1) generalized vector quasi-variational-like inequality
广义向量拟类变分不等式
1.
In this thesis,first,we employ the fixed point theorem to establish the existence of solution of a class of generalized vector quasi-variational-like inequality over product sets.
本文首先研究了一类积集上的广义向量拟类变分不等式问题,使用不动点定理给出了它的解的存在性结果。
2) scalar generalized quasivariational inequality
标量广义拟变分不等式
1.
In this paper,an equivalence between a vector quasivariational inequality and a scalar generalized quasivariational inequality was established.
建立了向量拟变分不等式与标量广义拟变分不等式之间的等价性,证明了向量拟变分不等式的Levtin-Polyak适定性与标量广义拟变分不等式的Levtin-Polyak适定性之间的等价关系。
3) Generalized Implicit Vector Quasivariational Inequalities
广义隐拟向量变分不等式
1.
Existence of Solutions for Generalized Implicit Vector Quasivariational Inequalities;
一类广义隐拟向量变分不等式解的存在性问题
2.
In this paper,we study the existence of solutions for generalized implicit vector quasivariational inequalities in the setting of Hausdorff topological vector space by using fixed point theorems.
研究了Hausdorff空间中一类广义隐拟向量变分不等式问题(GIVQI),利用不动点定理得到了其一个解的存在性的等价条件。
4) generalized vector quasi-variational-like inequalities
广义向量拟似变分不等式
1.
In this paper, some existence theorems of a solution for generalized vector quasi-variational-like inequalities without any monotonity conditions in a noncompact topological space setting are proven by the maximal element theorem.
本文利用极大元定理在非紧拓扑空间设置下证明了没有单调性的广义向量拟似变分不等式解的存在性定理。
5) generalized vector F-implicit variational-like inequality problem
广义向量F的隐变分类不等式问题
6) generalized vector variational-type inequality
广义向量变分型不等式
1.
A class of generalized vector variational-type inequality problems(in short,GVVTIP) are studied in FC-spaces,which include most of vector equilibrium problems,vector variational inequality problems,generalized vector equilibrium problems and generalized vector variational inequality problem as special cases.
在FC_空间中引入和研究了一类广义向量变分型不等式(GVVTIP),包含了大多数向量平衡问题,向量变分不等式问题,广义向量平衡问题和广义向量变分不等式问题作为特殊情况。
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
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条