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Exotic projective structures and quasifuchsian spaces II
- Source :
- Duke Math. J. 140, no. 1 (2007), 85-109
- Publication Year :
- 2006
-
Abstract
- Let $P(S)$ be the space of projective structures on a closed surface $S$ of genus $g >1$ and let $Q(S)$ be the subset of $P(S)$ of projective structures with quasifuchsian holonomy. It is known that $Q(S)$ consists of infinitely many connected components. In this paper, we will show that the closure of any exotic component of $Q(S)$ is not a topological manifold with boundary and that any two components of $Q(S)$ have intersecting closures.<br />22 pages, 9 figures
- Subjects :
- Topological manifold
Connected component
Pure mathematics
General Mathematics
Holonomy
Boundary (topology)
30F40, 57M50
Geometric Topology (math.GT)
Space (mathematics)
Surface (topology)
Mathematics::Geometric Topology
57M50
30F40
Mathematics - Geometric Topology
Genus (mathematics)
FOS: Mathematics
Component (group theory)
Mathematics
Subjects
Details
- Language :
- English
- Database :
- OpenAIRE
- Journal :
- Duke Math. J. 140, no. 1 (2007), 85-109
- Accession number :
- edsair.doi.dedup.....c76516d3de76167cb27ea068231e2fac