Geometric 3-manifolds
Contents |
1 Introduction
Let a group act on a manifold by homeomorphisms.
A -manifold is a manifold with a -atlas, that is, a collection of homeomorphismsIf we change the initial data and , the developing map changes by composition with an element of .
If , analytic continuation along a loop representing gives a chart that is comparable to , since they are both defined at . Let be the element of such that . The mapis a group homomorphism and is called the holonomy of .
If we change the initial data and , the holonomy homomorphisms changes by conjugation with an element of .
A -manifold is complete if the developing map is surjective.
[Thurston1997] Section 3.4
Definition 1.1. A model geometry is a smooth manifold together with a Lie group of diffeomorphisms of , such that:
a) is connected and simply connected;
b) acts transitively on , with compact point stabilizers;
c) is not contained in any larger group of diffeomorphisms of with compact point stabilizers;
d) there exists at least one compact -manifold.
[Thurston1997] Definition 3.8.1
A 3-manifold is said to be a geometric manifold if it is a -manifold for a 3-dimensional model geometry .
2 Construction and examples
Theorem 2.1.
- the round sphere:
- Euclidean space:
- hyperbolic space:
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- the universal covering of the unit tangent bundle of the hyperbolic plane:
- the Heisenberg group:
- the 3-dimensional solvable Lie group with conjugation .
3 Invariants
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4 Classification/Characterization
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5 Further discussion
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6 References
- [Thurston1997] W. P. Thurston, Three-dimensional geometry and topology. Vol. 1, Princeton University Press, Princeton, NJ, 1997. MR1435975 (97m:57016) Zbl 0873.57001
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