复齐性有界域的全纯自同构群的显式

熟知最大连通全纯自同构群Aut(D)(0)是三角群T(D)和复齐性有界域D中一固定点的最大连通迷向子群Iso(D)(0)的半直乘积,而且任一复齐性有界域都全纯同构于正规Siegel域D(V_N,F)．本文给出T(D(V_N,F))和Iso(D(V_N,F))(0)中全纯自同构的明显表达式,其中G(0)是Lie群G的单位连通分支．     

多复变数完全拟凸映射的分解定理

设Ω1(∪) Cn1,Ω2(∪)Cn2为凸的Reinhardt域,f(z,w)=(f1(z,w),f2(z,w))′为Ω1×Ω2上的正规化全纯映射.本文证明f为Ω1×Ω2上的正规化双全纯完全拟凸映射当且仅当f(z,w)=(Φ1(z),Φ2(W))′,其中ΦjΩj→Cnj是Ωj(j=1,2)上的正规化双全纯完全拟凸映射.     

多复变数完全拟凸映射的分解定理

设Ω_1C~(n1),Ω_2C~(n2)为凸的Reinhardt域,f(z,w)=(f1(z,w),f2(z,w))'为Ω_1×Ω_2上的正规化全纯映射.本文证明f为Ω_1×Ω_2上的正规化双全纯完全拟凸映射当且仅当 f(z,w)=(Φ_1(z),Φ_2(w))'其中φj:Ωj→C~(nj)是Ωj(j=1,2)上的正规化双全纯完全拟凸映射。     

"有关代数微分方程的Gackstatter和Laine的猜测"的补充

§ 1.　Introduction　　Inthispaperwewillconsidertheproblemoftheformofalgebraicdifferentialequationwithadmissiblemeromorphicsolution[Ω1 (z ,w) /Ω2 (z ,w) ] m =∑nj=0aj(z)wj,(1 )whereΩ1 (z,w) =∑(i)a(i) (z)wi0 (w′) i1… (w(n) ) in,Ω2 (z,w) =∑( j)b( j) (z)wj0 (w′) j1… (w(n) ) jn,(i) ,(j)arefiniteindexsets,{ai(z) } ,{a(i) (z) }and {a(i) (z) }aremeromorphicfunctions,T(r,a(i) ) =o(T(r,w) ) ,T(r,ai) =o(T(r ,w) ) ,T(r,b(j) ) =o(T(r ,w) ) .Letw(z)beameromorphicsolutionof (1 ) .Ifw(z)satisfies…     

超Cartan域上的积分表示

目的是研究第一类超Cartan域{(w,z) ||w|2 相似文献   

单位园内的正规族

对于单位园D={|Z|<1}内的全纯函数族F,有一个熟知的Miranda定则:若对任一f∈F都有:f(z)≠0,f~(k)(z)≠1(k为某一正整数),则F在D内是正规的。本文旨在引进广义Borel例外值等概念,给出相应的更普遍的正规定则。定义:设f(z)是D={|z|<1}内的全纯函数,a为一复数,若:     

THE EXTREME POINTS OF A CLASS OF ANALYTIC FUNCTIONS WITH POSITIVE REAL PART AND A PRESCRIBED SET OF VALUES

Letζ =(0,z1,z2,···,zn) with |zj|<1for1≤j≤n,ω=(1,w1,w2,···,wn),and P(ζ,ω) denote the set of functions p(z) that are analytic in D={z:|z|<1} and satisfy Rep(z)>0(|z|<1),p(0)=1,p(zj)=wj,j=1,2,···,n.In this article we investigate the extreme points of P(ζ,ω).     

