number of downloads : ?
File
language
eng
Author
Cho Jong Taek
Kimura, Makoto
Description
We show that if ruled Lagrangian submanifold M^3 in 3-dimensional complex Euclidean space is Einstein, then it is flat, provided that the map which gives direction of each ruling has constant rank. Also we give explicit construction of flat ruled Lagrangian submanifolds M^3 in C^3, from some horizontal curves in S^5, such that M^3 is neither totally geodesic nor Riemannian product Σ×R.
Subject
Lagrangian submanifolds
Ricci tensor
scalar curvature
complex Euclidean space
Journal Title
島根大学総合理工学部紀要. シリーズB
Volume
44
Start Page
17
End Page
26
ISSN
13427121
Published Date
2011-03
NCID
AA11157123
Publisher
島根大学総合理工学部
NII Type
Departmental Bulletin Paper
Format
PDF
Text Version
出版社版
Gyoseki ID
e11728
OAI-PMH Set
Interdisciplinary Graduate School of Science and Engineering
他の一覧
このエントリーをはてなブックマークに追加