A
model geometry is a simply connected smooth manifold
X together with a
transitive action of a
Lie group G on
X with compact stabilizers. A model geometry is called
maximal if
G is maximal among groups acting smoothly and transitively on
X with compact stabilizers. Sometimes this condition is included in the definition of a model geometry. A
geometric structure on a manifold
M is a
diffeomorphism from
M to
X/Γ for some model geometry
X, where Γ is a
discrete subgroup of
G acting freely on
X ; this is a special case of a complete
(G,X)-structure. If a given manifold admits a geometric structure, then it admits one whose model is maximal. A 3-dimensional model geometry
X is relevant to the geometrization conjecture if it is maximal and if there is at least one compact manifold with a geometric structure modelled on
X. Thurston classified the 8 model geometries satisfying these conditions; they are listed below and are sometimes called
Thurston geometries. (There are also
uncountably many model geometries without compact quotients.) There is some connection with the
Bianchi groups: the 3-dimensional Lie groups. Most Thurston geometries can be realized as a left invariant metric on a Bianchi group. However
S2 ×
R cannot be, Euclidean space corresponds to two different Bianchi groups, and there are an uncountable number of
solvable non-unimodular Bianchi groups, most of which give model geometries with no compact representatives.
Spherical geometry S3 The point stabilizer is O(3,
R), and the group
G is the 6-dimensional Lie group O(4,
R), with 2 components. The corresponding manifolds are exactly the closed 3-manifolds with finite
fundamental group. Examples include the
3-sphere, the
Poincaré homology sphere,
Lens spaces. This geometry can be modeled as a left invariant metric on the
Bianchi group of type IX. Manifolds with this geometry are all compact, orientable, and have the structure of a
Seifert fiber space (often in several ways). The complete list of such manifolds is given in the article on
spherical 3-manifolds. Under Ricci flow, manifolds with this geometry collapse to a point in finite time.
Euclidean geometry E3 The point stabilizer is O(3,
R), and the group
G is the 6-dimensional Lie group
R3 × O(3,
R), with 2 components. Examples are the
3-torus, and more generally the
mapping torus of a finite-order
automorphism of the 2-torus; see
torus bundle. There are exactly 10 finite closed 3-manifolds with this geometry, 6 orientable and 4 non-orientable. This geometry can be modeled as a left invariant metric on the
Bianchi groups of type I or VII0. Finite volume manifolds with this geometry are all compact, and have the structure of a
Seifert fiber space (sometimes in two ways). The complete list of such manifolds is given in the article on
Seifert fiber spaces. Under Ricci flow, manifolds with Euclidean geometry remain invariant.
Hyperbolic geometry H3 The point stabilizer is O(3,
R), and the group
G is the 6-dimensional Lie group O+(1, 3,
R), with 2 components. There are enormous numbers of examples of these, and their classification is not completely understood. The example with smallest volume is the
Weeks manifold. Other examples are given by the
Seifert–Weber space, or "sufficiently complicated"
Dehn surgeries on
links, or most
Haken manifolds. The geometrization conjecture implies that a closed 3-manifold is hyperbolic if and only if it is irreducible,
atoroidal, and has infinite fundamental group. This geometry can be modeled as a left invariant metric on the
Bianchi group of type V or VIIh≠0. Under Ricci flow, manifolds with hyperbolic geometry expand.
The geometry of S2 × R The point stabilizer is O(2,
R) ×
Z/2
Z, and the group
G is O(3,
R) ×
R ×
Z/2
Z, with 4 components. The four finite volume manifolds with this geometry are:
S2 ×
S1, the mapping torus of the antipode map of
S2, the connected sum of two copies of 3-dimensional projective space, and the product of
S1 with two-dimensional projective space. The first two are mapping tori of the identity map and antipode map of the 2-sphere, and are the only examples of 3-manifolds that are prime but not irreducible. The third is the only example of a non-trivial connected sum with a geometric structure. This is the only model geometry that cannot be realized as a left invariant metric on a 3-dimensional Lie group. Finite volume manifolds with this geometry are all compact and have the structure of a
Seifert fiber space (often in several ways). Under normalized Ricci flow manifolds with this geometry converge to a 1-dimensional manifold.
