Bianchi classification

Classification in dimension less than 3

• Dimension 0: The only Lie algebra is the abelian Lie algebra R⁰.
• Dimension 1: The only Lie algebra is the abelian Lie algebra R¹, with outer automorphism group the multiplicative group of non-zero real numbers.
• Dimension 2: There are two Lie algebras:
• * The abelian Lie algebra R², with outer automorphism group GL₂.
• * The solvable Lie algebra of 2×2 upper triangular matrices of trace 0. It has trivial center and trivial outer automorphism group. The associated simply connected Lie group is the affine group of the line.

  Classification in dimension 3

• Type I: This is the abelian and unimodular Lie algebra R³. The simply connected group has center R³ and outer automorphism group GL₃. This is the case when M is 0.
• Type II: The Heisenberg algebra, which is nilpotent and unimodular. The simply connected group has center R and outer automorphism group GL₂. This is the case when M is nilpotent but not 0.
• Type III: This algebra is a product of R and the 2-dimensional non-abelian Lie algebra. It is solvable and not unimodular. The simply connected group has center R and outer automorphism group the group of non-zero real numbers. The matrix M has one zero and one non-zero eigenvalue.
• Type IV: The algebra generated by = 0, = y, = y + z. It is solvable and not unimodular. The simply connected group has trivial center and outer automorphism group the product of the reals and a group of order 2. The matrix M has two equal non-zero eigenvalues, but is not diagonalizable.
• Type V: = 0, = y, = z. Solvable and not unimodular. The simply connected group has trivial center and outer automorphism group the elements of GL₂ of determinant +1 or −1. The matrix M has two equal eigenvalues, and is diagonalizable.
• Type VI: An infinite family: semidirect products of R² by R, where the matrix M has non-zero distinct real eigenvalues with non-zero sum. The algebras are solvable and not unimodular. The simply connected group has trivial center and outer automorphism group a product of the non-zero real numbers and a group of order 2.
• Type VI₀: This Lie algebra is the semidirect product of R² by R, with R where the matrix M has non-zero distinct real eigenvalues with zero sum. It is solvable and unimodular. It is the Lie algebra of the 2-dimensional Poincaré group, the group of isometries of 2-dimensional Minkowski space. The simply connected group has trivial center and outer automorphism group the product of the positive real numbers with the dihedral group of order 8.
• Type VII: An infinite family: semidirect products of R² by R, where the matrix M has non-real and non-imaginary eigenvalues. Solvable and not unimodular. The simply connected group has trivial center and outer automorphism group the non-zero reals.
• Type VII₀: Semidirect product of R² by R, where the matrix M has non-zero imaginary eigenvalues. Solvable and unimodular. This is the Lie algebra of the group of isometries of the plane. The simply connected group has center Z and outer automorphism group a product of the non-zero real numbers and a group of order 2.
• Type VIII: The Lie algebra sl₂ of traceless 2 by 2 matrices, associated to the group SL₂. It is simple and unimodular. The simply connected group is not a matrix group; it is denoted by, has center Z and its outer automorphism group has order 2.
• Type IX: The Lie algebra of the orthogonal group O₃. It is denoted by ?? and is simple and unimodular. The corresponding simply connected group is SU; it has center of order 2 and trivial outer automorphism group, and is a spin group.

Structure constants

1. Due to the antisymmetry, there are nine independent constants. These can be equivalently represented by the nine components of an arbitrary constant matrix C^ab:
   where ε_abd is the totally antisymmetric three-dimensional Levi-Civita symbol. Substitution of this expression for into the Jacobi identity, results in
   
2. The structure constants can be transformed as:
   Appearance of det A in this formula is due to the fact that the symbol ε_abd transforms as tensor density:, where έ_mnd ≡ ε_mnd. By this transformation it is always possible to reduce the matrix C^ab to the form:
   After such a choice, one still have the freedom of making triad transformations but with the restrictions and
3. Now, the Jacobi identities give only one constraint:
   
4. If n₁ ≠ 0 then C²³ – C³² = 0 and by the remaining transformations with, the 2 × 2 matrix in C^ab can be made diagonal. Then
   The diagonality condition for C^ab is preserved under the transformations with diagonal. Under these transformations, the three parameters n₁, n₂, n₃ change in the following way:
   By these diagonal transformations, the modulus of any n_a can be made equal to unity. Taking into account that the simultaneous change of sign of all n_a produce nothing new, one arrives to the following invariantly different sets for the numbers n₁, n₂, n₃, that is to the following different types of homogeneous
   spaces with diagonal matrix C^ab:
   
5. Consider now the case n₁ = 0. It can also happen in that case that C²³ – C³² = 0. This returns to the situation already analyzed in the previous step but with the additional condition n₁ = 0. Now, all essentially different types for the sets n₁, n₂, n₃ are,, and. The first three repeat the types VII₀, VI₀, II. Consequently, only one new type arises:
   
6. The only case left is n₁ = 0 and C²³ – C³² ≠ 0. Now the 2 × 2 matrix is non-symmetric and it cannot be made diagonal by transformations using. However, its symmetric part can be diagonalized, that is the 3 × 3 matrix C^ab can be reduced to the form:
   where a is an arbitrary number. After this is done, there still remains the possibility to perform transformations with diagonal, under which the quantities n₂, n₃ and a change as follows:
   These formulas show that for nonzero n₂, n₃, a, the combination a²⁻¹ is an invariant quantity. By a choice of, one can impose the condition a > 0 and after this is done, the choice of the sign of permits one to change both signs of n₂ and n₃ simultaneously, that is the set is equivalent to the set. It follows that there are the following four different possibilities:
   For the first two, the number a can be transformed to unity by a choice of
   the parameters and. For the second two possibilities, both of these parameters are already fixed and a remains an invariant and arbitrary positive number. Historically these four types of homogeneous spaces have been classified as:
   Type III is just a particular case of type VI corresponding to a = 1. Types VII and VI contain an infinity of invariantly different types of algebras corresponding to the arbitrariness of the continuous parameter a. Type VII₀ is a particular case of VII corresponding to a = 0 while type VI₀ is a particular case of VI corresponding also to a = 0.

Curvature of Bianchi spaces

Cosmological application