The Schwarz-Pick lemma for planar harmonic mappings

The classical Schwarz-Pick lemma for holomorphic mappings is generalized to planar harmonic mappings of the unit disk D completely. (I) For any 0 < r < 1 and 0 ρ < 1, the author constructs a closed convex domain Er,ρ such that F((z,r))  eiαEr,ρ = {eiαz : z ∈ Er,ρ} holds for every z ∈ D, w = ρeiα and harmonic mapping F with F(D)D and F(z) = w, where △(z,r) is the pseudo-disk of center z and pseudo-radius r; conversely, for every z ∈ D, w = ρeiα and w ∈ eiαEr,ρ, there exists a harmonic mapping F such that ...     

一类Reinhardt域的Bergman核函数零点的边界性质

本文研究了形如E_p={(ω,z)∈C~(1+n):|ω|~(2p)+‖z‖~21}p∈R~+的一类Reinhardt域,并针对非陆启铿域E_p探讨其Bergman核函数零点的边界性质,即给出了域E_p×E_p的不同类型边界的邻域内是否存在Bergman核函数零点的判别方法.     

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 × Cn2×···× Cnk: |z1|2+ ||z2||p22+ ··· + ||zk ||pk k 1} given11 by F P′j(zj),(f(z1))p2 z′2, ···,(f′(z1))pk z′k)′, 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 : Cnj-→ C is a homogeneous polynomial of degree pj and zj =(zj1, ···, zjnj)′∈ Cnj, nj ≥ 1, pj ≥ 1,nj1||zj ||j =()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.     

Some existence and nonexistence theorems for compact graphs of constant mean curvature with boundary in parallel planes

Given H≥0 and bounded convex curves α₁, ...,⇌_n, α in the plane z=0 bounding domains D₁, …, D_n, D, respectively, with if i ∈ j and with D_i ⊂ D, we obtain several results proving the existence of a constanth depending only on H and on the geometry of the curves α_i, α such that the Dirichlet problem for the constant mean curvature H equation: where may accept or not a solution.     

WA Contractions

The problem of unitary -dilation can be generalized by Langer [9, p.55] as follows: Let A be a positive linear operator on a Hilbert space H, 0 < mI A MI, and C_A = {T : QTⁿQ = P_HUⁿ|_H(n = 1,2,3,...) where Q = A^-1/2 and U is a unitary on some Hilbert space H₁ H}. Then T C_A if and only if T satisfies the condition: A + 2Re z(I - A)T + |z|²T*(A - 2I)T 0. Using the above generalization, we have a block-matrix criterion for an element in C_A as follows: T C_A if and only if P(A,z,T,n) 0(n = 1,2,3,...) [Theorem 2.5]. We define the operator radii w_A(.) by w_A(T) = inf;{r>0 : T/r C_A}. Applying the block-matrix criterion, we give some fundamental properties for w_A(.) and extend some earlier results involving operator radii w(.)( > 0) in Fong and Holbrook (1983), Haagerup and de la Harpe (1992), Holbrook (1968), Holbrook (1969) and Holbrook (1971) to the case of w_A(.). We have the equalities and . Inequalities involving completely bounded linear maps on unital C*-algebras are also provided [Theorem 4.5].     

Rates of convergence for the stability of large order statistics

Forr1 and eachnr, letM _nr be therth largest ofX ₁,X ₂, ...,X _n , where {X _n ,n1} is an i.i.d. sequence. Necessary and sufficient conditions are presented for the convergence of for all >0 and some –1, where {a _n } is a real sequence. Furthermore, it is shown that this series converges for all >–1, allr1 and all >0 if it converges for some >–1, somer1 and all >0.     

Descriptions of exceptional sets in the circles for functions from the Bergman space

Let D be a domain in $\mathbb{C}^2 $ . For w ∈ $\mathbb{C}$ , let D_w=\{z \in $\mathbb{C}$ \, \vert \, (z,w)\in D\}. If f is a holomorphic and square-integrable function in D, then the set E(D, f) of all w such that f(., w) is not square-integrable in D _w is of measure zero. We call this set the exceptional set for f. In this note we prove that for every 0 < r < 1, and every G _δ-subset E of the circle C(0,r)=\{z \in $\mathbb{C}$ \, \vert \, \vert z \vert = r \},there exists a holomorphic square-integrable function f in the unit ball B in $\mathbb{C}$ ² such that E(B, f) = E.     

