Date | 2016-11-22 |
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Speaker | 박효원 |

Dept. | 서울대 |

Room | 129-104 |

Time | 16:00-18:00 |

Right-angled Artin groups are the graph product whose vertex groups are infinite cyclic groups, which are defined by finite simple graphs.

A finite simple graph is called thin-chordal if it has no induced subgraphs that are isomorphic to either the cycle with 4 vertices or the path with 4 vertices.

We will discuss group properties related to right-angled Artin groups from thin-chordal graphs.

We show that a right-angled Artin group is defined by a thin-chordal graph if and only if every finite index subgroup of the group is a right-angled Artin group.

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