关于I. Laine和杨重骏的一个问题

本文主要研究线性差分方程 $A_n(z)f(z+n)+\cdots+A_1(z)f(z+1)+A_0(z)f(z)=0$亚纯解的增长级.当上述方程的系数中没有起控制作用的系数时,我们给出了一些约束条件,得到了一些结果,所得结果部分回答了I. Laine和杨重骏的一个问题.     

关于方程f″+Af′+ Bf=0解的增长性,其中系数A是一个二阶线性微分方程的解

设A(z)是方程f″+P(z)f=0的非零解,其中P(z)是n次多项式,B(z)是一个超越整函数且满足ρ(B)≤1/2,那么方程f″+Af′+Bf =0的每一个非零解都是无穷级.并且方程f″+A(z)f=0两个线性无关解乘积的零点序列收敛指数为无穷.     

一类非线性复微分差分方程解的不存在性

该文研究了一类复微分差分方程[f(z)f′(z)]^n+f^m(z+η)=1,[f(z)f′(z)]n+[f(z+η)?f(z)]^m=1,[f(z)f′(z)]^2+P^2(z)f^2(z+η)=Q(z)e^α(z)的超越整函数解,其中P(z),Q(z)为非零多项式,α(z)为多项式,m,n为正整数,η∈C?{0},并给出了这类方程不存在超越整函数解的几个充分条件.     

On the Growth of Solutions of a Class of Higher Order Linear Differential Equations

In this paper, we investigate the growth of solutions of the differential equations f(k)+Ak?1(z)f(k?1)+· · ·+A0(z)f =0, where Aj(z)(j=0, · · · , k?1) are entire functions. When there exists some coe?cient As(z)(s ∈ {1, · · · , k?1}) being a nonzero solution of f00+P(z)f =0, where P(z) is a polynomial with degree n(≥1) and A0(z) satisfiesσ(A0)≤1/2 or its Taylor expansion is Fabry gap, we obtain that every nonzero solution of such equations is of infinite order.     

ON THE DEPENDENT PROPERTY OF SOLUTIONS FOR HIGHER ORDER PERIODIC DIFFERENTIAL EQUATIONS

This article investigates the property of linearly dependence of solutions f(z) and f(z 2πi)for higher order linear differential equations with entire periodic coefficients.     

Extremal problems in a subclass of entire functions of finite power

We study the subclass W_σ(A) of the class of entire transcendental functions f(z)of exponential type with index not greater than σ satisfying the condition $$\int_{ - \infty }^\infty {\left| {f(x)} \right|^2 dx \leqslant A^2 .}$$ We find the set of values of the quantities f(z), f′(z), etc. when z is fixed and f runs through the subclass W_σ(A). We study extremal values of functionals of the type Φ(f(z), f ′(z)). In particular, we obtain upper bounds on the quantities ¦f(z +β/2) ± f(z?β/2) ¦ and ¦af '(z) + bof(z)¦.     

Properties of Complex Oscillation of Solutions of a Class of Higher Order Linear Differential Equations

Let A(z) be an entire function with μ(A) 1/2 such that the equation f~((k))+A(z)f = 0, where k ≥ 2, has a solution f with λ(f) μ(A), and suppose that A_1 = A+h,where h■0 is an entire function with ρ(h) μ(A). Then g~((k))+ A_1(z)g = 0 does not have a solution g with λ(g) ∞.     

涉及整函数差分算子的唯一性定理

作者研究了关于有穷级整函数两个差分算子的分担值问题,证明了:令f(z)是满足λ(f-a(z))<ρ(f)的有穷级超越整函数,其中a(z)(∈S(f))是整函数且满足ρ(a(z))<1,并令η(∈C)是常数且满足△²_ηf(z)≠0.如果△²_ηf(z)和Δ_ηf(z)CM分担Δ_ηa(z),其中Δ_ηa(z)∈S(Δ²_ηf(z)),那么f(z)=a(z)+Be^Az,其中A,B是两个非零常数且a(z)退化为常数.     

周期微分方程的解生成的微分多项式与小函数的关系

该文研究了某类二阶非齐次周期微分方程的次正规解的存在性,解的增长性及振荡性.同时也研究了由上述方程的解生成的微分多项式L(f)=d_2f″+d_1f′+d_0f与小函数的关系,其中d_0(z),d_1(z),d_2(z)为整函数,不同时为0.     

The domain of regularity of the limit function of a sequence of analytic functions

Letf (z) be an entire function λ_n(n=0,1,2,...) complex numbers, such that the system f(λ_{n n=0} ^∞ is not complete in the circle ¦z¦n(z) have the form \(\sum\nolimits_{k = 0}^{p_n } {\alpha _{nk} } f(\lambda _k \cdot z)\) . We study the properties of the limit function of the sequence Q_n(z) in the case when $$f(z) = 1 + \sum\nolimits_{n = 1}^\infty {\frac{{z^n }}{{P(1)P(2)...P(n)}}} ,$$ . where P(z) is a polynomial having at least one negative integral root.     

