微分方程f″+e^{az}f′+Q(z)f=F(z) 的复振荡

该文研究了线性微分方程f″+e^{az}f′+Q(z)f=F(z)的复振荡问题，其中Q(z)、F(z )( 0)是整函数，且σ(Q)=1,σ(F)<+∞,Q(z)=h(z)e^{bz},h(z)是多项式，b≠-1是复常数，那么上述线性微分方程的所有解f(z)满足~λ(f)=λ(f)=σ(f)=∞,~λ_2(f)=λ_2(f)=σ_2(f)=1.至多除去两个例外复数a及一个可能的有穷级例外解f_0(z)。     

The Equivalence of BMOA and VMOA on the Unit Ball of C n

１ＩｎｔｒｏｄｕｃｔｉｏｎＬｅｔＢｂｅｔｈｅｏｐｅｎｕｎｉｔｂａｌｉｎＣｎａｎｄＳｂｅｉｔｓｂｏｕｎｄａｒｙ．ＬｅｔσｂｅｔｈｅｒｏｔａｔｉｏｎｉｎｖａｒｉａｎｔｐｒｏｂａｂｉｌｉｔｙｍｅａｓｕｒｅｏｎＳ．Ｆｏｒζ∈Ｓａｎｄδ＞０,ｌｅｔＱ（ζ,δ）...     

Left conjugacy closed loops of nilpotency class two

Every LCC loop Q with Inn Q abelian is nilpotent class two. A loop Q of nilpotency class two is LCC ? L(x, y) = L(y, x) for all x, y ∈ Q ? ?/Z(Mlt Q) is abelian ? [x, y, z] = [x,z,y] for all x, y, z ∈ Q ? [x, y, z] = [xy, z][x, z]^?1 for all x, y, z ∈ Q. All nilpotent LCC loops of order p² are described, and some of their multiplication groups are computed.     

Non-real Zeros of Derivatives of Real Entire Functions and the Pólya-Wiman Conjectures

A function f is in the class $ V_2p $ iff $ f(z) = e^{-az^{2p+2}}g(z) $ where a S 0 and g is a constant multiple of a real entire function of genus h 2 p + 1 with only real zeros. The class $ U_2p $ is defined as follows: $ U_0 = V_0 $ , $ U_{2p} = V_{2p}-V_{2p-2} $ . Functions in the class $ U_{2p}^{*} $ are represented as $ g(z) = c(z)f(z) $ where $ f\in U_{2p} $ and c is a real polynomial with no real zeros. Every real entire function g , of finite order with at most finitely many non-real zeros satisfies $ g\in U_{2p}^{*} $ for a unique p . We show the exact number of non-real zeros of f" , for $ f\in U_{2p} $ , in terms of the number of non-real zeros of f' and a geometrical condition on the components of Im Q ( z ) > 0, where $ \displaystyle Q(z) = z-({f(z)}/{f'(z)}) $ . Further, for a subclass of $ f\in U_{2p} $ , we show necessary and sufficient conditions for f" to have exactly 2 p non-real zeros. For a subclass of $ U_{2p}^{*} $ we show that if f' has only real zeros, then f" has exactly 2 p non-real zeros. For $ f\in U_{2p}^{*} $ we show that 2 p is a lower bound for the number of non-real zeros of $ f^{(k)} $ for k S 2.     

Extensions of spaces of analytic functions via pointwise limits of bounded sequences and two integral operators on generalized Bloch spaces

In [2], operators $$P_\mu f(z):=-\frac{1}{(1-z)^{\mu+1}} \int \limits_1^z f(\zeta)(1-\zeta)^{\mu} \,d\zeta$$ P μ f ( z ) : = - 1 ( 1 - z ) μ + 1 ∫ 1 z f ( ζ ) ( 1 - ζ ) μ d ζ and $$Q_\mu f(z):=(1-z)^{\mu-1} \int\limits_0^z f(\zeta)(1-\zeta)^{-\mu} \,d \zeta\quad (z \in \mathbb{D})$$ Q μ f ( z ) : = ( 1 - z ) μ - 1 ∫ 0 z f ( ζ ) ( 1 - ζ ) - μ d ζ ( z ∈ D ) were investigated in the setting of the analytic Besov spaces B _p , 1 ≤ p ≤ ∞, and the little Bloch space B _∞,0. In particular, for X = B _p , 1 ≤ p < ∞, or X = B _∞,0, the spectra, essential spectra of P _μ , and Q _μ in ${\mathcal {L}(X),}$ L ( X ) , together with one sided analytic resolvents in the Fredholm regions of P _μ , and Q _μ were obtained along with an explicit strongly decomposable operator extending Q _μ and simultaneously lifting P _μ . In the current paper, we extend the spectral analysis to generalized Bloch spaces using a modification of a construction due to Aleman and Persson, [3].     

