涉及例外函数与分担函数的正规族

设F是区域D内的一族亚纯函数,a(z),b(z),c(z)是区域D内三个判别的亚纯函数,其中一个可以恒为无穷,且对于任意z∈D,a(z)≠b(z),a(z)≠c(z),b(z)≠c(z),S={a(z),b(z),c(z)}.若对于任意两个函数f,g∈F,f与g在D内分担集合S,则F在D内正规.该结果推广了著名的Montel正规定则.     

涉及重级零点的亚纯函数的拟正规定则

设F为区域D内的只有重级零点的亚纯函数族,H(z)为区域D内的非常数亚纯函数,且存在v∈N,使得对于任意的a∈C,n(D,1/H(z)-a)≤v.如果对于任意的f∈F,f′(z)≠H′(z),那么F在区域D内v阶拟正规.     

一类全纯函数的正规性

研究了具有一定性质的全纯函数.设F是平面上区域D内的全纯函数族.如果对于任意的f∈F,都有f(z)=0 f'(z)=z j|f″(z)|≤c,其中c为常数且f(0)≠0,则F正规.     

与分担全纯函数相关的正规族

设F是在区域D内的一族亚纯函数,其零点重级至少为k,k是一个正整数,a(z)(≠0)在区域D内全纯.若对于任意的f∈F,有(1)f(z)与a(z)没有公共的零点;(2)f(z)=0f(k)(z)=a(z)■0|f~((k+1))(z)-a'(x)||a(z)|,则F在D内正规.     

涉及分担函数的正规定则

设k为正整数,M为正数;F为区域D内的亚纯函数族,且其零点重级至少为k;h为D内的亚纯函数(h(z)≠0,∞),且h(z)的极点重级至多为k.若对任意给定的函数f∈F,f与f~((k))分担0,且f~((k))(z)-h(z)=0?|f(z)|≥M,则F在D内正规.     

涉及微分多项式的正规定则 献给杨乐教授80华诞

本文研究一类微分多项式的正规定则,得到下面的结果.设F为区域D内的一族亚纯函数,k≥4为正整数, a(z)(■0)、a1(z)和b(z)为区域D内的全纯函数.若a(z)=0时, f (z)≠∞且对于F中的每一个函数f,有f′(z)+a_1(z)f(z)-a(z)f~k(z)≠b(z),则F在D内正规.     

涉及微分多项式的正规定则（英文）

本文获得如下结果：设φ（z)为区域G内一不恒为零的亚纯函数，a1(z),a2(z),．…，ak(z)为区域G内的全纯函数，F＝{f}为G内一亚纯函数族，若对每一f∈F，在G内恒有f(z)，f(z)≠0,f^(k)(z) a1(z)f^(f-1)(z) … ak(z)f(z)≠φ（z),且与φ（z)没有公共极点，则F在G内正规。     

分担值与正规族

设F是平面区域D上的亚纯函数族,a,b是两个有穷非零复数.如果(A)f∈F,f(z)=a(=)f(k)(z)=a,f(k)(z)=b(=)f(k+1)(z)=b,且f-a的零点重数至少为k(k≥3),那么函数族F在D内正规;当k=2时,在条件a≠4b的情况下,同样有函数族F在D内正规.     

与分担值相关的正规族

设F是一族平面区域D内的亚纯函数,a和b是两个满足a／b岳N＼{1}的有穷非零复数．如果每个函数f∈F都满足f（z）=a→f′（z）=a和f′（z）=b→f″（z）=b,那么函数族F在D内正规．构造了一个在单位圆内不正规的亚纯函数族,族中每个函数f在单位圆内满足f（z）=m＋1→←f′（z）=m＋1和f′（z）=1→←f″（z）=1,这里m是一个给定的正整数．     

亚纯函数的分担值与正规族

设k(≥2)为正整数,M为一个正数,h(z)为区域D内的一个全纯函数,h≠0,F为区域D内的一族亚纯函数,其中每个函数的零点重级至少为k+1,极点重级至少为2.若任意f∈F,f~((k))(z)=h(z)|f(z)|≥M,则F在D内正规.     

A Criterion of Normality Concerning Holomorphic Functions Whose Derivative Omit a Function II

The authors discuss the normality concerning holomorphic functions and get the following result. Let F be a family of functions holomorphic on a domain D ? ?, all of whose zeros have multiplicity at least k, where k ?? 2 is an integer. Let h(z) ? 0 and ?? be a meromorphic function on D. Assume that the following two conditions hold for every f ?? F: $$ \begin{gathered} (a)f(z) = 0 \Rightarrow |f^{(k)} (z)| < |h(z)|. \hfill \\ (b)f^{(k)} (z) \ne h(z). \hfill \\ \end{gathered} $$ Then F is normal on D.     

