完备度量空间上迭代函数系统的不变集性质及测度的维数是分形几何研究的主要对象。
The property of the invariant set and measure's dimension of the IFS are main objects in the studying of fractal geometry.
研究了完备度量空间中两个单值映象和一个集值映象有唯一公共不动点的充要条件,改进了已有文献的有关结果。
The sufficient and necessary conditions of two single-valued mapping and a set-valued mapping with the only common fixed point in complete metric space are discussed.
本文论述了集合上的度量、度量空间的性质、度量拓扑、可度量化空间、完备度量空间、及一阶电路中的度量空间。
The measurement in set theory, the properties of Metric Space, measurement Topology, Measurable Space, Perfect Metric Space and its application in first order circuit are explored in this paper.
利用度量空间中弱相容自映射的概念,讨论了完备度量空间中弱相容映射公共不动点的存在性,推广和改进了吕中学等人一些相关的结果。
The concepts of compatible mappings and weakly compatible mappings in multi-valued case in Menger PM-spaces were introduced, and the relation between them was studied.
研究了在完备度量空间中一对模糊映象满足一些特定不等式条件,以及当其截集是中非空有界闭集时,该对模糊映象的公共不动点的存在性问题。
Does research in a common fixed point theorem of fuzzy mappings in inequality conditions and the cut set is the nonempty closed bounded subsets of, while is complete metric space.
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.
本文给出在完备度量凸空间上非自映射的一类新的不动点定理。
In this paper, we will give a new type of fixed point theorem for non - self - mapping in a complete metrically convex metric space.
本文提出了概率度量空间纲的概念,并证明了完备的概率度量空间是概率第二纲集合。
This paper brings forward the concept of category on probabilistic metric Spaces and proves that complete probabilistic metric Spaces is a set of the second category.
本文在完备的度量空间中给出了一类顺序映射的不动点及其性质。
This paper presents fixed points of a kind of Sequential mapping and its properties.
本文在完备的度量空间中给出了一类顺序映射的不动点及其性质。
This paper presents fixed points of a kind of Sequential mapping and its properties.
应用推荐