Genki Omori scite author profile

Genki Omori

5Publications

50Citation Statements Received

142Citation Statements Given

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141

Affiliations

Tokyo University of Science, Tokyo Institute of Technology, Saitama University

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Finite presentations for the balanced superelliptic mapping class groups

Hirose¹,

Omori²

2022

Preprint

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The balanced superelliptic mapping class group is the normalizer of the transformation group of the balanced superelliptic covering space in the mapping class group of the total surface. We give finite presentations for the balanced superelliptic mapping class groups of closed surfaces, surfaces with one marked point, and surfaces with one boundary component. To give these presentations, we construct finite presentations for corresponding liftable mapping class groups in a different generating set from Ghaswala-Winarski's presentation in [9].

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An infinite presentation for the mapping class group of a nonorientable surface

Omori

2017

Algebr. Geom. Topol.

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A small generating set for the twist subgroup of the mapping class group of a non-orientable surface by Dehn twists

Omori¹

2018

Hiroshima Math. J.

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A small normal generating set for the handlebody subgroup of the Torelli group

Omori

2018

Geom Dedicata

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The balanced superelliptic mapping class groups are generated by three elements

Omori¹

2022

Preprint

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The balanced superelliptic mapping class group is the normalizer of the transformation group of the balanced superelliptic covering in the mapping class group of the total surface. We prove that the balanced superelliptic mapping class groups with either one marked point, one boundary component, or no marked points and boundary are generated by three elements. To prove this, we also show that its liftable mapping class groups are also generated by three elements. These generating sets are minimal except for several no marked points and boundary cases.

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Genki Omori

Finite presentations for the balanced superelliptic mapping class groups

An infinite presentation for the mapping class group of a nonorientable surface

A small generating set for the twist subgroup of the mapping class group of a non-orientable surface by Dehn twists

A small normal generating set for the handlebody subgroup of the Torelli group

The balanced superelliptic mapping class groups are generated by three elements

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