Right-angled Artin groups on finite subgraphs of disk graphs
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- 作者:Erika Kuno kuno.e.aa@m.titech.ac.jp
- 关键词:20F36 ; 20F65 ; 05C25
- 刊名:Topology and its Applications
- 出版年:2017
- 出版时间:1 January 2017
- 年:2017
- 卷:215
- 期:Complete
- 页码:11-23
- 全文大小:448 K
- 卷排序:215
文摘
Koberda proved that if a graph Γ is a full subgraph of a curve graph C(S)C(S) of an orientable surface S , then the right-angled Artin group A(Γ)A(Γ) on Γ is a subgroup of the mapping class group Mod(S)Mod(S) of S. On the other hand, for a sufficiently complicated surface S , Kim–Koberda gave a graph Γ which is not contained in C(S)C(S), but A(Γ)A(Γ) is a subgroup of Mod(S)Mod(S). In this paper, we prove that if Γ is a full subgraph of a disk graph D(H)D(H) of a handlebody H , then A(Γ)A(Γ) is a subgroup of the handlebody group Mod(H)Mod(H) of H . Further, we show that there is a graph Γ which is not contained in some disk graphs, but A(Γ)A(Γ) is a subgroup of the corresponding handlebody groups.