第四类华罗庚域上的Bergman核函数

显式给出了第四类华罗庚域HEⅣ上的Bergman核函数及其全纯自同构群。     

第二类华罗庚域的Bergman核函数的计算—纪念华罗庚90岁寿辰

显式获得了第二类华罗庚域的Bergman核函数.第二类华罗庚域是指由如下表达式所界定的域|w1|2p1+|w2|2p2+…+|wn|2pn<det(I-Z)这里,1/p1,1/p2,…,1/pn-1都是正整数,pn是任意正实数,RII(p)是第二类典型域,Z∈RII(p).关键之处有两点1)给出了将此域的任一内点(W,Z)映为(W*,0)的全纯自同构群;2)引进了semi-Reinhardt域并给出了它的完备规范正交函数系.     

四类Cartan—Egg域的Bergman核函数

显式给出了四类Cartan-Egg域的Bergman核函数及其全纯自同构群。     

第二类华罗庚域的Bergman核

论文以显式给出了第二类华罗庚域的Bergman核函数。关键之处有两点：一是给出了该域的全纯自同构群,该群的任一元素能把该域的形为（W1,W2,Z0）的点映为（W1^*,W2^*,0）;二是引进了semi-Reinhardt域的概念并求出了它的完备标准正交函数系。     

域W_1上的Bergman核函数

由于WI域既不是齐性域又不是R einhardt域,故以往求Bergm an核函数的方法都行不通.本文用新的方法计算域WI的Bergm an核函数的显式表达式.关键之处有两点:一是给出WI的全纯自同构群,群中每一元素将形为(W,Z0)的内点映为点(W*,0);二是引进了sem i-R einhardt的概念并求出了其完备标准正交函数系.     

域 WⅢ的Bergman核的计算

主要是计算域WⅢ 的Bergman核函数的显式表达式 .WⅢ ={W2 ∈C ,(W1 ,Z) ∈YⅢ(q) :｜W2 ｜2P <(1 -X) 3det(I Z Z) } .其中YⅢ ={ (W1 ,Z) ||W1 |2K相似文献   

一类Hua Construction的Bergman核函数

给出了一类Hua constructin的Bergman核函数及其全纯自同构群．     

域D={Z=（Z1,Z2）∈C^2：｜Z1｜^4＋｜Z2｜〈1}的Bergman核函数及Aut（D）

给出了域Ｄ＝｛Ｚ＝（Ｚ１，Ｚ２）∈Ｃ＾２：｜Ｚ１｜＾４＋｜Ｚ２｜＜１｝上的Ｂｅｒｇｍａｎ核函数以及解析自同构最大群Ａｕｔ（Ｄ）。     

某些华罗庚域的Bergman核函数的显式表达

通过构造超几何函数和球型积分变换方法,给出了更多变量的新域$E(k,q_{2},\cdots,q_{m}, \Omega,p_{2},\cdots,p_{m}$上的Bergman核函数的显示表达式,其中$\Omega$是指任意不可约有界圆型齐性域,$k,m,q_{2},\cdots,q_{m}$都是正整数, $p_{2},\cdots,p_{m}$都是正实数,$N(Z,Z)$是$\Omega$的一般范数.而且,当$\Omega$是4大类的不可约的对称典型域时,上述域就是华罗庚域.同时可以得出相应华罗庚域上的Bergman核函数的显示表达式.     

一种特殊Reinhardt域的解析自同构最大群

本文给出了域Ｄ＝｛ｚ＝（ｚ１，ｚ２，ｚ３）∈Ｃ３：｜ｚ１｜＋｜ｚ２｜＋｜ｚ３｜２＜１｝上的Ｂｅｒｇｍａｎ核函数和解析自同构最大群．     

Bergman kernel function on Hua construction of the fourth type

This paper introduces the Hua construction and presents the holomorphic automorphism group of the Hua construction of the fourth type. Utilizing the Bergman kernel function, under the condition of holomorphic automorphism and the standard complete orthonormal system of the semi-Reinhardt domain, the infinite series form of the Bergman kernel function is derived. By applying the properties of polynomial and Γ functions, various identification relations of the aforementioned form are developed and the explicit formula of the Bergman kernel function for the Hua construction of the fourth type is obtained, which suggest that many of the previously-reported results are only the special cases of our findings.     

Bergman kernel function on Hua construction of the fourth type

This paper introduces the Hua construction and presents the holomorphic automorphism group of the Hua construction of the fourth type.Utilizing the Bergman kernel function,under the condition of holomorphie automorphism and the standard complete or- thonormal system of the semi-Reinhardt domain,the infinite series form of the Bergman kernel function is derived.By applying the prop- erties of polynomial andΓfunctions,various identification relations of the aforementioned form are developed and the explicit formula of the Bergman kernel function for the Hua construction of the fourth type is obtained,which suggest that many of the previously-reported results are only the special cases of our findings.     

Bergman kernels on generalized Hua domains

The Bergman kernel functions with explicit formulas of the generalized Hua domains are obtained. And the holomorphic automorphism group for each generalized Hua domain is also given.     

第4类Cartan-Hartogs域上的Bergman核函数及一类双全纯不变量

结合使用求Ｂｅｒｇｍａｎ核函数显表达式的华罗庚方法和级数方法,引进Ｓｅｍｉ－Ｒｅｉｎｈａｒｄｔ域的概念并给出其完备标准正交函数系的表达式,从而给出域Ｙｎ的Ｂｅｒｇｍａｎ核函数的显表达式。作为应用又研究了一类与Ｂｅｒｇｍａｎ核函数有关的双全纯不变量Ｊｙｎ的边界性质。有如下结论：当（Ｗ,Ｚ）→（Ｗ,Ｚ）аＹｎ,（Ｗ０≠０）时,ＪＹＮ存在极限π＾ｎ＋Ｎ（ｎ＋１＋Ｎ）＾ｎ＋Ｎ／（ｎ＋Ｎ）！;当（Ｗ,Ｚ