Survey on constructions of pseudo-Anosov surface homeomorphismsPseudo-Anosov 곡면 위상동형사상의 구성에 관한 탐구
Pseudo-Anosov homeomorphisms are a special type in the mapping class group of a surface. Among all mapping classes, pseudo-Anosov homeomorphisms play the most important role for understanding the mapping class group. However, it is difficult to imagine an easy example of pseudo-Anosov homeomorphism. In this paper, we introduce two constructions of pseudo-Anosov homeomorphisms. Penner and Thurston found sufficient conditions to obtain pseudo-Anosov homeomorphisms using Dehn twists with curves satisfying space filling condition. Furthermore, we will focus on some meaningful properties of the constructions. There is a natural question as follows: How many pseudo-Anosov homeomorphisms arise from their constructions? For this reason, using properties of the constructions, we will show the existences of pseudo-Anosov homeomorphisms not arising from their constructions.
- Advisors
- Baik, Hyungryulresearcher; 백형렬researcher
- Description
- 한국과학기술원 :수리과학과,
- Publisher
- 한국과학기술원
- Issue Date
- 2020
- Identifier
- 325007
- Language
- eng
- Description
학위논문(석사) - 한국과학기술원 : 수리과학과, 2020.2,[i, 17 p. :]
- Keywords
mapping class group▼apseudo-Anosov homeomorphism▼aThurston's construction▼aPenner's construction▼aDehn twist▼astretch factor; 사상류군▼apseudo-Anosov 위상동형사상▼aThurston의 방법▼aPenner의 방법▼aDehn 꼬임▼a팽창 인자
- Appears in Collection
- MA-Theses_Master(석사논문)
- Files in This Item
- There are no files associated with this item.
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