1) Disk position
圆盘位置
2) luminaire layout along circle
圆盘布置
3) unit disk
单位圆盘
1.
The third part of this paper proved space ap,q,αψ is also self-conjugate on Cn,and then prove it in the same way as to prove it on the unit disk.
Axler猜想当0
2.
We establish some new properties on the unit disk by the definition of two reproducing kernel fuctions.
在再生核理论的基础上,针对特殊的再生核——解析Bergman核与调和Bergman核,分别借助两种再生核的定义讨论它们在单位圆盘上所具有的一些性质,为进一步研究这两种再生核在单位球上的性质提供理论基础。
3.
In this paper, the theoretical properties of some function spaces in the unit disk are studied.
本文主要研究了单位圆盘上一些函数空间的分析性质,主要是以下两个方面,这些结果均推广了已知的结论。
4) the unit ball
单位圆盘
1.
In this paper,we study the convergence of Hilbert-valued Dμ,q function on the unit ball by Rademacher function system and get the Lipschitz condition of Hilbert-valued Dμ,q function,iff(z)=sum from n=1 to ∞ xnzn ∈ Dμ,q,q > (2n)/μ ,we get φ(z)=sum from α≥0 to ∞ ⅡxαⅡzα ∈Lipγ,where 0<μ<1 if n=1 or 0<μ<2 if n>1.
主要研究了单位圆盘上Hilbert值Dμ,q函数,得到了Hilbert值Dμ,q函数的Lipschitz条件,若f(z)=sum from n=1 to ∞ xnzn∈Dμ,q,0<μ<1,q>(2n)/μ,则有φ(z)=sum from n=1 to ∞ⅡxnⅡzn∈Lipγ。
2.
In this paper,we study the convergence of l~2-valued D_(μ,q) function on the unit ball by Rademacher function system and get the convergence of l~2-valued D_(μ,q) function,if f(z)=sum from∞to n=1 x_nz~n∈D_(μ,q) q>(2n)/μ,we get f_ω(z)∈H~∞for almost every {ε_α},where 0<μ<1.
主要研究了单位圆盘上l~2值D_(μ,q)函数,得到了l~2值D_(μ,q)函数的收敛性,若f(z)=sum from n=1 to∞x_nz~n∈D_(μ,q),0<μ<1,q>(2n)/μ,则对几乎所有的{ε_α}有f_ω(z)∈H~∞。
5) offset disc harrow
偏置圆盘耙
6) symmetrical disc harrow
对置圆盘耙
补充资料:多圆盘
多圆盘
polydisc
多圆盘t州y此c;no月,即yr」,多圆柱(polycy如der) 复空问C月(n)l)中的一区域 △二△(a=(a,,…,a。),厂二(r,,…,r。))= ={:=(:,,…,:。)〔C”:!:一“,】<;,, ,=l,…,n},它是,;个圆盘的拓扑积 △二△lx…x△。, △,={:,苦C“}“,一a,J
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