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本文引入了Lie球双曲空间上映照族Hm(RIV(n)),满足m阶Jacobi行列式为零的全纯映照子族.而且当m趋于无穷时,该映照族就是RIV(n)上的局部双全纯映照族.作者用分析的方法给出了Hm(RIV(n))上的偏差定理.当m=1和m→+∞时,结果分别都回到了Gong关于Lie球RIV(n)上的偏差定理;当n=1,其结果又回到了Liu和Minda在单位圆盘上的偏差定理.本文的方法也不同于以前.作为偏差定理的一个应用,给出了不同映照族Hm(RIV(n))上的Bloch常数估计. 相似文献
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一类多复变全纯映照子族的增长和偏差定理 总被引:1,自引:0,他引:1
在一般复Banach空间X中的单位球B上引入一类全纯映照族M_g.考虑B上满足条件(Df(x))~(-1)f(x)∈M_g的正规化局部双全纯映照f(x)(其中x=0是f(x)-x的k+1阶零点)并得到其增长定理.作为应用,也得到了C~n中单位多圆柱D~n上映照f关于Jacobi矩阵Jf(z)的偏差定理,该结果统一和推广了星形映照许多子族的相应结论. 相似文献
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两类螺形映照扩充子族的偏差上界估计 总被引:1,自引:1,他引:0
偏差估计一直是多复变函数论的研究热点之一.但目前螺形映照扩充子族的偏差估计的研究成果还较少.针对这一问题,研究了复向量空间C_n中开单位球B_n,复Banach空间中单位球B和域Ω_(p_1,…,p_n)上一类α次β型,α次强β型螺形映照的偏差估计问题.利用不等式、矩阵及两类映照的增长定理等方法,获得了上述域上的两种映照的偏差上界估计,所得结果推广了一些已知的结论. 相似文献
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在一般复Banach空间的单位球上引入正规化全纯映照族Mg,考虑满足条件(Df(x))-f(x)∈M9的正规化局部双全纯映照f(其中x=0是f(x)-x的k+1阶零点)并得到其增长和掩盖定理.所得结果统一和推广了许多已知结论. 相似文献
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本文对复变数几何函数论的结果向多复变函数的推广进行了系统的研究,是作者及其合作者们在此项研究工作上的一些成果的综合报导。此文集中讨论了有界对称域及Reinhardt域的情形,讨论了全纯映照为星形、凸及双全纯的种种条件,建立了一些双全纯映照族的偏差定理,增长定理及掩盖定理,定义了高维空间上的Schwartz导数。对有界对称域上的全纯凸函数的Bloch常数进行了估计,处理这些问题的主要工具之一为李代数 相似文献
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杨善双 《数学年刊A辑(中文版)》1987,(6)
本文首先建立了空间环域的两个模偏差定理,其中定理1是平面上相应结果的空间形式,定理2则是文[1]中定理2的加强,然后,利用定理2对三维空间的Grtzsch型区域函数φ_(a(α))的渐近常数进行估计,得到9.1942…<λ_3<9.9903,改进了已知的结果,最后,把这些结果推广到任意n维空间的情形。 相似文献
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首先建立了C~n中单位多圆柱上一类近于凸映照子族精确的偏差定理,同时在复Banach空间单位球上也建立了该类映照精确的偏差定理的下界估计.其次在复Banach空间单位球上建立了准星形映照精确的偏差定理.所得结果将单复变中近于凸函数和星形函数的偏差定理推广至高维情形,并且对龚升提出的一个公开问题给出肯定的回答. 相似文献
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近于凸映照子族全部项齐次展开式的精确估计 总被引:1,自引:0,他引:1
本文建立了Cn中单位多圆柱上近于凸映照子族和一类近于准凸映照全部项齐次展开式的精确估计.与此同时,作为推论给出了Cn中单位多圆柱上近于凸映照子族和一类近于准凸映照精确的增长定理和精确的偏差定理上界估计.所得主要结论表明Cn中单位多圆柱上关于近于凸映照子族和一类近于准凸映照的Bieberbach猜想成立,而且与单复变数的经典结论相一致. 相似文献
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In this paper, we give a definition of Bloch mappings defined in the unit polydisk D
n
, which generalizes the concept of Bloch functions defined in the unit disk D. It is known that Bloch theorem fails unless we have some restrictive assumption on holomorphic mappings in several complex
variables. We shall establish the corresponding distortion theorems for subfamilies β(K) and β
loc(K) of Bloch mappings defined in the polydisk D
n
, which extend the distortion theorems of Liu and Minda to higher dimensions. As an application, we obtain lower and upper
bounds of Bloch constants for various subfamilies of Bloch mappings defined in D
n
. In particular, our results reduce to the classical results of Ahlfors and Landau when n = 1.
