Lie algebra

Short description: Algebraic structure used in analysis

In mathematics, a Lie algebra (pronounced /liː/ LEE) is a vector space [math]\displaystyle{ \mathfrak g }[/math] together with an operation called the Lie bracket, an alternating bilinear map [math]\displaystyle{ \mathfrak g \times \mathfrak g \rightarrow \mathfrak g }[/math], that satisfies the Jacobi identity. In other words, a Lie algebra is an algebra over a field for which the multiplication operation (called the Lie bracket) is alternating and satisfies the Jacobi identity. The Lie bracket of two vectors [math]\displaystyle{ x }[/math] and [math]\displaystyle{ y }[/math] is denoted [math]\displaystyle{ [x,y] }[/math]. A Lie algebra is typically a non-associative algebra. However, every associative algebra gives rise to a Lie algebra, with the Lie bracket defined as the commutator [math]\displaystyle{ [x,y] = x y - yx }[/math].

Lie algebras are closely related to Lie groups, which are groups that are also smooth manifolds: any Lie group gives rise to a Lie algebra, which is its tangent space at the identity. (In this case, the Lie bracket measures the failure of commutativity for the Lie group.) Conversely, to any finite-dimensional Lie algebra over the real or complex numbers, there is a corresponding connected Lie group unique up to coverings (Lie's third theorem). This correspondence allows one to study the structure and classification of Lie groups in terms of Lie algebras.

In physics, Lie groups appear as symmetry groups of physical systems, and their Lie algebras (tangent vectors near the identity) may be thought of as infinitesimal symmetry motions. Thus Lie algebras and their representations are used extensively in physics, notably in quantum mechanics and particle physics.

An elementary example (not directly coming from an associative algebra) is the space of three dimensional vectors [math]\displaystyle{ \mathfrak{g}=\mathbb{R}^3 }[/math] with the Lie bracket operation defined by the cross product [math]\displaystyle{ [x,y]=x\times y. }[/math] This is skew-symmetric since [math]\displaystyle{ x\times y = -y\times x }[/math], and instead of associativity it satisfies the Jacobi identity:

[math]\displaystyle{ x\times(y\times z) \ =\ (x\times y)\times z \ +\ y\times(x\times z). }[/math]

This is the Lie algebra of the Lie group of rotations of space, and each vector [math]\displaystyle{ v\in\R^3 }[/math] may be pictured as an infinitesimal rotation around the axis [math]\displaystyle{ v }[/math], with velocity equal to the magnitude of [math]\displaystyle{ v }[/math]. The Lie bracket is a measure of the non-commutativity between two rotations: since a rotation commutes with itself, one has the alternating property [math]\displaystyle{ [x,x]=x\times x = 0 }[/math].

History

Lie algebras were introduced to study the concept of infinitesimal transformations by Marius Sophus Lie in the 1870s,^[1] and independently discovered by Wilhelm Killing^[2] in the 1880s. The name Lie algebra was given by Hermann Weyl in the 1930s; in older texts, the term infinitesimal group is used.

Definitions

Definition of a Lie algebra

A Lie algebra is a vector space [math]\displaystyle{ \,\mathfrak{g} }[/math] over some field [math]\displaystyle{ F }[/math] together with a binary operation [math]\displaystyle{ [\,\cdot\,,\cdot\,]: \mathfrak{g}\times\mathfrak{g}\to\mathfrak{g} }[/math] called the Lie bracket satisfying the following axioms:^{[lower-alpha 1]}

Bilinearity,

[math]\displaystyle{ [a x + b y, z] = a [x, z] + b [y, z], }[/math]

[math]\displaystyle{ [z, a x + b y] = a[z, x] + b [z, y] }[/math]

for all scalars [math]\displaystyle{ a }[/math], [math]\displaystyle{ b }[/math] in [math]\displaystyle{ F }[/math] and all elements [math]\displaystyle{ x }[/math], [math]\displaystyle{ y }[/math], [math]\displaystyle{ z }[/math] in [math]\displaystyle{ \mathfrak{g} }[/math].

