Glossary of Lie groups and Lie algebras

This is a glossary for the terminology applied in the mathematical theories of Lie groups and Lie algebras. For the topics in the representation theory of Lie groups and Lie algebras, see Glossary of representation theory. Because of the lack of other options, the glossary also includes some generalizations such as quantum group.

Notations:
 * Throughout the glossary, $$( \cdot, \cdot )$$ denotes the inner product of a Euclidean space E and $$\langle \cdot, \cdot \rangle$$ denotes the rescaled inner product
 * $$\langle \beta, \alpha \rangle = \frac{(\beta, \alpha)}{(\alpha, \alpha)} \, \forall \alpha, \beta \in E. $$

A
abelian: An abelian Lie group is a Lie group that is an abelian group. An abelian Lie algebra is a Lie algebra such that $[x, y] = 0$ for every $x, y$ in the algebra.

adjoint: An adjoint representation of a Lie group:
 * $\operatorname{Ad} : G \to \operatorname{GL}(\mathfrak g)$
 * such that $\operatorname{Ad}(g)$ is the differential at the identity element of the conjugation $c_g : G \to G, x \mapsto g x g^{-1}$.

An adjoint representation of a Lie algebra is a Lie algebra representation
 * $\textrm{ad}: \mathfrak{g} \to \mathfrak{gl}(\mathfrak{g})$ where $\textrm{ad}(x)y = [x, y]$.

Ado: Ado's theorem: Any finite-dimensional Lie algebra is isomorphic to a subalgebra of $\mathfrak{gl}_V$ for some finite-dimensional vector space V.

affine: An affine Lie algebra is a particular type of Kac–Moody algebra. An affine Weyl group.

analytic: An analytic subgroup

automorphism: An automorphism of a Lie algebra is a linear automorphism preserving the bracket.

B
B: (B, N) pair

Borel: Armand Borel (1923 – 2003), a Swiss mathematician A Borel subgroup. A Borel subalgebra is a maximal solvable subalgebra. Borel-Bott-Weil theorem

Bruhat: Bruhat decomposition

C
Cartan: Élie Cartan (1869 – 1951), a French mathematician A Cartan subalgebra $\mathfrak{h}$ of a Lie algebra $\mathfrak{g}$ is a nilpotent subalgebra satisfying $N_\mathfrak{g}(\mathfrak{h}) = \mathfrak{h}$. Cartan criterion for solvability: A Lie algebra $\mathfrak{g}$ is solvable iff $\kappa( \mathfrak{g}, [\mathfrak{g},\mathfrak{g}] ) = 0$. Cartan criterion for semisimplicity: (1) If $\kappa( \cdot, \cdot)$ is nondegenerate, then $\mathfrak{g}$ is semisimple. (2) If $\mathfrak{g}$ is semisimple and the underlying field $F$ has characteristic 0, then $\kappa( \cdot, \cdot)$ is nondegenerate. The Cartan matrix of the root system $\Phi$ is the matrix $( \langle \alpha_i, \alpha_j \rangle )_{i,j=1}^n$, where $\Delta = \{\alpha_1 \ldots \alpha_n\}$ is a set of simple roots of $\Phi$. Cartan subgroup Cartan decomposition

Casimir: Casimir invariant, a distinguished element of a universal enveloping algebra.

Clebsch–Gordan coefficients: Clebsch–Gordan coefficients

center: The centralizer of a subset $X$ of a Lie algebra $\mathfrak{g}$ is $C_{\mathfrak{g}}(X) := \{x \in \mathfrak{g} | [x, X] = \{0\} \}$.|undefined

center: The center of a Lie group is the center of the group. [x, \mathfrak{g}] = 0 \}$

central series: A descending central series (or lower central series) is a sequence of ideals of a Lie algebra $L$ defined by $C^0(L) = L, \, C^1(L) = [L,L], \, C^{n+1}(L) = [L, C^n(L)]$ An ascending central series (or upper central series) is a sequence of ideals of a Lie algebra $L$ defined by $C_0(L) = \{0\}, \, C_1(L) = Z(L)$ (center of L), $C_{n+1}(L) = \pi_n^{-1} ( Z ( L / C_{n}(L) ) )$, where $\pi_i$ is the natural homomorphism $L \to L/C_n(L)$

Chevalley: Claude Chevalley (1909 – 1984), a French mathematician A Chevalley basis is a basis constructed by Claude Chevalley with the property that all structure constants are integers. Chevalley used these bases to construct analogues of Lie groups over finite fields, called Chevalley groups.

complex reflection group: complex reflection group

coroot: coroot

Coxeter: H. S. M. Coxeter (1907 – 2003), a British-born Canadian geometer Coxeter group Coxeter number

D
derived algebra: The derived algebra of a Lie algebra $\mathfrak{g}$ is $[\mathfrak{g}, \mathfrak{g} ]$. It is a subalgebra (in fact an ideal). A derived series is a sequence of ideals of a Lie algebra $\mathfrak g$ obtained by repeatedly taking derived algebras; i.e., $D^0 \mathfrak{g} = \mathfrak{g}, D^n \mathfrak{g} = D^{n-1}\mathfrak{g}$.

