On new classes of strongly Janowski type functions of complex order

We investigate some new subclasses of analytic functions of Janowski type of complex order.We also study inclusion properties,distortion theorems,coefficient bounds and radius of convexity of the functions.Moreover,analytic properties of these classes under certain integral operator are also discussed.Our findings are more comprehensive than the existing results in the literature.

The Growth Theorem for Strongly Starlike Mappings of Order α on Bounded Starlike Circular Domains

The authors obtain the growth and covering theorems for strongly starlike mappings of order α on bounded starlike circular domains.This kind of domain discussed is rather general,since the domain must be starlike if exists a normalized biholomorphic starlike mapping on it.

New Result for Strongly Starlike Functions

In this paper, using Salagean differential operator, we define and investigate a new subclass of univalent functions . We also establish a characterization property for functions belonging to the class .

Some Properties of Analytic Functions with the Fixed Second Coefficients

In this paper, we investigate some argument properties for analytic functions with fixed second coefficient and positive real part. And we apply the argument properties to the functions that are analytic and normalized. In particular, the order of strongly starlikeness of strongly convex functions with fixed second coefficients is given.

SPIRALLIKENESS CONDITIONS FOR ANALYTIC FUNCTIONS

Let α，β，γ and p be real,|a|<π/2,β>0,0≤p<1,and let f(z) be analytic in |z|<1 with f(0)=f'(0)-1=0.

Counterexamples Concerning Quasiconformal Extensions of Strongly Starlike Functions

M. Fait, J. Krzyz and J. Zygmunt proved that a strongly starlike function of order α on the unit disk can be extended to a k-quasiconformal mapping with k ≤ sin（απ/2） on the whole complex plane C which fixes the point at infinity. An open question is whether such a function can be extended to a k-quasiconformal mapping with k 〈α to the whole plane C. In this paper we will give a negative approach to the question.

α次星形函数族的Alexander变换和积分表示

研究了S*(α)族的Alexander变换,证明了S*(α)族经Alexander变换后仍是单叶的.此外,还给出了S*(α)族的一个积分表示式.

含Laplace算子的二阶椭圆偏微分方程的强惟一延拓性质

该文利用建立频率函数的方法,讨论了一类含Laplace算子的二阶椭圆偏微分方程的强惟一延拓性质.

取值于一类p－Banach空间上的绝对连续函数

讨论取值于ｐ－Ｂａｎａｃｈ空间的绝对连续函数，二级绝对连续函数及其Ｆｒｅｃｈｅｔ导数的积分，并给出取值于ｌｐ（Ｏ＜Ｐ≤１）的绝对连续函数的刻划．

复Banach空间上推广的Roper-Suffridge算子的性质

讨论复Banach空间上两类推广的Roper-Suffridge算子,证明该算子保持强β型螺形映照、强α次殆星映形照、α次强β型螺形映照及α次殆β型螺形映照的性质,并作为特殊情况包含了已有的结论.

Existence Results of Damped Second Order Impulsive Functional Differential Equations with Infinite Delay

Using the Monch fixed point theorem and progressive estimation method,we study the existence,uniqueness and regularity of mild solutions for damped second order impulsive functional differential equations with infinite delay in Banach spaces.The compactness assumption on associated family of operators and the impulsive term,some restrictive conditions on a priori estimation,noncompactness measure estimation and the impulsive term have not been used,our results are different from some known results.Finally,a noncompact semigroup example explains the obtained results.