Alternativity,

[math]\displaystyle{ [x,x]=0\ }[/math]

for all [math]\displaystyle{ x }[/math] in [math]\displaystyle{ \mathfrak{g} }[/math].

The Jacobi identity,

[math]\displaystyle{ [x,[y,z]] + [y,[z,x]] + [z,[x,y]] = 0 \ }[/math]

for all [math]\displaystyle{ x }[/math], [math]\displaystyle{ y }[/math], [math]\displaystyle{ z }[/math] in [math]\displaystyle{ \mathfrak{g} }[/math].

Using bilinearity to expand the Lie bracket [math]\displaystyle{ [x+y,x+y] }[/math] and using alternativity shows that [math]\displaystyle{ [x,y] + [y,x]=0\ }[/math] for all elements [math]\displaystyle{ x }[/math], [math]\displaystyle{ y }[/math] in [math]\displaystyle{ \mathfrak{g} }[/math], showing that bilinearity and alternativity together imply

Anticommutativity,

[math]\displaystyle{ [x,y] = -[y,x],\ }[/math]

for all elements [math]\displaystyle{ x }[/math], [math]\displaystyle{ y }[/math] in [math]\displaystyle{ \mathfrak{g} }[/math]. If the field's characteristic is not 2 then anticommutativity implies alternativity, since it implies [math]\displaystyle{ [x,x]=-[x,x]. }[/math]^[3]

It is customary to denote a Lie algebra by a lower-case fraktur letter such as [math]\displaystyle{ \mathfrak{g, h, b, n} }[/math]. If a Lie algebra is associated with a Lie group, then the algebra is denoted by the fraktur version of the group: for example the Lie algebra of SU(n) is [math]\displaystyle{ \mathfrak{su}(n) }[/math].

Generators and dimension

Elements of a Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] are said to generate it if the smallest subalgebra containing these elements is [math]\displaystyle{ \mathfrak{g} }[/math] itself. The dimension of a Lie algebra is its dimension as a vector space over [math]\displaystyle{ F }[/math]. The cardinality of a minimal generating set of a Lie algebra is always less than or equal to its dimension.

See the classification of low-dimensional real Lie algebras for other small examples.

Subalgebras, ideals and homomorphisms

The Lie bracket is not required to be associative, meaning that [math]\displaystyle{ x,y],z] }[/math] need not equal [math]\displaystyle{ [x,[y,z }[/math]. Nonetheless, much of the terminology of associative rings and algebras has analogs for Lie algebras. A Lie subalgebra is a linear subspace [math]\displaystyle{ \mathfrak{h} \subseteq \mathfrak{g} }[/math] which is closed under the Lie bracket. An ideal [math]\displaystyle{ \mathfrak i\subseteq\mathfrak{g} }[/math] is a subalgebra satisfying the stronger condition:^[4]

[math]\displaystyle{ [\mathfrak{g},\mathfrak i]\subseteq \mathfrak i. }[/math]

A Lie algebra homomorphism is a linear map compatible with the respective Lie brackets:

[math]\displaystyle{ \phi: \mathfrak{g}\to\mathfrak{g'}, \quad \phi([x,y])=[\phi(x),\phi(y)] \ \text{for all}\ x,y \in \mathfrak g. }[/math]

As for associative rings, ideals are precisely the kernels of homomorphisms; given a Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] and an ideal [math]\displaystyle{ \mathfrak i }[/math] in it, one constructs the factor algebra or quotient algebra [math]\displaystyle{ \mathfrak{g}/\mathfrak i }[/math], and the first isomorphism theorem holds for Lie algebras.

Since the Lie bracket is a kind of infinitesimal commutator of the corresponding Lie group, two elements [math]\displaystyle{ x,y\in\mathfrak g }[/math] are said to commute if their bracket vanishes: [math]\displaystyle{ [x,y]=0 }[/math].

