劳勃生的特殊星像函数和特殊凸像函数

<正> 设函数w在单位圆 E_z:|z|<1上是正则的.假如f(z)在 E_z上是单叶的,那末 D_f=f(E_z)是 w 平面上单叶的区域.记这种单叶函数f(z)的全体为 S_p,S_1=S.若 D_f 以原点 w=0 为星形中心,就是说若 w_0∈D_f则缐段■整个地落在区域 D_f 中,称这种函数 f(z)是 E_z 中的星像函数,其特徵是在 E_z     

关于Da ovitch定理

Dasoviteh在[l]中建立了如下的定理:在圆}:}<1内,给出两个解析函数r(宕)一艺a。:”、(二)一艺占。z:(l)若f。)〔Ha(o<占<1),Reg(,)可用poisson一stielties积分表示,则在圆!:}相似文献   

关于Hardy-Littlewood一个定理的注记

若圆|z|<1内解析函数f(z)=f(re~(iθ))对所有00,)则称f(z)∈H_p。H_p类解析函数f(z)在|z|=1上几乎处处有角形边界值f(e~(iθ)),且满足‖f(e~(iθ))‖_p<+∞([1]第二章)。这时称函数 为f(e~(iθ))的k阶积分连续模,其中κ为任意自然数。当κ=1时,简记ω_1(δ)_p=ω_p(δ)。 关于H_p(p≥1)类解析函数,Hardy—Littlewood有一个定理([2]定理48):     

关于亚纯函够点、极点的比较定理

1982年M.H.Shih证明:在一包含原点的有界区域内解析、在边界上连续的函数f(z),若对边界上每一点Z,Re[Zf(z)]>0,则f(z)在D内恰有一个零点;1987年钟玉泉将f(z)在D内解析改为在D内除可能有极点外解析,其余条件不变,证明了:N(f,?D)-P(f,?D)=1。本文继此推广得到:     

单位圆上解析函数的掩盖定理

设w=f(z)是单位圆D上满足规范条件 f(0)=0,f′(0)=1的解析函数。众所周知,当f(z)是单叶解析函数时,有著名的Koebe的1/4掩盖定理。在去掉单叶性的假设时,对于函数     

广义解析函数的B,H_δ,D,A类函数及其序列的收斂性

本交内容是将B,H_δ,D,A类的单位圆内的解析函数推广到广义解析函数中去,然后将A类函数的唯一性定理,与H_δ类函数有关的黎斯(F.Riesz)定理,与D类函数有关的波卢巴利诺娃一哥齐娜定理应用到广义解析函数中去.由此根据广义解析函数边界值序列在边界上的收敛性研究此类函数在单位圆内部的一致收敛性.将欣金与奥斯特洛夫斯基的定理及都马尔基的定理都应用到广义解析函数中去.     

解析函数的又一等价定理

将Morera定理中的条件∫γf(z)dz=0改为∫f-gds=0,证明其结论仍然成立,并由此得出一个单值复变函数f(z)在G中解析的充要条件,即解析函数的又一等价定理.     

Cauchy型积分的一个推广

<正> 其中n为任意自然数. 在[2]中曾对(2)作了另一证明.本文的目的是利用[2]中类似的方法,把形式(1)加以推广,并导出相应的高阶导数的公式.我们的主要结果如下: 定理.(推广的Cauchy型积分).设函数f(w)在可求长曲线Γ上连续,或者最多除了有限多个第一类间断点外连续,φ(w)在包含Γ的区域D上解析.若对任意w∈Γ及任意z∈G=D-Γ,φ(w)≠φ (z),则函数     

E^P（D）（1〈P〈＋∞）空间上的插值多项式逼近

§1引言 设D为复平面上由可求长闭Jordan曲线为边界所围的区域,(?)为D到单位圆U上的保形变换,其逆变换为.对于0相似文献   

零点分割定理

本文把古典的多项式和整函数的零点分割定理推广到单位圆和右半平面去。§1 单位圆若 f(z)在|z|<1中有界解析,于是它在圆周|z|=ρ(ρ<1)上的几何平均(?)是(0,1)上的有界增加函数.记 s(f)=(?) I(ρ) (1)定理1 若函数 f(z)在|z|<1中有界解析,它在|z|<1中的零点全在实轴上,又若存在     