ROPER-SUFFRIDGE EXTENSION OPERATOR ON A REINHARDT DOMAIN

Let pj ∈ N and pj≥ 1, j = 2, …, k, k ≥ 2 be a fixed positive integer. We introduce a Roper-Suffridge extension operator on the following Reinhardt domain ΩN ={z =（z1, z′2,…, z′k）′∈ C × C^n2×…× Cnk： ｜z1｜^2＋ ｜｜z2｜｜2^p2＋ … ＋ ｜｜zk ｜｜k^pk〈 1} given〈1} give by F（z）=（f（z1）＋f＇（z1）∑j=2 kPj（zj,（f＇（z1））1/p2 z2＇,…,（f＇（z1））1/pkzk＇）＇, where f is a normaljized biholomorphic function k（z） =（f（z1） ＋ f′（z1）=2 on the unit disc D, and for 2 ≤ j ≤ k, Pj ： C^nj→ C is a homogeneous polynomial of degree pj and zj =（zj1, …, zjnj）′∈ C^nj, nj ≥ 1, pj ≥ 1,｜｜zj｜｜j =（∑l=1 nj｜zjl｜^pj）1/pj. In this paper, some conditions for Pjare found under which the loperator p ｜zjl｜pj=1reserves the properties of almost starlikeness of order α, starlikeness of order αand strongly starlikeness of order α on ΩN, respectively.

关于β型螺形函数的一类子族

在单位圆盘D内引入β型螺形函数及其一类子族,同时研究了(1)函数族^Sαβ中函数f(z)与函数族S*(α)中函数g(z)的一个重要关系式,^Sαβ中函数f(z)二项系数的精确估计;(2)函数族S^αβ中函数f(z)的增长、掩盖定理.

特定域上推广的Roper-Suffridge算子的性质

讨论复Banach空间特定域上推广的Roper-Suffridge算子保持双全纯映照子族的性质,从定义出发证明推广后的算子在复Banach空间特定域上保持强β型螺形性及强α次殆星形性,进而得出推广后的算子在复Banach空间特定域上保持强星形性.所得结论为由复平面C中单位圆盘D上的强β型螺形映照、强α次殆星形映照及强星形映照来构造复Banach空间特定域上相应的映照提供了一种新的途径,从而对复Banach空间特定域上推广的Roper-Suffridge算子有了更进一步的认识.

关于解析函数的一些注记

设h(r,s,t)为定义在D(?)C^3上的复函数,通过限定h(r,s,t)的条件定义了函数类H_n(a),并利用其得到判断具有负实部函数的定理,给出其在微分方程方面的应用.

多复变数中两类双全纯映照子族之间的关系式

建立了复Banach空间单位球上α次殆星形映照(双全纯星形映照)族与强α次殆星形映照(强星形映照)族之间的关系式,与此同时也建立了n中有界星形圆形域上α次殆星形映照(双全纯星形映照)族与强α次殆星形映照(强星形映照)族之间的关系式.由此,易由多复变数的α次殆星形映照(双全纯星形映照)构造出强次殆星形映照(强星形映照).

关于β型螺形函数的一类子族的增长、掩盖定理和系数估计

在考虑零点阶数的情况下,研究了单位圆盘D上的β型螺形函数的一类子族^Sβα族的增长、掩盖性质以及系数估计,所得结果推广了一些已知结论.

星形函数的一个推广类的Fekete-Szeg不等式

设f(z)=z+a2z2+a3z3+…∈F(α,β),其中F(α,β)是一星形函数的推广类,对任意实参数λ,得到了|a3-λa22|的准确上界,其结论推广了一些已知结果。

高阶模糊函数的收敛性分析

本文讨论用于多项式相位信号参数估计的高阶模糊函数的收敛性质 .对于复高斯白噪声污染的时变振幅多项式相位信号 ,证明了其高阶模糊函数样本估计和相位多项式最高阶系数估计的强收敛性质 .特别地 ,对于常数振幅情形 ,得到了多项式系数估计的强收敛速度 .模拟实验证实了所得到的理论结果 .

关于星像函数类的一个新子类

本文引入了星像函数类Ｓ的一个新的子类ＳＴ（β，Ａ，Ｂ）．我们讨论了它的从属关系、星像阶数、积分表示定理、系数估计和Ｈａｄａｍａｒｄ乘积等，所得结果包含一些作者的相关工作为其特例，且得到一些新的结果。