On the dynamics of entire functions on the Julia set

Let f be an entire function and ?ⁿ its n-th iterate. Let P(?) denote the postcritical set of ? and J(?) the Julia set of ?. Suppose that the set E of all z ∈ J(?) with limsup_n→∞ dist (?ⁿ(z), P(?) U {∞}) > 0 has positive measure. It is proved that for a given set A ? ? of positive measure the set {n ∈ ?; ?ⁿ(z) ∈ A} is infinite for almost all z in the plane. From this follows that the forward orbit of almost all z ∈ ? is dense in the plane if E has positive measure.     

ON EXISTENCE OF SOLUTIONS OF DIFFERENCE RICCATI EQUATION

Consider the difference Riccati equation f(z+1) =(A(z)f(z)+B(z))/(C(z)f(z)+D(z)),where A,B, C,D are meromorphic functions, we give its solution family with one-parameter H(f(z))={f_0(z),f(z)=((f_1(z)-f_0(z))(f_2(z)-f_0(z)))/(Q(z)(f_2(z)-f_1(z))+(f_2(z)-f_0(z)))}, where Q(z) is any constant in C or any periodic meromorphic function with period 1, and f_0(z),f_1(z),f_2(z) are its three distinct meromorphic solutions.     

整函数及其差分的唯一性

设f是一个有穷级的超越整函数,a,b,c是3个有穷复数,满足c≠0,a≠b,且n为正整数.如果a是f的Borel例外值,且Δ_c~nf(z)与f(z)IM分担b,则f(z)=a+Ae~(Bz),其中A,B为两个非零常数.     

The convergence of padé approximants and the size of the power series coefficients

Let f be a power series ∑a_izⁱ with complex coefficients. The (n. n) Pade approximant to f is a rational function P/Q where P and Q are polynomials, Q(z) ? 0, of degree ≦ n such that f(z)Q(z)-P(z) = Az²ⁿ⁺¹ + higher degree terms. It is proved that if the coefficients a_i satisfy a certain growth condition, then a corresponding subsequence of the sequence of (n, n) Pade approximants converges to f in the region where the power series f converges, except on an exceptional set E having a certain Hausdorff measure 0. It is also proved that the result is best possible in the sense that we may have divergence on E. In particular,there exists an entire function f such that the sequence of (ny n) Pade approximants diverges everywhere (except at 0)     

一类无穷下级整函数的Julia集的径向分布

主要研究方程f"(z)+A(z)f'(z)+B(z)f(z)=0(A(z)),B(z)为整函数)的解、解的多项式或微分多项式这些具有无穷下级的整函数的Julia集的径向分布问题.     

整函数及其差分分担有限集的唯一性

研究了整函数及其差分多项式分担有限复数集的唯一性,得到了如下结果:设S_m={1,ω,…,ω~(m-1)},其中ω=cos(2π/m)+i sin(2π/m),c为非零有限复数,n(>5),m(≥2)均为正整数.如果f(z),g(z)为有限级整函数,满足E(S_m,f(z)~n(f(z)-1)f(z+c))=E(S_m,g(z)~n(g(z)-1))g(z+c)),那么f(z)≡g(z).     

Area of Julia sets of holomorphic self-maps onC *

It is a general problem to study the measure of Julia sets. There are a lot of results for rational and entire functions. In this note, we describe the measure of Julia set for some holomorphic self-maps onC ^*. We'll prove thatJ(f) has positive area, wheref:C ^*→C ^*,f(z)=z ^m c ^P(z)+Q(1/z) ,P(z) andQ(z) are monic polynomials of degreed, andm is an integer.     

复振荡理论中关于超级的角域分布

设f_1和f_2是微分方程f″+A(z)f=0的两个线性无关的解,其中A(z)是无穷级整函数且超级σ_2(A)=0．令E=f_1f_2．本文研究了微分方程f″+A(z)f=0的解在角域中的零点分布,得出E的超级为+∞的Borel方向与零点聚值线的关系．     

整函数与其差分算子分担集合的唯一性问题

考虑整函数与其差分算子分担集合的唯一性问题.假设S={ω:ω~n+aw~(n-1)+b=0},m,n为两个正整数满足n2且n和n一m互素,a和b为两个非零复数使得方程ω~n+aw~n+b=0无重根.设f为满足λ(f)ρ(f)∞的非常数整函数,若f(z)和△_cf(z)CM分担集合S,则f(z+c)≡2f(z).这个结果改进了李效敏的定理.     

与高阶导数有公共不动点的整函数

本文证明了如果f是非常数整函数满足超级σ_2(f)<1/2,k是一正整数,如果f和f(k)有公共不动点z CM,那么f~((k))(z)-z=c(f(z)-z),其中c是非零常数.