Proper Holomorphic Mappings in Several Complex Variables
A holomorphic mapping f from a bounded domain D in $doubcsp{n}$ to a bounded domain $Omega$ in $doubcsp{N}$ is proper if the sequence ${f(zj)}$ tends to the boundary of $Omega$ for every sequence ${zj}$ which tends to the boundary of D. Let f be a proper holomorphic mapping from the unit ball in $doubcsp{n}$ to the unit ball in $doubcsp{N}$ for $N ge n ge 2.$ If f is a function of class $Csp{N-n+1}$ on the closed unit ball and also satisfies a certain non-degeneracy condition, then Cima and Suffridge proved that f must be rational. In this thesis we prove a similar result for mappings from complex eggs to the unit ball in $doubcsp{N}.$ We also prove that a rational proper holomorphic mapping f from the complex egg ${z in doubcsp{n} vertSigmavert zsb{i}
- ISBN 10 : OCLC:31847961
- Judul : Proper Holomorphic Mappings in Several Complex Variables
- Pengarang : Marcus Wono Setya-Budhi,
- Bahasa : en
- Tahun : 1993
- Halaman : 152
- Halaman : 152
- Google Book : http://books.google.co.id/books?id=NzXJJwAACAAJ&dq=inauthor:wono+setya&hl=&source=gbs_api
-
Ketersediaan :
A holomorphic mapping f from a bounded domain D in $doubcsp{n}$ to a bounded domain $Omega$ in $doubcsp{N}$ is proper if the sequence ${f(zj)}$ tends to the boundary of $Omega$ for every sequence ${zj}$ which tends to the boundary of D. Let ...