Every Biregular Function Is a Biholomorphic Map

We study Fueter-biregular functions of one quaternionic variable. We consider left-regular functions in the kernel of the Cauchy–Riemann operator

Extraction of subsystems “Majorized” by the rademacher system

In this paper it is proved that from any uniformly bounded orthonormal system {f _n} _n=1 ^∞ of random variables defined on the probability space (Ω, ε, P), one can extract a subsystem {fni} _i ^{Emphasis>=1/∞} majorized in distribution by the Rademacher system on [0, 1]. This means that {

Bergman type operators on a class of weakly pseudoconvex domains

A necessary and sufficient condition for the boundedness of the operator: $(T_{s,u,u} f)(\xi ) = h^{u + \tfrac{v}{a}} (\xi )\smallint _{\Omega _a } h^s (\xi ')K_{s,u,v} (\xi ,\xi ')f(\xi ')dv(\xi ') on L^p (\Omega _a ,dv_\lambda ),1< p< \infty $ , is obtained, where $\Omega _a = \left\{ {\xi = (z,w) \in \mathbb{C}^{n + m} :z \in \mathbb{C}^n ,w \in \mathbb{C}^m ,|z|^2 + |w|^{2/a}< 1} \right\},h(\xi ) = (1 - |z|^2 )^a - |w|^2 $ andK _x,u,v (ξ,ξ′).This generalizes the works in literature from the unit ball or unit disc to the weakly pseudoconvex domain ω _a . As an appli cation, it is proved thatf?L _H ^p (ω _a ,dv _λ) implies $h\tfrac{{|a|}}{a} + |\beta |(\xi )D_2^a D_z^\beta f \in L^p (\Omega _a ,dv_\lambda ),1 \leqslant p< \infty $ , for any multi-indexa=(α₁,?,α _n and ß = (ß₁, —ß). An interesting question is whether the converse holds.     

Fine Properties of the Integrated Density of States and a Quantitative Separation Property of the Dirichlet Eigenvalues

We consider one-dimensional difference Schr?dinger equations with real analytic function V(x). Suppose V(x) is a small perturbation of a trigonometric polynomial V ₀(x) of degree k ₀, and assume positive Lyapunov exponents and Diophantine ω. We prove that the integrated density of states is H?lder continuous for any k > 0. Moreover, we show that is absolutely continuous for a.e. ω. Our approach is via finite volume bounds. I.e., we study the eigenvalues of the problem on a finite interval [1, N] with Dirichlet boundary conditions. Then the averaged number of these Dirichlet eigenvalues which fall into an interval , does not exceed , k > 0. Moreover, for , this averaged number does not exceed exp , for any . For the integrated density of states of the problem this implies that for any . To investigate the distribution of the Dirichlet eigenvalues of on a finite interval [1, N] we study the distribution of the zeros of the characteristic determinants with complexified phase x, and frozen ω, E. We prove equidistribution of these zeros in some annulus and show also that no more than 2k ₀ of them fall into any disk of radius exp. In addition, we obtain the lower bound (with δ > 0 arbitrary) for the separation of the eigenvalues of the Dirichlet eigenvalues over the interval [0, N]. This necessarily requires the removal of a small set of energies. Received: February 2006, Accepted: December 2007     

Boundary functions on a bounded balanced domain

We solve the following Dirichlet problem on the bounded balanced domain with some additional properties: For p > 0 and a positive lower semi-continuous function u on ∂Ω with u(z) = u(λ z) for |λ| = 1, z ∈ ∂Ω we construct a holomorphic function f ∈ (Ω) such that for z ∈ ∂Ω, where = {λ ∈ ℂ: |λ| < 1}.