The centralizer subalgebra of a subset [math]\displaystyle{ S\subset \mathfrak{g} }[/math] is the set of elements commuting with [math]\displaystyle{ S }[/math]: that is, [math]\displaystyle{ \mathfrak{z}_{\mathfrak g}(S) = \{x\in\mathfrak g\ \mid\ [x, s] = 0 \ \text{ for all } s\in S\} }[/math]. The centralizer of [math]\displaystyle{ \mathfrak{g} }[/math] itself is the center [math]\displaystyle{ \mathfrak{z}(\mathfrak{g}) }[/math]. Similarly, for a subspace S, the normalizer subalgebra of [math]\displaystyle{ S }[/math] is [math]\displaystyle{ \mathfrak{n}_{\mathfrak g}(S) = \{x\in\mathfrak g\ \mid\ [x,s]\in S \ \text{ for all}\ s\in S\} }[/math].^[5] Equivalently, if [math]\displaystyle{ S }[/math] is a Lie subalgebra, [math]\displaystyle{ \mathfrak{n}_{\mathfrak g}(S) }[/math] is the largest subalgebra such that [math]\displaystyle{ S }[/math] is an ideal of [math]\displaystyle{ \mathfrak{n}_{\mathfrak g}(S) }[/math].

Examples

For [math]\displaystyle{ \mathfrak{d}(2) \subset \mathfrak{gl}(2) }[/math], the commutator of two elements [math]\displaystyle{ g \in \mathfrak{gl}(2) }[/math] and [math]\displaystyle{ d \in \mathfrak{d}(2) }[/math]:

[math]\displaystyle{ \begin{align} \left[ \begin{bmatrix} a & b \\ c & d \end{bmatrix}, \begin{bmatrix} x & 0 \\ 0 & y \end{bmatrix} \right] &= \begin{bmatrix} ax & by\\ cx & dy \\ \end{bmatrix} - \begin{bmatrix} ax & bx\\ cy & dy \\ \end{bmatrix} \\ &= \begin{bmatrix} 0 & b(y-x) \\ c(x-y) & 0 \end{bmatrix} \end{align} }[/math]

shows [math]\displaystyle{ \mathfrak{d}(2) }[/math] is a subalgebra, but not an ideal. In fact, every one-dimensional linear subspace of a Lie algebra has an induced abelian Lie algebra structure, which is generally not an ideal. For any simple Lie algebra, all abelian Lie algebras can never be ideals.

Direct sum and semidirect product

For two Lie algebras [math]\displaystyle{ \mathfrak{g^{}} }[/math] and [math]\displaystyle{ \mathfrak{g'} }[/math], their direct sum Lie algebra is the vector space [math]\displaystyle{ \mathfrak{g}\oplus\mathfrak{g'} }[/math]consisting of all pairs [math]\displaystyle{ \mathfrak{}(x,x'), \,x\in\mathfrak{g}, \ x'\in\mathfrak{g'} }[/math], with the operation

[math]\displaystyle{ [(x,x'),(y,y')]=([x,y],[x',y']), }[/math]

so that the copies of [math]\displaystyle{ \mathfrak g, \mathfrak g' }[/math] commute with each other: [math]\displaystyle{ [(x,0), (0,x')] = 0. }[/math]

Let [math]\displaystyle{ \mathfrak{g} }[/math] be a Lie algebra and [math]\displaystyle{ \mathfrak{i} }[/math] an ideal of [math]\displaystyle{ \mathfrak{g} }[/math]. If the canonical map [math]\displaystyle{ \mathfrak{g} \to \mathfrak{g}/\mathfrak{i} }[/math] splits (i.e., admits a section), then [math]\displaystyle{ \mathfrak{g} }[/math] is said to be a semidirect product of [math]\displaystyle{ \mathfrak{i} }[/math] and [math]\displaystyle{ \mathfrak{g}/\mathfrak{i} }[/math], [math]\displaystyle{ \mathfrak{g}=\mathfrak{g}/\mathfrak{i}\ltimes\mathfrak{i} }[/math]. See also semidirect sum of Lie algebras.

Levi's theorem says that a finite-dimensional Lie algebra over a field of characteristic zero is a semidirect product of its radical and the complementary subalgebra (Levi subalgebra).

