Let \mathfrak g be a (finite-dimensional) semisimple Lie algebra over an algebraically closed field of characteristic zero. The structure of \mathfrak g can be described by an
adjoint action of a certain distinguished subalgebra on it, a
Cartan subalgebra. By definition, a
Cartan subalgebra (also called a maximal
toral subalgebra) \mathfrak h of \mathfrak g is a maximal subalgebra such that, for each h \in \mathfrak h, \operatorname{ad}(h) is
diagonalizable. As it turns out, \mathfrak h is abelian and so all the operators in \operatorname{ad}(\mathfrak h) are
simultaneously diagonalizable. For each linear functional \alpha of \mathfrak h, let :\mathfrak{g}_{\alpha} = \{ x \in \mathfrak{g} | \operatorname{ad}(h) x := [h, x] = \alpha(h) x \, \text{ for all } h \in \mathfrak h \}. (Note that \mathfrak{g}_0 is the
centralizer of \mathfrak h.) Then {{math_theorem :\mathfrak g = \mathfrak h \oplus \bigoplus_{\alpha \in \Phi} \mathfrak{g}_{\alpha} where \Phi is the set of all nonzero linear functionals \alpha of \mathfrak h such that \mathfrak g_{\alpha} \ne \{0\}. Moreover, for each \alpha, \beta \in \Phi, • [\mathfrak g_{\alpha}, \mathfrak g_{\beta}] \subseteq \mathfrak g_{\alpha + \beta}, which is the equality if \alpha + \beta \ne 0. • [\mathfrak{g}_{\alpha}, \mathfrak{g}_{-\alpha}] \oplus \mathfrak{g}_{-\alpha} \oplus \mathfrak{g}_{\alpha} \simeq \mathfrak{sl}_2 as a Lie algebra. • \dim \mathfrak g_{\alpha} = 1; in particular, \dim \mathfrak g = \dim \mathfrak h + \# \Phi. • \mathfrak g_{2\alpha} = \{0\}; in other words, 2 \alpha \not\in \Phi. • With respect to the Killing form
B, \mathfrak{g}_{\alpha}, \mathfrak{g}_{\beta} are orthogonal to each other if \alpha + \beta \ne 0; the restriction of
B to \mathfrak h is nondegenerate. }} (The most difficult item to show is \dim \mathfrak{g}_{\alpha} = 1. The standard proofs all use some facts in the
representation theory of \mathfrak{sl}_2; e.g., Serre uses the fact that an \mathfrak{sl}_2-module with a primitive element of negative weight is infinite-dimensional, contradicting \dim \mathfrak g .) Let h_{\alpha} \in \mathfrak{h}, e_{\alpha} \in \mathfrak{g}_{\alpha}, f_{\alpha} \in \mathfrak{g}_{-\alpha} with the commutation relations [e_{\alpha}, f_{\alpha}] = h_{\alpha}, [h_{\alpha}, e_{\alpha}] = 2e_{\alpha}, [h_{\alpha}, f_{\alpha}] = -2f_{\alpha}; i.e., the h_{\alpha}, e_{\alpha}, f_{\alpha} correspond to the standard basis of \mathfrak{sl}_2. The linear functionals in \Phi are called the
roots of \mathfrak g relative to \mathfrak h. The roots span \mathfrak h^* (since if \alpha(h) = 0, \alpha \in \Phi, then \operatorname{ad}(h) is the zero operator; i.e., h is in the center, which is zero.) Moreover, from the representation theory of \mathfrak{sl}_2, one deduces the following symmetry and integral properties of \Phi: for each \alpha, \beta \in \Phi, {{bulleted list :s_{\alpha} : \mathfrak{h}^* \to \mathfrak{h}^*, \, \gamma \mapsto \gamma - \gamma(h_{\alpha}) \alpha leaves \Phi invariant (i.e., s_{\alpha}(\Phi) \subset \Phi). Note that s_{\alpha} has the properties (1) s_{\alpha}(\alpha) = -\alpha and (2) the fixed-point set is \{ \gamma \in \mathfrak{h}^* | \gamma(h_\alpha) = 0 \}, which means that s_{\alpha} is the reflection with respect to the hyperplane corresponding to \alpha. The above then says that \Phi is a
root system. It follows from the general theory of a root system that \Phi contains a basis \alpha_1, \dots, \alpha_l of \mathfrak{h}^* such that each root is a linear combination of \alpha_1, \dots, \alpha_l with integer coefficients of the same sign; the roots \alpha_i are called
simple roots. Let e_i = e_{\alpha_i}, etc. Then the 3l elements e_i, f_i, h_i (called
Chevalley generators) generate \mathfrak g as a Lie algebra. Moreover, they satisfy the relations (called
Serre relations): with a_{ij} = \alpha_j(h_i), :[h_i, h_j] = 0, :[e_i, f_i] = h_i, [e_i, f_j] = 0, i \ne j, :[h_i, e_j] = a_{ij} e_j, [h_i, f_j] = -a_{ij} f_j, :\operatorname{ad}(e_i)^{-a_{ij} + 1}(e_j) = \operatorname{ad}(f_i)^{-a_{ij} + 1}(f_j) = 0, i \ne j. The converse of this is also true: i.e., the Lie algebra generated by the generators and the relations like the above is a (finite-dimensional) semisimple Lie algebra that has the root space decomposition as above (provided the [a_{ij}]_{1 \le i, j \le l} is a
Cartan matrix). This is a
theorem of Serre. In particular, two semisimple Lie algebras are isomorphic if they have the same root system. The implication of the axiomatic nature of a root system and Serre's theorem is that one can enumerate all possible root systems; hence, "all possible" semisimple Lie algebras (finite-dimensional over an algebraically closed field of characteristic zero). The
Weyl group is the group of linear transformations of \mathfrak{h}^* \simeq \mathfrak{h} generated by the s_\alpha's. The Weyl group is an important symmetry of the problem; for example, the weights of any finite-dimensional representation of \mathfrak{g} are invariant under the Weyl group. == Example root space decomposition in sln(C) ==