汎用データベース
世話人:川村一宏,平山至大,石井敦,丹下基生,蓮井翔
| 日時 | 2013年10月31日(木)16:00-17:30 |
|---|---|
| 場所 | 筑波大学 自然系学系D棟 D509 |
| 講演者 | 金英子 氏 (大阪大学 理学研究科) |
| 講演題目 | Pseudo-Anosovs with small dilatations coming from the magic 3-manifold |
| アブストラクト | Pseudo-Anosov mapping classes are equipped with some constants >1 called the dilatation. It is known that the logarithm of the dilatation is exactly equal to the topological entropy of a pseudo-Anosov representative of its mapping class. By work of Thurston, if a hyperbolic fibered 3-manifold M has the second Betti number more than 1, then it admits infinitely many fibrations on M. Moreover the monodromy of any fibration on M is pseudo-Anosov. As an example of such manifolds, we consider a single 3-manifold N with 3 cusps called the magic 3-manifold. We compute the dilatation of monodromy of each fibration on N. We also discuss the problem on the minimal dilatations and their asymptotic behavior. Intriguingly, pseudo-Anosovs with the smallest known dilatations are ``coming from" the magic 3-manifold. This is a joint work with Mitsuhiko Takasawa. |
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