1) on the bounded of complete Rei
有界完全Reinhardt域
1.
In addition,we research the properties of the generalized extension Roper-Suffridge operator on the bounded of complete Reinhardt domainsΩ.
以及有界完全Reinhardt域Ω上的Roper-Suffridge算子的性质。
2) complete Reinhardt domain
完全Reinhardt域
3) totally bounded
完全有界
1.
A remark on limiting case of totally bounded metric set;
关于完全有界度量集的极限状态的一个注
2.
It is proved that the UCEM property of a family of measurable functions F implies that F is totally bounded;the UCEMUP property and PAC learnability still preserve when the family of probabilities is replaced by its closure.
证明了如果函数族F具有UCEM性质 ,那么F是完全有界的。
4) Reinhardt domains
Reinhardt域
1.
This paper,by the definition of almost spirallike mappings of type β(β∈(-π2,π2)) and order α(α∈[0,1)),discusses the generalized Roper-Suffridge extension operator which preserves almost spirallikeness of type β and order α on Reinhardt domains in ■n and the unit ball in complex Hilbert spaces,respectively.
由α次的殆β型螺形映照的定义,分别给出推广的Roper-Suffridge算子在Reinhardt域上和复Hilbert空间中的单位球上保持α次的殆β型螺形性。
2.
Let Cn1,Ω2 C Cn2 be bounded convex Reinhardt domains, f(z,w) = (f1(z,w), f2(z, w)) is a normalized holomorphic mapping on Ω1×Ω)2.
设Ω_1C~(n1),Ω_2C~(n2)为凸的Reinhardt域,f(z,w)=(f1(z,w),f2(z,w))'为Ω_1×Ω_2上的正规化全纯映射。
3.
In this paper, we study complete quasiconvex mappings in Cn, set up decompositiontheorem of complete quasiconvex mappings on Reinhardt domains which contain Bp andDp.
本文研究多复变数Cn中的完全准凸映射,分别在两类Reinhardt域Bp和Dp上建立正规化双全纯完全准凸映射的分解定理,当p→∞和p1,p2,···,pn→∞时,分别导出刘太顺,张文俊关于多圆柱上完全准凸映射的分解定理。
5) Reinhardt domain
Reinhardt域
1.
Derivative group of holomorphic automophism from any invariant K hler metric on a class of Reinhardt domain;
一类Reinhardt域从任一不变Kahler度量导出的解析自同胚群
2.
Bergman kernel function and full group of holomorphic automorphism on a type of Reinhardt domain;
关于某类Reinhardt域的Bergman核函数与解析自同构最大群
3.
The author first proves a result of Suffridge by a simple methed, and constructs some biholomorphic convex mappings on Reinhardt domain B_p~n.
本文给出了Suffridge结果的简单证明,并且构造出Reinhardt域B_p~n上的一些双全纯凸映
6) complete boun dedness
完全有界性
补充资料:超导电性的局域和非局域理论(localizedandnon-localizedtheoriesofsuperconductivity)
超导电性的局域和非局域理论(localizedandnon-localizedtheoriesofsuperconductivity)
伦敦第二个方程(见“伦敦规范”)表明,在伦敦理论中实际上假定了js(r)是正比于同一位置r的矢势A(r),而与其他位置的A无牵连;换言之,局域的A(r)可确定该局域的js(r),反之亦然,即理论具有局域性,所以伦敦理论是一种超导电性的局域理论。若r周围r'位置的A(r')与j(r)有牵连而影响j(r)的改变,则A(r)就为非局域性质的。由于`\nabla\timesbb{A}=\mu_0bb{H}`,所以也可以说磁场强度H是非局域性的。为此,超导电性需由非局域性理论来描绘,称超导电性的非局域理论。皮帕德非局域理论就是典型的超导电性非局域唯象理论。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条