开拓劳宾生和戈鲁辛的几个定理

<正> 1.设 p 次对称函数(?)在单位圆|z|<1中是正则的单叶的,此种函数的全体成一函数族 S_p.当p=1时,简讯 S_1为 S.设ω=f(z)∈S_p 映照|z|<1于 W 面上时,其像关于原点成星形,此种 f(z)成 S_p 之一子族S_p.设 f(z)∈S_p,     

關於平均P葉函數

<正> §1.設函數f(z)=在單位圓|z|<1中是正則的;W表示w=f(z)將|z|>1照像到w平面上的黎曼面;以w(R)表示圓|w|≤R所掩蓋W的面積(重叠的黎曼面以重叠的次數計算)。若對任意的R>0,     

具有缺项系数的几类解析函数族的性质

S*表示所有在单位圆盘 D 内解析且满足条件 f(0)=f′ (0)-1=0的星形函数族, K 表示所有在 D内解析且满足条件 f(0)=f′ (0)-1=0 的凸函数族, P 表示所有在 D 内解析且满足条件p(0)=1, Rep(z)>0 的函数族. 设P_n={p(z): p(z)=1+a_nzⁿ+a_n+1zⁿ⁺¹+…∈ P}, S*_n={f (z): f(z)=z+a_nzⁿ+a_n+1zⁿ⁺¹+…∈ S*}, K_n={f (z): f (z)=z+a_nzⁿ+a_n+1zⁿ⁺¹+…∈ K}. L_Sn*={g(z)=ln f(z)/z, f ∈ S_n*}, 其中对数函数取使得ln1=0的那个单值解析分支. 该文研究了函数族S_n^*, K_n和L_Sn*的性质, 找出了解析函数族L_Sn*的极值点与支撑点,并对S*_n与K_n的极值点和支撑点作了一些探讨.     

Banach spaces of locally Schlicht functions with the Hornich operations

Let \(S_ \propto ( \propto \geqq 0)\) be the set of normalized (see (1.2)) functions f holomorphic in D:|z|<1 with \(f''(z)/f'(z) = 0((1 - \left| z \right|^2 )^{ - \propto } )\) , and let be the set of normalized (see (1.6)) functions f meromorphic in D with the Schwarzian derivative \(\left\{ {f,z} \right\} = 0((1 - \left| z \right|^2 )^{ - \propto } )\) . We shall show that some topological properties of \(S_ \propto\) and , and of subsets of them, follow from those of the weighted H^∞ space \(H_ \propto ^\infty\) , consisting of functions f holomorphic in D with \(f(z) = 0((1 - \left| z \right|^2 )^{ - \propto } )\) , and those of subsets of \(H_ \propto ^\infty\) . The set S₁ is denoted by X in [3] and [4].     

On the fourth and fifth coefficients of strongly starlike functions

For 0 < α ≤ 1, analytic functions f(z) = z + a₂z² + a₃z³ + … in the unit disk U are strongly starlike of order α if ¦arg {zf′ (z)/f(z)}¦ < πα / 2, z ∈ U. We find sharp estimates on the fourth and fifth coefficients of functions in this class.     

