"Teichmuller theory"의 두 판 사이의 차이
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(2) T(S,M) is manifold of dimension 6g-6+2p+3b+c where g = genus, p=# of puncture, b = # boundary component, c=# of marked points on boundary | (2) T(S,M) is manifold of dimension 6g-6+2p+3b+c where g = genus, p=# of puncture, b = # boundary component, c=# of marked points on boundary | ||
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==related items== | ==related items== | ||
| − | + | * [[Moduli space of local systems and higher Teichmuller theory]] | |
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* [http://www.ems-ph.org/books/055/9783037190296_introduction.pdf Introduction to Teichmüller theory, old and new], Athanase Papadopoulos | * [http://www.ems-ph.org/books/055/9783037190296_introduction.pdf Introduction to Teichmüller theory, old and new], Athanase Papadopoulos | ||
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[[분류:개인노트]] | [[분류:개인노트]] | ||
[[분류:cluster algebra]] | [[분류:cluster algebra]] | ||
[[분류:math and physics]] | [[분류:math and physics]] | ||
[[분류:math]] | [[분류:math]] | ||
2014년 5월 4일 (일) 21:38 판
introduction
review of hyperbolic geometry
- horocycle
- exponentiated hyperbolic distances between horocycles drawn around vertices of a polygon with geodesic sides and cusps at the vertices
- lamination
- shear coordinates
- lambda length
- http://moniker.name/worldmaking/?p=744
- http://orion.math.iastate.edu/dept/thesisarchive/MSCC/OLearyMSCCSS06.pdf
- \def
- An ideal triangle in (S,M) is a triangle with vertices at M, whose sides are geodesics.
- \def
- A horocycle at marked point p is a set of points "equidistant" to p. In lift to H^2, looks like circle tangent to boundary at p.
Teichmuller space of a marked surface
Given marked surface (S,M) , the Teichmuller space T(S,M) is the space of metrics on (S,M) such that
- are hyperbolic (constant curvature -1)
- have geodesic boundary at boundary of S
- local neighborhood of point on boundary S can be mapped isometrically to neighborhood of a point here on one side of geodesic
- have cusps at points in M
Considered up to diffeomorphism homotopic to identity.
Facts
(1) T(S,M) contractible
(2) T(S,M) is manifold of dimension 6g-6+2p+3b+c where g = genus, p=# of puncture, b = # boundary component, c=# of marked points on boundary
expositions
- Introduction to Teichmüller theory, old and new, Athanase Papadopoulos