Derivations

For an algebra A over a field F, a derivation of A is a linear map [math]\displaystyle{ D\colon A\to A }[/math] that satisfies the Leibniz rule

[math]\displaystyle{ D(xy) = D(x)y + xD(y) }[/math]

for all [math]\displaystyle{ x,y\in A }[/math]. (The definition makes sense for a possibly non-associative algebra.) Given two derivations [math]\displaystyle{ D_1 }[/math] and [math]\displaystyle{ D_2 }[/math], their commutator [math]\displaystyle{ [D_1,D_2]:=D_1D_2-D_2D_1 }[/math] is again a derivation. This operation makes the space [math]\displaystyle{ \text{Der}_k(A) }[/math] of all derivations of A over F into a Lie algebra.^[6]

Informally speaking, the space of derivations of A is the Lie algebra of the automorphism group of A. (This is literally true when the automorphism group is a Lie group, for example when F is the real numbers and A has finite dimension as a vector space.) For this reason, spaces of derivations are a very natural way to construct Lie algebras: they are the "infinitesimal automorphisms" of A. Indeed, writing out the condition that

[math]\displaystyle{ (1+\epsilon D)(xy)=(1+\epsilon D)(x)\cdot (1+\epsilon D)(y) \pmod{\epsilon^2} }[/math]

(where 1 denotes the identity map on A) gives exactly the definition of D being a derivation.

Example: the Lie algebra of vector fields. Let A be the ring [math]\displaystyle{ C^{\infty}(X) }[/math] of smooth functions on a smooth manifold X. Then a derivation of A over R is equivalent to a vector field on X. (A vector field v gives a derivation of the space of smooth functions by differentiating functions in the direction of v.) This makes the space [math]\displaystyle{ \text{Vect}(X) }[/math] of vector fields into a Lie algebra (see Lie bracket of vector fields).^[7] Informally speaking, [math]\displaystyle{ \text{Vect}(X) }[/math] is the Lie algebra of the diffeomorphism group of X. So the Lie bracket of vector fields describes the non-commutativity of the diffeomorphism group. An action of a Lie group G on a manifold X determines a homomorphism of Lie algebras [math]\displaystyle{ \mathfrak{g}\to \text{Vect}(X) }[/math].

A Lie algebra can be viewed as a non-associative algebra, and so each Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] over a field F determines its Lie algebra of derivations, [math]\displaystyle{ \text{Der}_F(\mathfrak{g}) }[/math]. That is, a derivation of [math]\displaystyle{ \mathfrak{g} }[/math] is a linear map [math]\displaystyle{ D\colon \mathfrak{g}\to \mathfrak{g} }[/math] such that

[math]\displaystyle{ D([x,y])=[D(x),y]+[x,D(y)] }[/math].

The inner derivation associated to any [math]\displaystyle{ x\in\mathfrak g }[/math] is the adjoint mapping [math]\displaystyle{ \mathrm{ad}_x }[/math] defined by [math]\displaystyle{ \mathrm{ad}_x(y):=[x,y] }[/math]. (This is a derivation as a consequence of the Jacobi identity.) That gives a homomorphism of Lie algebras, [math]\displaystyle{ \operatorname{ad}\colon\mathfrak{g}\to \text{Der}_F(\mathfrak{g}) }[/math]. The image [math]\displaystyle{ \text{Inn}_F(\mathfrak{g}) }[/math] is an ideal in [math]\displaystyle{ \text{Der}_F(\mathfrak{g}) }[/math], and the Lie algebra of outer derivations is defined as the quotient Lie algebra, [math]\displaystyle{ \text{Out}_F(\mathfrak{g})=\text{Der}_F(\mathfrak{g})/\text{Inn}_F(\mathfrak{g}) }[/math]. (This is exactly analogous to the outer automorphism group of a group.) For a semisimple Lie algebra over a field of characteristic zero, every derivation is inner.

