English

Two Problems on Cartan Domains

Complex Variables 2007-05-23 v1

Abstract

Firstly, we consider the unitary geometry of two exceptional Cartan domains V(16)\Re_{V}(16) and VI(27)\Re_{VI}(27). We obtain the explicit formulas of Bergman kernal funtion, Cauchy-Szeg\"{o} kernel, Poinsson kernel and Bergman metric for V(16)\Re_{V}(16) and VI(27)\Re_{VI}(27). Secondly, we give a class of invariant differential operators for Cartan domain \Re of dimension n: If the Bergman metric of \Re is ds2=i,j=1ngijdzidzˉj,T(z,zˉ)=(gij)ds^{2}=\sum\limits_{i,j=1}^{n}g_{ij}dz_{i}d\bar{z}_{j}, T(z,\bar{z})=(g_{ij}) and L(u)=T1(z,zˉ)[2uzizˉj],L(u)=T^{-1}(z,\bar{z}) [\frac{\partial^2u}{\partial z_i\partial\bar{z}_j}],then Lj(u)={\mboxThesumofallprinipalminorsofdegreejforL(u)}L_j(u)=\{\mbox {The sum of all prinipal minors of degree} j {for} L(u)\} is invariant under the biholomorphic mapping of \Re. Let DD be the irreducible bounded homogeneous domain in CnC^n, P=P(z,)P=P(z,*) the Poisson kernel of DD, then for any fixed J(1jn)J(1\leq j \leq n) one has Lj(P1/j)=0L_j(P^{1/j})=0 iff DD is a symmetric domain.

Keywords

Cite

@article{arxiv.math/0603205,
  title  = {Two Problems on Cartan Domains},
  author = {Weiping Yin},
  journal= {arXiv preprint arXiv:math/0603205},
  year   = {2007}
}

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11 pages