1) cover
复迭
1.
We determine at what occasion while the compact 3-manifolds with residually finite groups have only finitely many finite covers, and while those have only finitely many finite cyclic covers.
本文给出基本群为剩余有限的紧致3维流形何时有有限多有限复迭,何时有有限多有限循环复迭的充要条件。
2) covering space
复迭空间
1.
By using algebra of fixed point class to determine the component factors and properties of normal subgroup H of the fundamental group of the covering space, the paper studies the relation of fixed point class with fixed point class H.
本文利用不动点类的代数化 ,决定复迭空间的基本群的正规子群H的构成因素及其性质 ,研究不动点类与H不动点类的关系。
3) Autocascade
自动复迭
4) complex iteration
复迭代
1.
Having extended the concept of filled Julia set of a complex iteration,one asserts that every triangle domain is the filled Julia set of certain complex iteration,then some comments are given.
提出了把复迭代的Julia集及充满Julia集的概念作一定程度的拓广(原先在文献中所认为的Julia集仍是拓广后的Julia集),后指出当指定任何一个三角形区域之后,它必可是某个复迭代的Julia集。
2.
This paper discusses the complex iteration concerned with Julia sets and Mandelbrot sets.
讨论了Julia集与Mandelbrot集的复迭代。
5) covering mapping
复迭映射
1.
If f:S1×S1→S1×S1 is a continuous mapping in the torus,F:R×R→R×R is a continuous mapping by itself,and E*:R×R→S1×S1 is a covering mapping,we can use the characterization of upgrade and the computation of covering mapping to give some properties of upgrade for torus.
设f:S1×S1→S1×S1是环面上的连续映射;F:R×R→R×R是平面到自身的连续映射;E*:R×R→S1×S1是平面到环面上的复迭映射。
6) Iteration
反复迭代
参考词条
补充资料:复迭
1.亦作"复叠"。 2.重叠。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。