Examples

For example, given a Lie algebra ideal [math]\displaystyle{ \mathfrak{i} \subset \mathfrak{g} }[/math] the adjoint representation [math]\displaystyle{ \mathfrak{ad}_\mathfrak {g} }[/math] of [math]\displaystyle{ \mathfrak{g} }[/math] acts as outer derivations on [math]\displaystyle{ \mathfrak{i} }[/math] since [math]\displaystyle{ [x,i] \subset \mathfrak{i} }[/math] for any [math]\displaystyle{ x \in \mathfrak{g} }[/math] and [math]\displaystyle{ i \in \mathfrak{i} }[/math]. For the Lie algebra [math]\displaystyle{ \mathfrak{b}_n }[/math] of upper triangular matrices in [math]\displaystyle{ \mathfrak{gl}(n) }[/math], it has an ideal [math]\displaystyle{ \mathfrak{n}_n }[/math] of strictly upper triangular matrices (where the only non-zero elements are above the diagonal of the matrix). For instance, the commutator of elements in [math]\displaystyle{ \mathfrak{b}_3 }[/math] and [math]\displaystyle{ \mathfrak{n}_3 }[/math] gives

[math]\displaystyle{ \begin{align} \left[ \begin{bmatrix} a & b & c \\ 0 & d & e \\ 0 & 0 & f \end{bmatrix}, \begin{bmatrix} 0 & x & y \\ 0 & 0 & z \\ 0 & 0 & 0 \end{bmatrix} \right] &= \begin{bmatrix} 0 & ax & ay+bz \\ 0 & 0 & dz \\ 0 & 0 & 0 \end{bmatrix} - \begin{bmatrix} 0 & dx & ex+yf \\ 0 & 0 & fz \\ 0 & 0 & 0 \end{bmatrix} \\ &= \begin{bmatrix} 0 & (a-d)x & (a-f)y-ex+bz \\ 0 & 0 & (d-f)z \\ 0 & 0 & 0 \end{bmatrix} \end{align} }[/math]

shows there exist outer derivations from [math]\displaystyle{ \mathfrak{b}_3 }[/math] in [math]\displaystyle{ \text{Der}(\mathfrak{n}_3) }[/math].

Split Lie algebra

Let V be a finite-dimensional vector space over a field F, [math]\displaystyle{ \mathfrak{gl}(V) }[/math] the Lie algebra of linear transformations and [math]\displaystyle{ \mathfrak{g} \subseteq \mathfrak{gl}(V) }[/math] a Lie subalgebra. Then [math]\displaystyle{ \mathfrak{g} }[/math] is said to be split if the roots of the characteristic polynomials of all linear transformations in [math]\displaystyle{ \mathfrak{g} }[/math] are in the base field F.^[8] More generally, a finite-dimensional Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is said to be split if it has a Cartan subalgebra whose image under the adjoint representation [math]\displaystyle{ \operatorname{ad}: \mathfrak{g} \to \mathfrak{gl}(\mathfrak g) }[/math] is a split Lie algebra. A split real form of a complex semisimple Lie algebra (cf. #Real form and complexification) is an example of a split real Lie algebra. See also split Lie algebra for further information.

Vector space basis

For practical calculations, it is often convenient to choose an explicit vector space basis for the algebra. A common construction for this basis is sketched in the article structure constants.

Definition using category-theoretic notation

Although the definitions above are sufficient for a conventional understanding of Lie algebras, once this is understood, additional insight can be gained by using notation common to category theory, that is, by defining a Lie algebra in terms of linear maps—that is, morphisms of the category of vector spaces—without considering individual elements. (In this section, the field over which the algebra is defined is supposed to be of characteristic different from two.)