Dynkin: Eugene Borisovich Dynkin (1924 – 2014), a Soviet and American mathematician Finite Dynkin diagrams.svgn diagrams.

E
extension: An exact sequence $0 \to \mathfrak{g}' \to \mathfrak{g} \to \mathfrak{g} \to 0$ or $\mathfrak{g}$ is called a Lie algebra extension of $\mathfrak{g}$ by $\mathfrak{g}'$.

exponential map: The exponential map for a Lie group G with $\mathfrak g$ is a map $\mathfrak g \to G$ which is not necessarily a homomorphism but satisfies a certain universal property.

exponential: E6, E7, E7½, E8, En, Exceptional Lie algebra

F
free Lie algebra:

F: F4

fundamental: For "fundamental Weyl chamber", see.

G
G: G2

generalized: For "Generalized Cartan matrix", see. For "Generalized Kac–Moody algebra", see. For "Generalized Verma module", see.

group: Group analysis of differential equations.

H
homomorphism: A Lie group homomorphism is a group homomorphism that is also a smooth map. A Lie algebra homomorphism is a linear map $\phi : \mathfrak{g}_1 \to \mathfrak{g}_2$ such that $\phi([x,y]) = [ \phi(x), \phi(y) ] \, \forall x,y \in \mathfrak{g}_1.$

Harish-Chandra: Harish-Chandra, (1923 – 1983), an Indian American mathematician and physicist Harish-Chandra homomorphism Harish-Chandra isomorphism

highest: The theorem of the highest weight, stating the highest weights classify the irreducible representations. highest weight highest weight module

I
ideal: An ideal of a Lie algebra $\mathfrak{g}$ is a subspace $\mathfrak{g'}$ such that $[\mathfrak{g'}, \mathfrak{g}] \subseteq \mathfrak{g'}.$ Unlike in ring theory, there is no distinguishability of left ideal and right ideal. index: Index of a Lie algebra

invariant convex cone: An invariant convex cone is a closed convex cone in the Lie algebra of a connected Lie group that is invariant under inner automorphisms.

Iwasawa decomposition: Iwasawa decomposition

J
Jacobi identity: Carl Jacobi.jpg Gustav Jacob Jacobi (1804 – 1851), a German mathematician. Given a binary operation $[\cdot,\,\cdot ] : V^2 \to V$, the Jacobi identity states: [ [x, y], z] + [ [y, z], x] + [ [z, x], y] = 0.

K
Kac–Moody algebra: Kac–Moody algebra

Killing: Wilhelm Killing (1847 – 1923), a German mathematician. The Killing form on a Lie algebra $\mathfrak{g}$ is a symmetric, associative, bilinear form defined by $\kappa(x, y) := \textrm{Tr}( \textrm{ad}\,x\, \textrm{ad}\, y )\ \forall x,y \in \mathfrak{g}$.

Kirillov: Kirillov character formula

L
Langlands: Langlands decomposition Langlands dual

Lie: Portrett av Sophus Lie.jpgs Lie (1842 – 1899), a Norwegian mathematician A Lie group is a group that has a compatible structure of a smooth manifold. A Lie algebra is a vector space $\mathfrak{g}$ over a field $F$ with a binary operation [·, ·] (called the Lie bracket or abbr. bracket), which satisfies the following conditions: $\forall a,b \in F, x,y,z \in \mathfrak{g}$,
 * $[ax+by,z] = a[x,z] + b[y,z]$ (bilinearity)
 * $[x,x] = 0$ (alternating)
 * $x,y], z ] + [[y,z],x] + [[z,x],y] = 0$ ([[Jacobi identity)|undefined

Lie group–Lie algebra correspondence Lie's theorem
 * Let $\mathfrak{g}$ be a finite-dimensional complex solvable Lie algebra over algebraically closed field of characteristic $0$, and let $V$ be a nonzero finite dimensional representation of $\mathfrak{g}$. Then there exists an element of $V$ which is a simultaneous eigenvector for all elements of  $\mathfrak{g}$.

Compact Lie group. Semisimple Lie group; see.

Levi: Levi decomposition

N
nilpotent: A nilpotent Lie group. A nilpotent Lie algebra is a Lie algebra that is nilpotent as an ideal; i.e., some power is zero: $[\mathfrak g, [\mathfrak g, [\mathfrak g, \dots, [\mathfrak g, \mathfrak g] \dots ]]] = 0$.|undefined A nilpotent element of a semisimple Lie algebra is an element x such that the adjoint endomorphism $ad_x$ is a nilpotent endomorphism. A nilpotent cone

normalizer: The normalizer of a subspace $K$ of a Lie algebra $\mathfrak{g}$ is $N_{\mathfrak{g}}(K) := \{x \in \mathfrak{g} | [x, K] \subseteq K \}$.|undefined

M
maximal: For "maximal compact subgroup", see. For "maximal torus", see.

