本文证明了完备的一致凸的度量线性空间是自反的。
In this paper it is proved that uniform convexity metric linear Spaces with completeness are reflexive.
本文主要研究概率度量空间中非线性算子的理论与应用。
In this thesis, some problems for nonlinear operators and their applications in probabilistic metric Spaces are studied.
利用局部紧的条件,将多目标优划问题的灵敏度分析由度量空间推广到拓扑线性空间,得到了更一般的结果。
The paper investigates sensitivity analysis of multiobjective optimization in locally compact topological vector spaces instead of metric spaces and obtains much more general results.
另外,在直觉模糊半度量空间中,讨论了一个非线性压缩条件下的公共不动点定理。
What is more, we offer a common fixed point theorem under the linear contractive condition in the setting of an intuitionistic fuzzy metric space.
另外,在直觉模糊半度量空间中,讨论了一个非线性压缩条件下的公共不动点定理。
What is more, we offer a common fixed point theorem under the linear contractive condition in the setting of an intuitionistic fuzzy metric space.
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