A FUNDAMENTAL INEQUALITY AND ITS APPLICATION

Let f(z) be meromorphie in |z|k+4+[2/k].In this note,a fundamental inequality is established such that thecharacreristic function T(r,f)can be limibd by N(r,1/f)and _(τ-1)(r,1/(f~(k)-1).As anapplication,the following criterion for normality is also proved:Let be a family ofmeromorphic functions in a region D.If for every f(z)∈ ,f(z)≠0 and all the zeros off~(k)(z)-1 are of multiplicity >k+4+[2/k]in D,then is normal there.     

亚纯函数与其微分多项式的分担函数与正规族

设${\cal F}$为开平面内的区域$D$上的亚纯函数族, ${\cal F}$中任何函数$f(z)\in{\cal F}$, $f$的零点竽数至少为$k+1$.对于$D$内不等于零的解析函数$a(z)$.若$f(z)$与其微分多项式$D(f)$ IM分担$a(z)$,本文不仅得到${\cal F}$在$D$上正规, 而且得到相应于正规函数的结果.     

涉及导数的一类全纯函数的正规族

主要使用Zalcman引理来研究全纯函数的正规族,得到了如下的结论:令F为|z|<1内的一族全纯函数,n是一个正整数,a,b是两个复数且满足a≠0,∞,b≠∞.若F满足:Ⅰ)■f∈F,如f有零点,则f的零点重级大于等于3;和Ⅱ)当n≥4时,对F的每一对函数G和H,G″-aG~(n,)与H″-aH~n分担b.则F在|z|<1内正规.     

关于杨乐及Schwick的一结果

设ψ■0为复平面区域D内的只有单零点的全纯函数,k为正整数,F为区域D内的亚纯函数族.如果每个f∈F满足f≠0且只有重极点;对F内任一组函数f与g,f(k)与g(k)在D内分担ψ(z),则F在D内正规.     

限制零点个数的亚纯函数的正规定则

设k,n(≥k+1)是两个正整数,a(≠0),b是两个有穷复数,F为区域D内的一族亚纯函数.如果对于任意的f∈F,f的零点重级大于等于k+1,并且在D内满足f+a[L(f)]~n-b至多有n-k-1个判别的零点,那么F在D内正规·这里L(f)=f~((k))(z)+a_1f~((k-1))(z)+…+a_(k-1)f'(z)+a_kf(z),其中a_1(z),a_2(z),…,a_k(z)是区域D上的全纯函数.     

正规定则与重值

设■为区域D内的一亚纯函数族,ψ(≠0)为D内的全纯函数,k为正整数.如果对每个f∈■,有f(z)≠0,f~((k))(z)≠0及f~((k))(z)-ψ(z)的零点重级至少为(k+2)/k,则     

Normality concerning shared values

Let be a family of meromorphic functions in a plane domain D, and a and b be finite non-zero complex values such that . If for and , then is normal. We also construct a non-normal family of meromorphic functions in the unit disk Δ={|z|<1} such that for every and in Δ, where m is a given positive integer. This answers Problem 5.1 in the works of Gu, Pang and Fang. This work was supported by National Natural Science Foundation of China (Grant Nos. 10671093, 10871094) and the Natural Science Foundation of Universities of Jiangsu Province of China (Grant No. 08KJB110001), the Qing Lan Project of Jiangsu, China and the Scientific Research Foundation for the Returned Overseas Chinese Scholars, State Education Ministry     

Functions of class II

We consider the class II of operator functions f(z), meromorphic for ¦z¦1, which admit a representation in the form f(z)=f ₂ ^–1 (z)f₁(z), where f₁(z) is an operatorvalued holomorphic function and f₂(z) a scalar-valued bounded holomorphic function, such that the strong limits and coincide a.e. on the unit circle ¦¦=1. We prove that any function of class II can be represented as a block of some J-inner function of class II. We describe all such representations. The results found are applied to the question of realizations of functions of class II as transfer functions of linear systems.Translated from Zapiski Nauchnykh Seminarov Leningradskogo Otdeleniya Matematicheskogo Instituta.im. V. A. Steklova AN SSSR, Vol. 135, pp. 5–30, 1984.