共查询到16条相似文献,搜索用时 62 毫秒
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本文对某类广义Hartogs三角形上的逆紧全纯自映射证明了刚性定理,即逆紧全纯自映射必定为全纯自同构.同时完全刻画了其全纯自同构群,并且给出了关于其全纯自同构以及两个这类域之间逆紧全纯映射的分类。 相似文献
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戴绍虞 《数学年刊A辑(中文版)》2007,(2)
对C2中某类Hartogs域的逆紧全纯自映射证明了刚性定理,即逆紧全纯自映射必定为全纯自同构.此类域是光滑有界拟凸完全的Hartogs域,且它的边界上具有无限型点. 相似文献
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对C2中某类Hartogs域的逆紧全纯自映射证明了刚性定理,即逆紧全纯自映射必定为全纯自同构.此类域是光滑有界拟凸完全的Hartogs域,且它的边界上具有无限型点. 相似文献
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对满足一定条件的非光滑有界域上的全纯逆紧映射证得了局部全纯延拓定理. 同时也研究了广义Hartogs三角形之间的全纯逆紧映射. 相似文献
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本文主要证明一类广义Hartogs三角形之间的逆紧全纯映射在相差全纯自同构的意义下是唯一的。 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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C.Fefferman定理证明了光滑有界强拟凸域之间的双全纯映射可以光滑延拓到边界,这个结果已经被推广到各种情形.其中Bell和Catlin以及Diederich和Fornaess独立地将其推广到拟凸域的逆紧全纯映射.本文较全面地综述了C.Fefferman定理的推广情况以及Bergman投射的边界正则性问题,同时对如何去掉Bell和Catlin以及Diederich和Fornaess定理条件中的拟凸性给出一个新观察,提出一个解决方向并且说明在具体情况下这个新观察确实是可以提供答案的. 相似文献
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本文证明某些类型广义Hartogs三角形的逆紧全纯自映射一定是自同构,同时给出这些自同构的明确表达式. 相似文献
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In this paper,Schwarz-Pick estimates for high order Fréchet derivatives of holomorphic self-mappings on classical domains are presented.Moreover,the obtained result can deduce the early work on Schwarz... 相似文献
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The aim of this note is to give a geometric proof for classical local rigidity of lattices in semisimple Lie groups. We are reproving well known results in a more geometric (and hopefully clearer) way. 相似文献
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Let X and Y be completely regular locales. We show that the properness of a localic map f: X → Y can be characterized in terms of extension between compactifications. 相似文献
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We show that proper holomorphic self-maps of smoothly bounded pseudoconvex quasi-balanced domains of finite type are automorphisms. This generalizes the classical Alexander’s theorem on proper holomorphic self-maps of the unit ball. 相似文献
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Acta Mathematica Sinica, English Series - In this paper, we first introduce the notion of n-generalized Hartogs triangles. Then, we characterize proper holomorphic mappings between some of these... 相似文献
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61. IntroductionLet DI, DZ be two bounded domains in C", a holomorphic mapping F: DI ~ DZ isproper if F--'(K) is compact whenever K is compact. It is Obvious that for every boUndeddomain in C", there always edests proper holomorphic self-mapping. However, given tabbounded domains DI, DZ in C", it does not seem easy to answer whether there ealsts properholomorphic mapping F: DI ~ D2. A main result obtained in recellt y6ars isTheorem 1.1.[1] Let Z (a) and Z (P) be two Generalized P… 相似文献