1.
Studies on the Properties of Harmonic Mappings and Biharmonic Mappings
关于调和映射和双调和映射性质的研究
2.
The Mapping Property of Mesocompact Space and Hausdorff Space;
Meso紧空间、Hausdorff空间的映射性质
3.
Properties of mapping on product of R_0-algebra;
乘积R_0-代数上的若干映射性质
4.
Features of Mapping of a Unstable Manifold on Linear Ordered Topological Space
线性序拓扑空间上不稳定流形的映射性质
5.
Mapping Property and Its Application of Local Surjection Operator Minus Local Disturbed Operator
局部满射算子与局部扰动算子差的映射性质及其应用
6.
A Completely New Method for Computing Generalized Inverses Based on Their Space Mapping Properties and Their Applications to Linear Model;
广义逆基于空间映射性质上的新的构造及其在线性模型中的应用
7.
Properties of the Mapping N_2×N_2→N_4;
映射N_2×N_2→N_4的性质
8.
The Properties of Matroid Operator、Matroid Mapping and Matroid Category;
拟阵算子、拟阵映射及拟阵范畴的性质
9.
Some Properties of the Mapping on the Set of the Bounded Closed Fuzzy Complex Numbers;
有界闭模糊复数集上映射的一些性质
10.
The Important Properties of P-mapping of Restricted Lie Algebra and the Application;
限制李代数P-映射的重要性质及应用
11.
Properties of mapping and sum space of S-Lindelof space;
S-Lindelf空间的映射及和空间的性质
12.
Study on the properties of the fixed-point sets of Scott continuous mapping
Scott连续自映射不动点集的性质研究
13.
Abstract: In this paper,a definition of cone-convex set-to-set mapping which domains are failed of linear sturcture is given,their basic properties are discussed.
文摘:提出了锥凸集到集映射的概念,并讨论了这类映射的基本性质.
14.
The Mixing Properties on Maps of Warsaw Circle and Dense Chaos of Tree Maps;
华沙圈上连续映射的混合性质及树映射的稠密混沌
15.
About the Properties of the Cone Weak Subdiffrerential of Limit Mapping of Set-valued Mapping Sequence;
集值映射序列的极限映射的锥弱次微分的若干性质
16.
Quotient mapping and quotient topology are very important contents of topology. In this paper we discussed systematically their basic properties and reported some results.
系统地讨论了商映射的性质和映射成为商映射的条件,得到了若干定理和推论.
17.
The Existence and Property Result for Optimization Problem of Set-Valued Maps;
集值映射优化问题解的存在性及解集性质
18.
Some Convergence Properties of Fixed Point Iterative Sequences for Some Mappings;
几类映射的不动点迭代序列的若干收敛性质