On totally real submanifolds
Abstract
The following results are proved: Theorem 1. A totally real semiparallel submanifold of constant curvature with parallel f-structure in the normal bundle of a K\"ahler manifold N is flat or a totally geodesic submanifold of N. Theorem 2. A totally real minimal semiparallel submanifold M with parallel f-structure in the normal bundle and of constant length of the second fundamental form (or equivalently of constant scalar curvature) of a complex space form N is totally geodesic in N or of positive scalar curvature. Moreover, if the scalar curvature of M vanishes, then M is flat. Theorem 3. A complete, compact totally real submanifold with parallel mean curvature vector, parallel f-structure in the normal bundle and commutative second fundamental forms of a simply connected complete complex space form is totally geodesic or a pythagorean product of circles. Note that if M is a totally real submanifold of a K\"ahler manifold N and the dimension of N is twice the dimension of M, then the f-structure in the normal bundle vanishes.
Keywords
Cite
@article{arxiv.1010.1645,
title = {On totally real submanifolds},
author = {Ognian Kassabov},
journal= {arXiv preprint arXiv:1010.1645},
year = {2010}
}
Comments
8 pages, MR 87k:53132 B.-Y. Chen; Zlb. 613.53021