ON THE GENERALIZED POLYNOMIALS OF L. V. KANTOROVITCH AND THEIR ASYMPTOTIC BEHAVIORS

In this article we generahze the polynomials of Kantorovitch \({P_n}(f)\) . Let \({B_n}\) be a sequence of linear operators from C[a,b] into \({H_n}\), if \[f(t) \in L[a,b],F(u) = \int_a^u {f(t)dt} ,{A_n}(f(t),x) = \frac{d}{{dx}}{B_{n + 1}}(F(u),x)\], here \({B_n}\)satisfy\[\begin{array}{l} (a):{B_n}(1,x) \equiv 1,{B_n}(u,x) \equiv x;\(b):for{\kern 1pt} {\kern 1pt} g(u) \in C[a,b]{\kern 1pt} {\kern 1pt} we{\kern 1pt} {\kern 1pt} have{\kern 1pt} {\kern 1pt} {B_n}(g(u),b) = g(b). \end{array}\]. we call such \({A_n}(f)\) generalized polynomials of Kantorovitch (denoted by \({A_n}(f) \in K\) ). Let \[\begin{array}{l} {\varepsilon _n}({W^2};x)\mathop = \limits^{def} \mathop {\sup }\limits_{f \in {W^2}} \left| {{A_n}(f(t),x) - f(x) - f'(x)({A_n}(t,x) - x)} \right|,\{\varepsilon _n}{({W^2}{L^p})_{{L^p}}}\mathop = \limits^{def} \mathop {\sup }\limits_{f \in {W^2}{L^p}} {\left\| {{A_n}(f(t),x) - f(x) - f'(x)({A_n}(t,x) - x)} \right\|_p}. \end{array}\] We have proved the following results: Let An he a sequence of linear continuous operators of type \[C[a,b] \Rightarrow C[a,b],{D_n}(x,z)\mathop = \limits^{def} {A_n}(\left| {t - z} \right|,x) - \left| {x - z} \right| - ({A_n}(t,x) - x)Sgn(x - z),{A_n}(1,x) = 1\] then (1):\({\varepsilon _n}({W^2};x) = \frac{1}{2}\int_a^b {\left| {{D_n}(x,z)} \right|} dz\), (2): Moreover, if \({A_n}\) be a sequence of linear positive operators, then for \(\left[ {\begin{array}{*{20}{c}} {a \le x \le b}\{a \le z \le b} \end{array}} \right]\) ,we have \({D_n}(x,z) \ge 0\), and \({\varepsilon _n}({W^2};x) = \frac{1}{2}{A_n}({(t - x)^2},x)\). Let \({A_n}(f) \in K\) be a sequence of linear positive operators,\[{R_n}{(z)_L} = \frac{1}{2}\int_a^b {\left| {{D_n}(x,z)} \right|} dx\],then \[{R_n}{(z)_L} = \frac{1}{2}\left[ {{B_{n + 1}}({u^2},z) - {z^2}} \right]\] and \[{\varepsilon _n}{({W^2}L)_L}{\rm{ = }}\frac{1}{2}\left\| {{B_{n + 1}}({u^2},z) - {z^2}} \right\|\]. Let \[{g_n} = \frac{1}{2}\mathop {\max }\limits_{a \le x \le b} {A_n}({(t - x)^2},x),{h_n} = \frac{1}{2}\mathop {\max }\limits_{a \le z \le b} \left[ {{B_{n + 1}}({u^2},z) - {z^2}} \right],\] then \[{\varepsilon _n}{({W^2}{L^p})_{{L^p}}} \le {g_n}^{1 - \frac{1}{p}}{h_n}^{\frac{1}{p}}(1 < p < \infty ).\]     

ON THE PROBLEM OF NECESSARY CONDITIONS ENSURING UNIFORM CONVERGENCE OF KERNEL DENSITY ESTIMATES

Let X_1,…,X,be a sequence of p-dimensional iid.random vectors with a commondistribution F(x).Denote the kernel estimate of the probability density of F(if it exists)by_n(x)=n~(-1)h~_n(-p)K((x-X_i)/h_n)Suppose that there exists a measurable function g(x)and h_n>0,h_n→0 such thatlim sup丨f_n(x)-g(x)丨=0 a.s.Does F(x)have a uniformly continuous density function f(x)and f(x)=g(x)?This paperdeals with the problem and gives a sufficient and necessary condition for generalp-dimensional case.     

The completeness of a functional sequence

Let π_n(u) be a sequence of polynomials with a biorthogonal system, and let {? _n (z)} be functions defined in the singly connected domain D. We consider the problem of the completeness of the system $$A(z,\lambda _n ) = \sum\nolimits_{s = 0}^\infty {P_\mathfrak{s} } (z)\pi _s (\lambda _n ),n = 1,2,...,$$ in the class of functions F(z) having the representation $$F(z) = \sum\nolimits_{k = 0}^\infty d _k P_k (z).$$ .     

