On Multivalent Functions with Negative and Missing Coefficients

Let P_k(p, A, B) be the class of functions f(z) = z~p-sum from n=k to ∞(|α_(n+′p|Z~((n+)~-)p) k≥2 analytic in the unit disc E={z:|z|<1} and satisfying the condition |(zf′(z)/f(z)-p)/(Ap-Bzf (z)/f(z))|<1. for z∈E and -1≤B相似文献   

Self-maps of p-local infinite projective spaces

Denote by Z (p) (resp.Z p ) the p localization (resp.p completion) of Z.Then we have the canonical inclusion Z (p) → Z p .Let S 2n-1 (p) be the p-local (2n-1)-sphere and let B 2n (p) be a connected p-local space satisfying S 2n-1 (p) ～= ΩB 2n (p) ;then H - (B 2n (p) ,Z (p) ) = Z (p) [u] with |u| = 2n.Define the degree of a self-map f of B 2n (p) to be k ∈ Z (p) such that f *(u) = ku.Using the theory of integer-valued polynomials we show that there exists a self-map of B 2n (p) of degree k if and only if k is an n-th power in Z p .     

关于亚纯多叶函数的子类

本文引进单位圆盘内以原点为p级极点的亚纯多叶函数的新子类M_p(n,λ,A,B) (p是正整数,n是非负整数,-1≤B＜A≤1,-π/2＜λ＜π/2,证明M_p(n+1,λ,A,B)?M_p(n,λ,A,B),研究类中函数的积分变换,得到准确的系数估计和一个卷积性质.     

也谈“广义吉祥数”的计数问题

文[1]将自然数a的吉祥数意义推广为:如果a的各位数字之和等于m(m∈N ),那么称a为“广义吉祥数”,进而就所有不超过n 1位的各位数字之和为m的“广义吉祥数”的个数(记作A(n 1,m))的计数问题,给出如下4个定理:定理1当1≤m≤9,m∈Z,n≥0,n∈Z时,A(n 1,m)=Cnn m.定理2当10≤n≤19,m∈Z,n≥0,n∈Z时,A(n 1,m)=Cnn m-(n 1)Cnn m-10.定理3当9|m且0≤n<9m-1或9m且0≤n<[9m](m≥1,n∈Z,n≥0,n∈Z)时,A(n 1,m)=0.定理4当9|m且n≥9m-1或9m且n≥[9m](m≥1,m∈Z,n≥0,m∈Z)时,A(n 1,m)=∑[1m0]i=0(-1)iCni 1Cnn m-10i.本文也给出并证明该问题的一…     

一类平面自仿射tiles的边界

考虑由扩张矩阵A=(?)及数字集D=(?):0≤i≤|p|-1,O≤j≤|q|一1(?)生成的自仿射tiles集T=T(A,D),其中p,q∈Z,|p|≥2,|q|≥2,通过对T中的元素进行分析,得到了计算T的边界的方法.     

争鸣

问题103已知条件p:x2 ax 1≤0,条件q:x2-3x 2≤0.若条件p是条件q的充分但不必要条件,求实数a的取值范围.令A={x|x2 ax 1≤0},B={x|x2-3x 2≤0}.根据条件p是条件q的充分但不必要条件可知,集合A是集合B的一个真子集.观点1认为A B且A可以等于空集.据此解得实数a的取值范围是-2≤a<     

Some Generalization for an Operator Which Preserving Inequalities Between Polynomials

For a polynomial p(z) of degree n which has no zeros in |z| 1, Dewan et al.,(K. K. Dewan and Sunil Hans, Generalization of certain well known polynomial inequalities, J. Math. Anal. Appl., 363(2010), 38–41) established zp′(z) +nβ2p(z) ≤n2{( β2 + 1+β2)max|z|=1|p(z)|-( 1+β2- β2)min|z|=1|p(z)|},for any complex number β with |β|≤ 1 and |z| = 1. In this paper we consider the operator B, which carries a polynomial p(z) into B[ p(z)] := λ0p(z) + λ1(nz2)p′(z)1!+ λ2(nz2)2 p′′(z)2!,where λ0, λ1, and λ2are such that all the zeros of u(z) = λ0+c(n,1)λ1z+c(n,2)λ2z2lie in the half plane |z| ≤ |z-n/2|. By using the operator B, we present a generalization of result of Dewan. Our result generalizes certain well-known polynomial inequalities.     

On extremal properties for the polar derivative of polynomials

If p(z) is a polynomial of degree n having all its zeros on |z| = k, k ≤ 1, then it is proved[5] that max |z|=1 |p′(z)| ≤ kn1n + kn m|z|=ax1 |p(z)|. In this paper, we generalize the above inequality by extending it to the polar derivative of a polynomial of the type p(z) = cnzn + ∑n j=μ cn jzn j, 1 ≤μ≤ n. We also obtain certain new inequalities concerning the maximum modulus of a polynomial with restricted zeros.     

关于正定厄米特矩阵的一个不等式的推广

本文推广了正定厄米特矩阵的一个不等式 ,得到以下结果 :设 A( i) ,B( i) ,… ,C( i) ( i=1 ,2 ,… ,m)都是 n阶正定厄米特矩阵 ,A( i)11,B( i)11,… ,C( i)11为其相应矩阵的 k阶顺序主子阵 ,1≤ k≤ n-1 ,α,β,… ,γ都是正实数 ,且 α+β+… +γ=p≥ 1 ,则有∑mi=1|A( i) |α|A( i)11|α,|B( i) |β|B( i)11|β… |C( i) |γ|C( i)11|γ) <∑mi=1A( i) α∑mi=1A( i)11α.∑mi=1B( i) β∑mi=1B( i)11β…∑mi=1C( i) γ∑mi=1C( i)11γ     

The automorphism group of a generalized extraspecial p-group

In this paper, the automorphism group of a generalized extraspecial p-group G is determined, where p is a prime number. Assume that |G| = p 2n+m and |ζG| = p m , where n 1 and m 2. (1) When p is odd, let Aut G G = {α∈ AutG | α acts trivially on G }. Then Aut G G⊿AutG and AutG/Aut G G≌Z p-1 . Furthermore, (i) If G is of exponent p m , then Aut G G/InnG≌Sp(2n, p) × Z p m-1 . (ii) If G is of exponent p m+1 , then Aut G G/InnG≌ (K Sp(2n-2, p))×Z p m-1 , where K is an extraspecial p-group of order p 2n-1 . In particular, Aut G G/InnG≌ Z p × Z p m-1 when n = 1. (2) When p = 2, then, (i) If G is of exponent 2 m , then AutG≌ Sp(2n, 2) × Z 2 × Z 2 m-2 . In particular, when n = 1, |AutG| = 3 · 2 m+2 . None of the Sylow subgroups of AutG is normal, and each of the Sylow 2-subgroups of AutG is isomorphic to H K, where H = Z 2 × Z 2 × Z 2 × Z 2 m-2 , K = Z 2 . (ii) If G is of exponent 2 m+1 , then AutG≌ (I Sp(2n-2, 2)) × Z 2 × Z 2 m-2 , where I is an elementary abelian 2-group of order 2 2n-1 . In particular, when n = 1, |AutG| = 2 m+2 and AutG≌ H K, where H = Z 2 × Z 2 × Z 2 m-1 , K = Z 2 .