By using a known coincidence theorem, a minimax inequality is established in general topological space.
利用已知的重合点定理,在一般拓扑空间内得到一个极大极小不等式定理。
In the present paper some theorems for variational inequalities and minimax inequality are obtained in hyperconvex metric spaces.
摘要文章给出了超凸度量空间中的一些变分不等式定理和极大极小不等式定理。
A section theorem, a minimax inequality and a generalized fixed point theorem where the underlying space is a product space of two topological vector Spaces, are given.
给出了两个拓扑向量空间的乘积空间上截口定理,极小极大不等式及一个推广的不动点定理。
A new minimax inequality theorem is established, which will be used to study the existence problem of solution for a new class of generalized bi-quasi-variational inequality.
建立了一个新的极大极小不等式,并利用它研究了仿紧集上一类新型广义双拟变分不等式解的存在性问题。
A new minimax inequality theorem is established, which will be used to study the existence problem of solution for a new class of generalized bi-quasi-variational inequality.
建立了一个新的极大极小不等式,并利用它研究了仿紧集上一类新型广义双拟变分不等式解的存在性问题。
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