G2 (mathematics)
From Wikipedia, the free encyclopedia
In mathematics, G2 is the name of some Lie groups and also their Lie algebras . They are the smallest of the five exceptional simple Lie groups. G2 has rank 2 and dimension 14. The compact form is simply connected, and the non-compact (split) form has fundamental group of order 2. Its outer automorphism group is the trivial group. Its fundamental representation is 7-dimensional.
The compact form of G2 can be described as the automorphism group of the octonion algebra or, equivalently, as the subgroup of SO(7) that preserves any chosen particular vector in its 8-dimensional real spinor representation.
Contents |
[edit] Algebra
[edit] Dynkin diagram
[edit] Roots of G2
Although they span a 2-dimensional space, it's much more symmetric to consider them as vectors in a 2-dimensional subspace of a three dimensional space.
- (1,−1,0),(−1,1,0)
- (1,0,−1),(−1,0,1)
- (0,1,−1),(0,−1,1)
- (2,−1,−1),(−2,1,1)
- (1,−2,1),(−1,2,−1)
- (1,1,−2),(−1,−1,2)
Simple roots
- (0,1,−1), (1,−2,1)
[edit] Weyl/Coxeter group
Its Weyl/Coxeter group is the dihedral group, D12 of order 12.
[edit] Cartan matrix
[edit] Special holonomy
G2 is one of the possible special groups that can appear as holonomy. The manifolds of G2 holonomy are also called Joyce manifolds.
[edit] References
- John Baez, The Octonions, Section 4.1: G2, Bull. Amer. Math. Soc. 39 (2002), 145-205. Online HTML version at
http://math.ucr.edu/home/baez/octonions/node14.html.
E6 | E7 | E8 | F4 | G2 |
|