For the category-theoretic definition of Lie algebras, two braiding isomorphisms are needed. If $A$ is a vector space, the interchange isomorphism [math]\displaystyle{ \tau: A\otimes A \to A\otimes A }[/math] is defined by

[math]\displaystyle{ \tau(x\otimes y)= y\otimes x. }[/math]

The cyclic-permutation braiding [math]\displaystyle{ \sigma:A\otimes A\otimes A \to A\otimes A\otimes A }[/math] is defined as

[math]\displaystyle{ \sigma=(\mathrm{id}\otimes \tau)\circ(\tau\otimes \mathrm{id}), }[/math]

where [math]\displaystyle{ \mathrm{id} }[/math] is the identity morphism. Equivalently, [math]\displaystyle{ \sigma }[/math] is defined by

[math]\displaystyle{ \sigma(x\otimes y\otimes z)= y\otimes z\otimes x. }[/math]

With this notation, a Lie algebra can be defined as an object [math]\displaystyle{ A }[/math] in the category of vector spaces together with a morphism

[math]\displaystyle{ [\cdot,\cdot]:A\otimes A\rightarrow A }[/math]

that satisfies the two morphism equalities

[math]\displaystyle{ [\cdot,\cdot]\circ(\mathrm{id}+\tau)=0, }[/math]

and

[math]\displaystyle{ [\cdot,\cdot]\circ ([\cdot,\cdot]\otimes \mathrm{id}) \circ (\mathrm{id} +\sigma+\sigma^2)=0. }[/math]

Examples

Vector spaces

Any vector space [math]\displaystyle{ V }[/math] endowed with the identically zero Lie bracket becomes a Lie algebra. Such Lie algebras are called abelian, cf. below. Any one-dimensional Lie algebra over a field of characteristic different from 2 is abelian, by the alternating property of the Lie bracket.

Associative algebra with commutator bracket

On an associative algebra [math]\displaystyle{ A }[/math] over a field [math]\displaystyle{ F }[/math] with multiplication [math]\displaystyle{ (x, y) \mapsto xy }[/math], a Lie bracket may be defined by the commutator [math]\displaystyle{ [x,y] = xy - yx }[/math]. With this bracket, [math]\displaystyle{ A }[/math] is a Lie algebra.^[9] The associative algebra A is called an enveloping algebra of the Lie algebra [math]\displaystyle{ (A, [\,\cdot\, , \cdot \,]) }[/math]. Every Lie algebra can be embedded into one that arises from an associative algebra in this fashion; see universal enveloping algebra.
The associative algebra of the endomorphisms of an F-vector space [math]\displaystyle{ V }[/math] with the above Lie bracket is denoted [math]\displaystyle{ \mathfrak{gl}(V) }[/math].
For a finite dimensional vector space [math]\displaystyle{ V = F^n }[/math], the previous example is exactly the Lie algebra of n × n matrices, denoted [math]\displaystyle{ \mathfrak{gl}(n, F) }[/math] or [math]\displaystyle{ \mathfrak{gl}_n(F) }[/math],^[10] and with bracket [math]\displaystyle{ [X,Y]=XY-YX }[/math] where adjacency indicates matrix multiplication. This is the Lie algebra of the general linear group, consisting of invertible matrices.

Special matrices

Two important subalgebras of [math]\displaystyle{ \mathfrak{gl}_n(F) }[/math] are:

The matrices of trace zero form the special linear Lie algebra [math]\displaystyle{ \mathfrak{sl}_n(F) }[/math], the Lie algebra of the special linear group [math]\displaystyle{ \mathrm{SL}_n(F) }[/math].^[11]
The skew-hermitian matrices form the unitary Lie algebra [math]\displaystyle{ \mathfrak u(n) }[/math], the Lie algebra of the unitary group U(n).

Matrix Lie algebras

A complex matrix group is a Lie group consisting of matrices, [math]\displaystyle{ G\subset M_n(\mathbb{C}) }[/math], where the multiplication of G is matrix multiplication. The corresponding Lie algebra [math]\displaystyle{ \mathfrak g }[/math] is the space of matrices which are tangent vectors to G inside the linear space [math]\displaystyle{ M_n(\mathbb{C}) }[/math]: this consists of derivatives of smooth curves in G at the identity:

[math]\displaystyle{ \mathfrak{g} = \{ X = c'(0) \in M_n(\mathbb{C}) \ \mid\ \text{ smooth } c : \mathbb{R}\to G, \ c(0) = I \}. }[/math]

The Lie bracket of [math]\displaystyle{ \mathfrak{g} }[/math] is given by the commutator of matrices, [math]\displaystyle{ [X,Y]=XY-YX }[/math]. Given the Lie algebra, one can recover the Lie group as the image of the matrix exponential mapping [math]\displaystyle{ \exp: M_n(\mathbb{C})\to M_n(\mathbb{C}) }[/math] defined by [math]\displaystyle{ \exp(X) = I + X + \tfrac{1}{2!}X^2+\cdots }[/math], which converges for every matrix [math]\displaystyle{ X }[/math]: that is, [math]\displaystyle{ G=\exp(\mathfrak g) }[/math].

