A (symmetrizable)
generalized Cartan matrix is a
square matrix A = (a_{ij}) with
integer entries such that • For diagonal entries, a_{ii} = 2 . • For non-diagonal entries, a_{ij} \leq 0 . • a_{ij} = 0 if and only if a_{ji} = 0 • A can be written as DS, where D is a
diagonal matrix, and S is a
symmetric matrix. For example, the Cartan matrix for
G2 can be decomposed as such: : \begin{bmatrix} 2 & -3 \\ -1 & 2 \end{bmatrix} = \begin{bmatrix} 3&0\\ 0&1 \end{bmatrix}\begin{bmatrix} \frac{2}{3} & -1 \\ -1 & 2 \end{bmatrix}. The third condition is not independent but is really a consequence of the first and fourth conditions. We can always choose a
D with positive diagonal entries. In that case, if
S in the above decomposition is
positive definite, then
A is said to be a
Cartan matrix. The Cartan matrix of a
simple Lie algebra is the matrix whose elements are the
scalar products :a_{ji}=2 {(r_i,r_j)\over (r_j,r_j)} (sometimes called the
Cartan integers) where
ri are the
simple roots of the algebra. The entries are integral from one of the properties of
roots. The first condition follows from the definition, the second from the fact that for i\neq j, r_j-{2(r_i,r_j)\over (r_i,r_i)}r_i is a root which is a
linear combination of the simple roots
ri and
rj with a positive coefficient for
rj and so, the coefficient for
ri has to be nonnegative. The third is true because orthogonality is a symmetric relation. And lastly, let D_{ij}={\delta_{ij}\over (r_i,r_i)} and S_{ij}=2(r_i,r_j). Because the simple roots span a
Euclidean space, S is positive definite. Conversely, given a generalized Cartan matrix, one can recover its corresponding Lie algebra. (See
Kac–Moody algebra for more details).
Classification An n \times n matrix
A is
decomposable if there exists a nonempty proper subset I \subset \{1,\dots,n\} such that a_{ij} = 0 whenever i \in I and j \notin I.
A is
indecomposable if it is not decomposable. Let
A be an indecomposable generalized Cartan matrix. We say that
A is of
finite type if all of its
principal minors are positive, that
A is of
affine type if its proper principal minors are positive and
A has
determinant 0, and that
A is of
indefinite type otherwise. Finite type indecomposable matrices classify the finite dimensional
simple Lie algebras (of types A_n, B_n, C_n, D_n, E_6, E_7, E_8, F_4, G_2 ), while affine type indecomposable matrices classify the
affine Lie algebras (say over some algebraically closed field of characteristic 0).
Determinants of the Cartan matrices of the simple Lie algebras The determinants of the Cartan matrices of the simple Lie algebras are given in the following table (along with A1=B1=C1, B2=C2, D3=A3, D2=A1A1, E5=D5, E4=A4, and E3=A2A1). Another property of this determinant is that it is equal to the index of the associated root system, i.e. it is equal to |P/Q| where denote the weight lattice and root lattice, respectively. == Representations of finite-dimensional algebras ==