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This article is cited in 24 scientific papers (total in 24 papers)
Topological toric manifolds
Hiroaki Ishidaa, Yukiko Fukukawab, Mikiya Masudab a Osaka City University Advanced Mathematical Institute, Sumiyoshi-ku, Osaka, 558-8585, Japan
b Department of Mathematics, Osaka City University, Sumiyoshi-ku, Osaka, 558-8585, Japan
Abstract:
We introduce the notion of a topological toric manifold and a topological fan and show that there is a bijection between omnioriented topological toric manifolds and complete non-singular topological fans. A topological toric manifold is a topological analogue of a toric manifold and the family of topological toric manifolds is much larger than that of toric manifolds. A topological fan is a combinatorial object generalizing the notion of a simplicial fan in toric geometry.
Prior to this paper, two topological analogues of a toric manifold have been introduced. One is a quasitoric manifold and the other is a torus manifold. One major difference between the previous notions and topological toric manifolds is that the former support a smooth action of an $S^1$-torus while the latter support a smooth action of a $\mathbb{C}^*$-torus. We also discuss their relation in details.
Key words and phrases:
Toric manifold, fan, multi-fan, quasitoric manifold, torus manifold.
Received: August 15, 2011; in revised form January 24, 2012
Citation:
Hiroaki Ishida, Yukiko Fukukawa, Mikiya Masuda, “Topological toric manifolds”, Mosc. Math. J., 13:1 (2013), 57–98
Linking options:
https://www.mathnet.ru/eng/mmj489 https://www.mathnet.ru/eng/mmj/v13/i1/p57
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Abstract page: | 436 | References: | 70 | First page: | 3 |
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