This work was supported by the National Natural Science Foundation of China (Grant No. 10571164) and Specialized Research
Fund for the Doctoral Program of Higher Education (SRFDP) (Grant No. 20050358052) 相似文献
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In this article, we establish distortion theorems for some various subfamilies of Bloch mappings defined in the unit polydisc Dn with critical points, which extend the results of Liu and Minda to higher dimensions. We obtain lower bounds of |det (f'(z))| and ? det (f'(z)) for Bloch mapping f. As an application, some lower and upper bounds of Bloch constants for the subfamilies of holomorphic mappings are given. 相似文献
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In this paper, the authors establish distortion theorems for various subfamilies Hk(B) of holomorphic mappings defined in the unit ball in Cn with critical points, where k is any positive integer. In particular, the distortion theorem for locally biholomorphic mappings is obtained when k tends to oo. These distortion theorems give lower bound son det f(z) and Redet f'(z). As an application of these distortion theorems, the authors give lower and upper bounds of Bloch constants for the subfamilies βk (M) of holomorphic mappings. Moreover, these distortion theorems are sharp. When B is the unit disk in C, these theorems reduce to the results of Liu and Minda. A new distortion result of Re det f'(z) for locally biholomorphic mappings is also obtained. 相似文献
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In this paper, we introduce the subfamilies H
m
($
\mathcal{R}_{IV}
$
\mathcal{R}_{IV}
(n)) of holomorphic mappings defined on the Lie ball $
\mathcal{R}_{IV}
$
\mathcal{R}_{IV}
(n) which reduce to the family of holomorphic mappings and the family of locally biholomorphic mappings when m = 1 and m → +∞, respectively. Various distortion theorems for holomophic mappings H
m
($
\mathcal{R}_{IV}
$
\mathcal{R}_{IV}
(n)) are established. The distortion theorems coincide with Liu and Minda’s as the special case of the unit disk. When m = 1 and m → +∞, the distortion theorems reduce to the results obtained by Gong for $
\mathcal{R}_{IV}
$
\mathcal{R}_{IV}
(n), respectively. Moreover, our method is different. As an application, the bounds for Bloch constants of H
m
($
\mathcal{R}_{IV}
$
\mathcal{R}_{IV}
(n)) are given. 相似文献
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This note is denoted to establishing sharp distortion theorems for subclasses of α-Bloch mappings defined in the unit ball of Cn with critical points.Furthermore,the estimates of Bloch constant with respect to these subclasses are given. 相似文献
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本文研究Cn里的单位球B到Cn里的K-拟共形全纯映射.证明的最后结果是:若f是B到Cn里的K-拟共形全纯映射,满足det(f'(0))=1,则f(B)包含一个半径至少是(CnK)1-n∫01(1+t)N-1/(1-t)2exp{-(n+1)t/1-t}dt的单叶球,其中Cn>1是只依赖于n的常数,当n→∞时,Cn→(10)~(1/2). 相似文献
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给出了从典型域到单位球的全纯映射高阶Frchet导数的Schwarz-Pick估计,从而推广了单位球上全纯自映射Frchet导数的Schwarz-Pick估计以及单位圆盘上有界全纯函数高阶导数的Schwarz-Pick估计的结论. 相似文献
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The background theory for the Bloch theorem is generalized to several complex variables. This work involves study of the Bergman kernel functions in order to extend work of Landau and Bonk. The main conclusion is an estimate for Bloch’s constant for mappings of domains of the first classical type. In the special case of then-dimensional ball, the estimate of Bloch’s constant coincides with that of Liu. 相似文献
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Bloch constants for planar harmonic mappings 总被引:3,自引:0,他引:3
Huaihui Chen P. M. Gauthier W. Hengartner 《Proceedings of the American Mathematical Society》2000,128(11):3231-3240
We give a lower estimate for the Bloch constant for planar harmonic mappings which are quasiregular and for those which are open. The latter includes the classical Bloch theorem for holomorphic functions as a special case. Also, for bounded planar harmonic mappings, we obtain results similar to a theorem of Landau on bounded holomorphic functions.