Lipschitz constants to curve complexes for punctured surfaces
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- 作者:Aaron D. Valdivia avaldivia@flsouthern.edu
- 关键词:Mapping class groups ; Moduli spaces ; Curve complex ; Pseudo-Anosov ; Lipschitz
- 刊名:Topology and its Applications
- 出版年:2017
- 出版时间:1 February 2017
- 年:2017
- 卷:216
- 期:Complete
- 页码:137-145
- 全文大小:720 K
- 卷排序:216
文摘
Given a surface Sg,nSg,n there is a map sys:Tg,n→Cg,nsys:Tg,n→Cg,n where Tg,nTg,n is the Teichmüller space with the Teichmüller metric, Cg,nCg,n is the curve complex with the standard metric, anddCg,n(sys(X),sys(Y))≤KdTg,n(X,Y)+C.dCg,n(sys(X),sys(Y))≤KdTg,n(X,Y)+C. We give asymptotic bounds for the minimal value of K which we denote Kg,n≍1log(|χg,n|) for sequences of surfaces with fixed genus and sequences of surfaces where the genus is a rational multiple of the punctures. This generalizes work of Gadre, Hironaka, Kent, and Leininger where they give the same asymptotic bounds for closed surfaces.