The following are examples of Lie algebras of matrix Lie groups:^[12]

The special linear group [math]\displaystyle{ {\rm SL}_n(\mathbb{C}) }[/math], consisting of all $n \times n$ matrices with determinant 1. Its Lie algebra [math]\displaystyle{ \mathfrak{sl}_n(\mathbb{C}) }[/math] consists of all $n \times n$ matrices with complex entries and trace 0. Similarly, one can define the corresponding real Lie group [math]\displaystyle{ {\rm SL}_n(\mathbb{R}) }[/math] and its Lie algebra [math]\displaystyle{ \mathfrak{sl}_n(\mathbb{R}) }[/math].
The unitary group [math]\displaystyle{ U(n) }[/math] consists of n × n unitary matrices (satisfying [math]\displaystyle{ U^*=U^{-1} }[/math]). Its Lie algebra [math]\displaystyle{ \mathfrak{u}(n) }[/math] consists of skew-self-adjoint matrices ([math]\displaystyle{ X^*=-X }[/math]).
The special orthogonal group [math]\displaystyle{ \mathrm{SO}(n) }[/math], consisting of real determinant-one orthogonal matrices ([math]\displaystyle{ A^{\mathrm{T}}=A^{-1} }[/math]). Its Lie algebra [math]\displaystyle{ \mathfrak{so}(n) }[/math] consists of real skew-symmetric matrices ([math]\displaystyle{ X^{\rm T}=-X }[/math]). The full orthogonal group [math]\displaystyle{ \mathrm{O}(n) }[/math], without the determinant-one condition, consists of [math]\displaystyle{ \mathrm{SO}(n) }[/math] and a separate connected component, so it has the same Lie algebra as [math]\displaystyle{ \mathrm{SO}(n) }[/math]. See also infinitesimal rotations with skew-symmetric matrices. Similarly, one can define a complex version of this group and algebra, simply by allowing complex matrix entries.

Two dimensions

On any field [math]\displaystyle{ F }[/math] there is, up to isomorphism, a single two-dimensional nonabelian Lie algebra. With generators x, y, its bracket is defined as [math]\displaystyle{ \left [x, y\right ] = y }[/math]. It generates the affine group in one dimension.

This can be realized by the matrices:

[math]\displaystyle{ x= \left( \begin{array}{cc} 1 & 0\\ 0 & 0 \end{array}\right), \qquad y= \left( \begin{array}{cc} 0 & 1\\ 0 & 0 \end{array}\right). }[/math]

Since

[math]\displaystyle{ \left( \begin{array}{cc} 1 & c\\ 0 & 0 \end{array}\right)^{n+1} = \left( \begin{array}{cc} 1 & c\\ 0 & 0 \end{array}\right) }[/math]

for any natural number [math]\displaystyle{ n }[/math] and any [math]\displaystyle{ c }[/math], one sees that the resulting Lie group elements are upper triangular 2×2 matrices with unit lower diagonal:

[math]\displaystyle{ \exp(a\cdot{}x+b\cdot{}y)= \left( \begin{array}{cc} e^a & \tfrac{b}{a}(e^a-1)\\ 0 & 1 \end{array}\right) = 1 + \tfrac{e^a-1}{a}\left(a\cdot{}x+b\cdot{}y\right). }[/math]

Three dimensions

The Heisenberg algebra [math]\displaystyle{ {\rm H}_3(\mathbb{R}) }[/math] is a three-dimensional Lie algebra generated by elements $x$ , $y$ , and $z$ with Lie brackets

[math]\displaystyle{ [x,y] = z,\quad [x,z] = 0, \quad [y,z] = 0 }[/math].

