1) Fatou set
Fatou集
1.
The Fatou set f(f_a) is a completely invariant absorbing domain for a<0.
研究函数fa(z)=zexp(z+a+πi)的动力学,证明了下列结果:当a<0时,Fatou集F(fa)是一个完全不变吸引域;存在an>0,使得fan具有2n阶超吸引域,而当a>an时,fa没有2n阶超吸引域;an单调增加趋于无穷大;集合B0={aRJ(fa)=C}是一个无界集。
2.
The Fatou set F(an) is by definition the set of all z C such that ( Fn) is normal in someneighborhood of z ,while the complement of F(an) is called the Julia set J(an),.
Fatou集F_a定义为扩充平面上使得F_n正规的点z的全体,其余集J_a称为Julia集。
3.
In this paper, a dynamical system formed by two commute rational fuctions is studied, and some dynamical properties of the Julia set and Fatou set of the system are discussed.
研究了两个可换有理函数构成的随机动力系统,得到了这些动力系统的Fatou集和Julia集的一些动力学性质。
2) holomorphic mappings/Fatou set
全纯映射/Fatou集
3) Fatou's lemma
Fatou引理
4) Fatou component
Fatou分支
1.
It is proved that the boundaries of Fatou components of four certain kinds of entire functions are Jordan curves,and that the Lebesque measures of the Julia sets of these functions are equal to zero, which generalizes some results obtained by Bergweiler and Kisaka.
论文推广了Bergweiler和Kisaka的一个结论 ,证明了两个结果 :( 1 )上述四类函数中的任何一个函数的Fatou分支的边界都是Jordan曲线 ;( 2 )上述所有函数的Julia集的Lebesgue测度为
5) Fatou type theorem
Fatou型定理
6) Fatou theorem
Fatou定理
补充资料:〖ZK(〗各证集说诸方备用并五脏六腑集论合抄〖ZK)〗
〖ZK(〗各证集说诸方备用并五脏六腑集论合抄〖ZK)〗
内科著作。1卷。原题清叶桂(天士)家传,撰年不详。此书汇集内科杂证70余种,方剂近200首。每证各为一论,阐明疾病性质、病因、症状、治则及方药。论后每引经说,概括病机。所列方药服法亦皆详备。又列“五脏六腑论”一章,引用《内经》、《难经》,逐一论述五脏六腑之形象、部位、表里关系、病症及治法。本书内容多录自《临证指南》,恐系后人伪托叶氏之作。现存抄本
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