Landau problem for the class of functions that are regular in an annulus

The classical result of Landau, establishing the radius of the largest circle, in which, for any function f(z)R, where R is the class of regular functions w=f(z)=z+c₂z²+..., in¦z¦<1, ¦f(z)¦相似文献   

Factorization of a convolution-type operator

Three convolution-type equations are considered in the space of entire functions with topology ofd uniform convergence: $$\begin{gathered} M{_{\mu}{_1}} [f] \equiv \smallint _C f(z + t)d\mu _1 = 0, \hfill \\ M{_\mu{_1}} [f] \equiv \smallint _C f(z + t)d\mu _2 = 0, \hfill \\ M_\mu [f] \equiv \smallint _C f(z + t)d\mu = 0 \hfill \\ \end{gathered}$$ with respective characteristic functions L₁(λ), L₂(λ), L(λ)=L₁(λ)· L₂(λ), suppμ ?c, suppμ ₁ ?c, suppμ ₂ ?c. The necessary and sufficient conditions are found that every solutionf(z) of the equation M_μ[f[ can be written as a sumf ₁(z) +f ₂(z), wheref ₁(z) is the solution of the equation \(M{_\mu{_1}} [f] = 0\) ,f ₂(z) is the solution of the equation \(M{_\mu{_2}} [f] = 0\) .     

积分算子作用下的亚纯多叶函数

令∑_p表示形如f(z)=z~(-p)+∑m=1∞(p∈N={1,2,3…})且在去心单位开圆盘D=U\{0}={z∶z∈C且0|z|1}上解析的亚纯多叶函数类.利用一个作用在∑_p上的乘积算子定义了几个新的亚纯函数的子类,并考虑这些函数类在积分算子作用下的性质.     

Generalizations of girstmair’s formulas

In 1994 and 1995 GIRSTMAIR gave (relative) class number formulas for the imaginary quadratic field $\mathbb{Q}(\sqrt { - p} )$ , P an odd prime with p ≡ 3 (mod 4) and p ≥ 7, using the coefficients of the digit expression of 1/p and z/p, respectively, where z is an integer with 1 ≤ z ≤p - 1. We extend the formulas to an imaginary abelian number field.     

一类非齐次复微分方程解的增长性

研究了一类线性非齐次微分方程f(k)+ak-1f(k-1)+…+a1f-′(eQ(z)-a0)f=eQ(z)+F(z)解的增长性,其中aj(j=0,1,…,k-1)为常数,Q(z)为非常数多项式,F(z)为级小于deg Q的整函数.     

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)     

Bounded harmonic mappings

Denote by B(τ) the class of all complex functions of the form

Inequalities for the derivative of a polynomial

Let P(z) be a polynomial of degreen which does not vanish in ¦z¦ <k, wherek > 0. Fork ≤ 1, it is known that

$$\mathop {\max }\limits_{|z| = 1} |P'(z)| \leqslant \frac{n}{{1 + k^n }}\mathop {\max }\limits_{|z| = 1} |P(z)|$$

, provided ¦P’(z)¦ and ¦Q’(z)¦ become maximum at the same point on ¦z¦ = 1, where\(Q(z) = z^n \overline {P(1/\bar z)} \). In this paper we obtain certain refinements of this result. We also present a refinement of a generalization of the theorem of Tu?an.

     

The region of values of the system { f ( z 1),..., f ( z n )} in the class of typically real functions. III

The paper studies the region of values D_m,n(T) of the system {f(z₁), f(z₂),..., f(z_m), f(r₁), f(r₂),..., f(r_n)}, where m ≥ 1; n > 1; z_j, j = 1, ... m, are arbitrary fixed points of the disk U = {z: |z| < 1} with Im z_j ≠ 0, j = 1, 2, ..., m; r_j, 0 < r_j < 1, j = 1, 2, ..., n, are fixed; f ∈ T, and the class T consists of functions f(z) = z + c₂z² + ... regular in the disk U and satisfying the condition Im f(z) · Im z > 0 for Im z ≠= 0, z ∈ U. An algebraic characterization of the set D_m,n(T) in terms of nonnegative-definite Hermitian forms is provided, and all the boundary functions are described. As an implication, the region of values of f(z₁) in the subclass of functions f ∈ T with prescribed values f(r_j) (j = 1, 2, 3) is determined. Bibliography: 12 titles. Dedicated to the 100th anniversary of my father’s birthday __________ Translated from Zapiski Nauchnykh Seminarov POMI, Vol. 337, 2006, pp. 23–34.     

圆环上半纯的典型实照函数

<正> §1.引言1932年 Rogosinski 首先研究了单位圆 E:|z|<1内正则的典型实照函数,这种函数的全体成一函数族 T_r(E)假如 f(z)∈T_r(E),那末 f(z)=z+a_2z~2+…在|z|<1是正则的,且满足条件