P
parabolic: Parabolic subgroup Parabolic subalgebra.

positive: For "positive root", see.

Q
quantum: quantum group.

quantized: quantized enveloping algebra.

R
radical: The radical of a Lie group. The radical of a Lie algebra $\mathfrak g$ is the largest (i.e., unique maximal) solvable ideal of $\mathfrak{g}$.

real: real form.

reductive: A reductive group. A reductive Lie algebra.

reflection: A reflection group, a group generated by reflections.

regular: A regular element of a Lie algebra. (\alpha, \gamma) > 0\}$. Call an element $\alpha$ of $\Phi^+(\gamma)$ decomposable if $\alpha = \alpha' + \alpha$ where $\alpha', \alpha \in \Phi^+(\gamma)$, then $\Delta(\gamma)$ is the set of all indecomposable elements of $\Phi^+(\gamma)$

root: [h,x] = \alpha(h) x \, \forall h \in \mathfrak{h} \} $. $\alpha$ is called a root of $\mathfrak{g}$ if it is nonzero and $\mathfrak{g_\alpha} \ne \{0\} $
 * The set of all roots is denoted by $\Phi$ ; it forms a root system.

Root system
 * A subset $\Phi$ of the Euclidean space $E$ is called a root system if it satisfies the following conditions:
 * $\Phi$ is finite, $\textrm{span} (\Phi) = E$ and $0 \notin \Phi$.
 * For all $\alpha \in \Phi$ and $c \in \mathbb{R}$, $c \alpha \in \Phi$ iff $c = \pm 1$.
 * For all $\alpha,\beta \in \Phi$, $\langle \alpha, \beta \rangle$ is an integer.
 * For all $\alpha,\beta \in \Phi$, $S_\alpha(\beta)\in \Phi$, where $S_\alpha$ is the reflection through the hyperplane normal to $\alpha$, i.e. $S_\alpha(x) = x - \langle x, \alpha \rangle \alpha$.

Root datum Positive root of root system $\Phi$ with respect to a set of simple roots $\Delta$ is a root of $\Phi$ which is a linear combination of elements of $\Delta$ with nonnegative coefficients. Negative root of root system $\Phi$ with respect to a set of simple roots $\Delta$ is a root of $\Phi$ which is a linear combination of elements of $\Delta$ with nonpositive coefficients. long root short root inverse of a root system: Given a root system $\Phi$. Define $\alpha^v = \frac{2 \alpha}{ ( \alpha, \alpha) }$, $\Phi^v = \{ \alpha^v

base of a root system: synonymous to "set of simple roots" dual of a root system: synonymous to "inverse of a root system"

S
Serre: Serre's theorem states that, given a (finite reduced) root system $\Phi$, there exists a unique (up to a choice of a base) semisimple Lie algebra whose root system is $\Phi$.

simple: A simple Lie group is a connected Lie group that is not abelian which does not have nontrivial connected normal subgroups. A simple Lie algebra is a Lie algebra that is non abelian and has only two ideals, itself and $\{0\}$. simply laced group (a simple Lie group is simply laced when its Dynkin diagram is without multiple edges). simple root. A subset $\Delta$ of a root system $\Phi$ is called a set of simple roots if it satisfies the following conditions:
 * $\Delta$ is a linear basis of $E$.
 * Each element of $\Phi$ is a linear combination of elements of $\Delta$ with coefficients that are either all nonnegative or all nonpositive.

Classical Lie algebras:

Exceptional Lie algebras:

semisimple: A semisimple Lie group A semisimple Lie algebra is a nonzero Lie algebra that has no nonzero abelian ideal. In a semisimple Lie algebra, an element is semisimple if its image under the adjoint representation is semisimple; see Semisimple Lie algebra.

solvable: A solvable Lie group A solvable Lie algebra is a Lie algebra $\mathfrak g$ such that $D^n \mathfrak g = 0$ for some $n \ge 0$; where $D \mathfrak g = [\mathfrak g, \mathfrak g]$ denotes the derived algebra of $\mathfrak g$.

split:

Stiefel: Stiefel diagram of a compact connected Lie group.

subalgebra: A subspace $\mathfrak{g'}$ of a Lie algebra $\mathfrak{g}$ is called the subalgebra of $\mathfrak{g}$ if it is closed under bracket, i.e. $[\mathfrak{g'}, \mathfrak{g'}] \subseteq \mathfrak{g'}.$

T
Tits: Tits cone.

toral: toral Lie algebra maximal toral subalgebra

U

 * Unitarian trick

V

 * Verma module

W
Weyl: Hermann Weyl (1885 – 1955), a German mathematician A Weyl chamber is one of the connected components of the complement in V, a real vector space on which a root system is defined, when the hyperplanes orthogonal to the root vectors are removed. The Weyl character formula gives in closed form the characters of the irreducible complex representations of the simple Lie groups. Weyl group: Weyl group of a root system $\Phi$ is a (necessarily finite) group of orthogonal linear transformations of $E$ which is generated by reflections through hyperplanes normal to roots of $\Phi$