The geometry of H2 × R The point stabilizer is O(2,
R) ×
Z/2
Z, and the group
G is O+(1, 2,
R) ×
R ×
Z/2
Z, with 4 components. Examples include the product of a
hyperbolic surface with a circle, or more generally the mapping torus of an isometry of a hyperbolic surface. Finite volume manifolds with this geometry have the structure of a
Seifert fiber space if they are orientable. (If they are not orientable the natural fibration by circles is not necessarily a Seifert fibration: the problem is that some fibers may "reverse orientation"; in other words their neighborhoods look like fibered solid Klein bottles rather than solid tori.) The classification of such (oriented) manifolds is given in the article on
Seifert fiber spaces. This geometry can be modeled as a left invariant metric on the
Bianchi group of type III. Under normalized Ricci flow manifolds with this geometry converge to a 2-dimensional manifold.
The geometry of the universal cover of SL(2, R) The
universal cover of
SL(2, R) is denoted {\widetilde{\rm{SL}}}(2, \mathbf{R}). It fibers over
H2, and the space is sometimes called "Twisted H2 × R". The group
G has 2 components. Its identity component has the structure (\mathbf{R}\times\widetilde{\rm{SL}}_2 (\mathbf{R}))/\mathbf{Z}. The point stabilizer is O(2,
R). Examples of these manifolds include: the manifold of unit vectors of the tangent bundle of a hyperbolic surface, and more generally the
Brieskorn homology spheres (excepting the 3-sphere and the
Poincaré dodecahedral space). This geometry can be modeled as a left invariant metric on the
Bianchi group of type VIII or III. Finite volume manifolds with this geometry are orientable and have the structure of a
Seifert fiber space. The classification of such manifolds is given in the article on
Seifert fiber spaces. Under normalized Ricci flow manifolds with this geometry converge to a 2-dimensional manifold.
Nil geometry This fibers over
E2, and so is sometimes known as "Twisted
E2 × R". It is the geometry of the
Heisenberg group. The point stabilizer is O(2,
R). The group
G has 2 components, and is a semidirect product of the 3-dimensional Heisenberg group by the group O(2,
R) of isometries of a circle. Compact manifolds with this geometry include the mapping torus of a
Dehn twist of a 2-torus, or the quotient of the Heisenberg group by the "integral Heisenberg group". This geometry can be modeled as a left invariant metric on the
Bianchi group of type II. Finite volume manifolds with this geometry are compact and orientable and have the structure of a
Seifert fiber space. The classification of such manifolds is given in the article on
Seifert fiber spaces. Under normalized Ricci flow, compact manifolds with this geometry converge to
R2 with the flat metric.
Sol geometry This geometry (also called
Solv geometry) fibers over the line with fiber the plane, and is the geometry of the identity component of the group
G. The point stabilizer is the dihedral group of order 8. The group
G has 8 components, and is the group of maps from 2-dimensional Minkowski space to itself that are either isometries or multiply the metric by −1. The identity component has a normal subgroup
R2 with quotient
R, where
R acts on
R2 with 2 (real) eigenspaces, with distinct real eigenvalues of product 1. This is the
Bianchi group of type VI0 and the geometry can be modeled as a left invariant metric on this group. All finite volume manifolds with solv geometry are compact. The compact manifolds with solv geometry are either the
mapping torus of an
Anosov map of the 2-torus (such a map is an automorphism of the 2-torus given by an invertible 2 by 2 matrix whose eigenvalues are real and distinct, such as \left( {\begin{array}{*{20}c} 2 & 1 \\ 1 & 1 \\ \end{array}} \right)), or quotients of these by groups of order at most 8. The eigenvalues of the automorphism of the torus generate an order of a real quadratic field, and the solv manifolds can be classified in terms of the units and ideal classes of this order. Under normalized Ricci flow compact manifolds with this geometry converge (rather slowly) to
R1. ==Uniqueness==