作为应用,一不动点定理,一极大元定理,一重合点定理和一些极小极大不等式被证明。
As applications, a fixed point theorem, a maximal element theorem, a coincidence theorem, some minimax inequalities are proved in FC-space.
在第8章,我们将讨论两个函数极小极大不等式及其对变分不等式和不动点理论的应用。
In Section 8, we shall discuss two-function minimax inequalities and their applications to variational inequalities and to fixed-point theory.
作为应用,一不动点定理,一极大元定理,一重合点定理和一些极小极大不等式被证明。
The new result is applied to obtain a KKM type theorem and maximal and minimal element theorems which are equivalent to each other on G-FC-spaces.
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 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 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.
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