Yair Minsky, introduction to the mapping class group
Some surfaces of finite type.

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Yair Minsky, introduction to the mapping class group
Some surfaces of finite type.
A manifold with a complete locally homogeneous metric is said to be geometric, and the >metric is called the geometric structure.
It is known that there are essentially eight 3-dimensional geometries which compact 3-manifolds can possess.
They are H³, E³, S³, H²×ℝ, S²×ℝ,̴ S̴ L₂, Nil, Sol.
(Nil is the geometry of the Heisenberg group with left-invariant metric.)
(Except for H³ and Sol, geometric 3-manifolds are Seifert fibered manifolds. )
The Teichmüller space of a geometric manifold M is the set of all geometric structures on M factored by isotopy.
—Ken-ichi Ohshika, Teichmüller spaces of Seifert fibered manifolds with infinite π₁ (1987)