义变分不等式之间的等价关系,然后利用这个结论,建立了向量变分不等式的Levitin-Polyak适定性与广义变分不等式的Levitin- Polyak适定性之间的等价关系。
2.
A class of generalized multi-valued vector variational inequality problem(in short GMVVIP) is studied in Hausdorff topological vector space.
研究了Hausdorff拓扑向量空间中一类广义多值向量变分不等式问题(GMVVIP),把定义在凸集上的GMVVIP部分地推广到了非凸集并运用KKM定理得到了这类GMVVIP解的存在性定理。
3.
By using the vector variational inequality related to radial epiderivative,we give a number of necessary and sufficient conditions for Henig efficiency,super efficiency and cone-super efficiency of set-valued optimization under the framework of locally convex topological vector spaces,which generalizes some known related results.
利用与仿射上导数相关的向量变分不等式的真有效性,对局部凸拓扑向量空间中的集值优化问题的Henig有效性、超有效性、锥超有效性等给出了一些充分、必要条件,从而推广了一些已知的相关结论。
补充资料:Harnack不等式(对偶Harnack不等式)
Harnack不等式(对偶Harnack不等式)
quality (dual Hatnack inequality) Harnack in-
【补注】一直到G的边界的H助nack不等式,见【AZI.l翻..‘不等式(对停H山丸朗k不等不)[ Har.改沁-勺函勺(d切红Hat’I犯‘k如为uaJ卿);rap.姗二p魄HcT助(月加湘oe)] 给出正调和函数的两个值之比u(x)/“(y)的上界和下界估计的一个不等式,由A.Hai,剐火(汇IJ)得到.令u)0是n维E议当d空间的区域G中的一个调和函数;令E。(y)是中心在点y处半径为;的球{x:}x一y!<;}.若闭包万了刃.CG,则对于所有的、“凡(,),o
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