Classification of torus manifolds with codimension one extended actions
The purpose of this paper is to classify torus manifolds (M (2n) , T (n) ) with codimension one extended G-actions (M (2n) , G) up to essential isomorphism, where G is a compact, connected Lie group whose maximal torus is T (n) . For technical reasons, we do not assume torus manifolds are orientable. We prove that there are seven types of such manifolds. As a corollary, if a nonsingular toric variety or a quasitoric manifold has a codimension one extended action then such manifold is a complex projective bundle over a product of complex projective spaces.
- Publisher
- BIRKHAUSER BOSTON INC
- Issue Date
- 2011-06
- Language
- English
- Article Type
- Article
- Keywords
TRANSFORMATION GROUPS; CONVEX POLYTOPES; MULTI-FANS; COHOMOLOGY; QUADRICS
- Citation
TRANSFORMATION GROUPS, v.16, no.2, pp.481 - 536
- ISSN
- 1083-4362
- Appears in Collection
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