函数集的完全性

1.:敲g(x)篇〔一二,二]上之非降的有界缝差两数,业具有性鬓(K)s‘二一0,一。(:);f--:.,。g。尹(:)!d:一郁匕,(‘一”,”;dg)篇在〔一二,司上定羲业且满足修件:,一{户,(柳dg(·)}青<一,>l的可测蝮值函数族{f(幻}.封龄一徊乙“(一二,侧d刃中之子族凌B(幻},若由f(劣)(乙,(一二,二:dg),夕>1生+上夕q=1,及f--:ha”“’“““’一0纷{B(x)}之任何B(哟成立必滇致f(幻在〔一二,司上规乎虚虚等焚零则释{B(x)}在乙“(一二,侧dg)中完全. 函数族的完全性是舆函数横造的一些简题很有阴保的.徙【l]我们知道{e‘”}豁。是在乙,(一二,州dg),,>1,中完全的,…     

Conditions of convergence of boundary values of Cauchy type integrals

In a domain G bounded by a rectifiable Jordan curve γ let there be given a sequence of analytic functions {f_n(z)} representable by Cauchy-Lebesgue type integrals $$f_n (z) = \smallint _y \frac{{\omega _n (\zeta )}}{{\zeta - z}}d\zeta .$$ A theorem is established which enables one to determine from the convergence in measure of {ω_n(ζ)} on a set e ?γ whether or not there is convergence in measure on the same set of {f_n(ζ)}, the angular boundary values of the functionsf_n(z).     

随机狄里克莱级数的一些性质

本文研究随机狄里克莱级数的a.s.(几乎必然)收敛性和在a.s.收敛半平面内的a.s.增长性;为此,还研究了狄里克莱级数在收敛半平面内的增长性.这里推进了Valiron G.和Arnold L.的有关结果.文中还证明了在一定条件下,两类随机狄里克莱级数a.s.以其收敛轴上每一点为其Picard点或Borel(R)点.     

EXTREME POINTS AND SUPPORT POINTS OF A CLASS OF ANALYTIC FUNCTIONS

1IntroductionByAwedenotethespaceoffunctionsanalyticintheunitdisk.ThetopologyofAisdefinedtobethetoPologyofuniformconvergenceoncompartsubsetsoftheunitdisk.SupposethatFisacomPactsubsetofA,feF.IfthereexistsacontinuouslinearfunctionalJonA,satisfyingthatffeJisnon-constantonF,suchthatthenjiscalledasupportpointofr.ThesetofallsupportpointsofFisdenotedbysUppF.SupposethatUisasubsetofA'fEUiscalledanextremepointofUiffcannotbeexpressedasaproperconvexcombinationoftwodistinctelementsofU.Thesetbfalle…     

平面上具有有界Fréchet导数的调和映照单叶半径的精确估计

给定单位圆盘D={z||z|1}上调和映照f(z)=h(z)+g(z),其中h(z)和g(z)为D上的解析函数,满足f(0)=0,λf(0)=1,ΛfΛ.通过引入复参数λ,|λ|=1,本文研究调和映照Fλ(z)=h(z)+λg(z)和解析函数Gλ(z)=h(z)+λg(z)的性质,得到Fλ(z)和Gλ(z)单叶半径的精确估计.作为应用,本文得到单位圆盘D上某些K-拟正则调和映照Bloch常数的更好估计,改进和推广由Chen等人所得的相应结果.     

线性可移算子与可调和的随机过程

<正> §1.引言T.Onoyama 利用了 Weyl-Stone-Titchmarsh 的特征函数(Eigenfunction)展开公式,对具有二阶矩的实的连续机过程(本文中所用的极限,系指在均方意义下的极限)求得了下列隨机函数方程     

ON THE PROBLEM OF BEST CONVERGENCE RATES OF DENSITY ESTIMATES

Let X_1,…,X_n be iid samples drawn from an m-dimensional population with a probabilitydensity f,belonging to the family C_(ka),i.e.the family of all densities whose partialderivatives of order k are bounded by a.It is desired to estimate the value of f at somepredetermined point a,for example a=0.Farrell obtained some results concerning the bestpossible convergence rates for all estimator sequence,from which it follows,for example,thatthere exists no estimator sequence{γ_n(0)=γ_n(X_1,…,X_n,0)}such that(?)E_f[γ_n(0)-f(0)]~2=o(n~(-2k/(2k m))).This article pursues this problem further and proves that there existsno estimator sequence{γ_n(0)}such thatn~(-k/(2k m))(γ_n(0)-f(0))(?)0,for each f∈C_(ka),where(?)denotes convergence in probability.