It is usually realized as the space of 3×3 strictly upper-triangular matrices, with the commutator Lie bracket and the basis

[math]\displaystyle{ x = \left( \begin{array}{ccc} 0&1&0\\ 0&0&0\\ 0&0&0 \end{array}\right),\quad y = \left( \begin{array}{ccc} 0&0&0\\ 0&0&1\\ 0&0&0 \end{array}\right),\quad z = \left( \begin{array}{ccc} 0&0&1\\ 0&0&0\\ 0&0&0 \end{array}\right)~.\quad }[/math]

Any element of the Heisenberg group has a representation as a product of group generators, i.e., matrix exponentials of these Lie algebra generators,

[math]\displaystyle{ \left( \begin{array}{ccc} 1&a&c\\ 0&1&b\\ 0&0&1 \end{array}\right)= e^{by} e^{cz} e^{ax}~. }[/math]

The Lie algebra [math]\displaystyle{ \mathfrak{so}(3) }[/math] of the group SO(3) is spanned by the three matrices^[13]

[math]\displaystyle{ F_1 = \left( \begin{array}{ccc} 0&0&0\\ 0&0&-1\\ 0&1&0 \end{array}\right),\quad F_2 = \left( \begin{array}{ccc} 0&0&1\\ 0&0&0\\ -1&0&0 \end{array}\right),\quad F_3 = \left( \begin{array}{ccc} 0&-1&0\\ 1&0&0\\ 0&0&0 \end{array}\right)~.\quad }[/math]

The commutation relations among these generators are

[math]\displaystyle{ [F_1, F_2] = F_3, }[/math]

[math]\displaystyle{ [F_2, F_3] = F_1, }[/math]

[math]\displaystyle{ [F_3, F_1] = F_2. }[/math]

The three-dimensional Euclidean space [math]\displaystyle{ \mathbb{R}^3 }[/math] with the Lie bracket given by the cross product of vectors has the same commutation relations as above: thus, it is isomorphic to [math]\displaystyle{ \mathfrak{so}(3) }[/math]. This Lie algebra is unitarily equivalent to the usual Spin angular-momentum component operators for spin-1 particles in quantum mechanics.

Infinite dimensions

Kac–Moody algebras are a large class of infinite-dimensional Lie algebras whose structure is very similar to the finite-dimensional cases above.
The Moyal algebra is an infinite-dimensional Lie algebra that contains all classical Lie algebras as subalgebras.
The Virasoro algebra is of paramount importance in string theory.

Representations

Main page: Lie algebra representation

Definitions

Given a vector space V, let [math]\displaystyle{ \mathfrak{gl}(V) }[/math] denote the Lie algebra consisting of all linear endomorphisms of V, with bracket given by [math]\displaystyle{ [X,Y]=XY-YX }[/math]. A representation of a Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] on V is a Lie algebra homomorphism

[math]\displaystyle{ \pi: \mathfrak g \to \mathfrak{gl}(V). }[/math]

A representation is said to be faithful if its kernel is zero. Ado's theorem^[14] states that every finite-dimensional Lie algebra over a field of characteristic zero has a faithful representation on a finite-dimensional vector space.

Adjoint representation

For any Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math], the adjoint representation is the representation

[math]\displaystyle{ \operatorname{ad}\colon\mathfrak{g} \to \mathfrak{gl}(\mathfrak{g}) }[/math]

given by [math]\displaystyle{ \operatorname{ad}(x)(y) = [x, y] }[/math].

Goals of representation theory

One important aspect of the study of Lie algebras (especially semisimple Lie algebras) is the study of their representations. (Indeed, most of the books listed in the references section devote a substantial fraction of their pages to representation theory.) Although Ado's theorem is an important result, the primary goal of representation theory is not to find a faithful representation of a given Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math]. Indeed, in the semisimple case, the adjoint representation is already faithful. Rather the goal is to understand all possible representations of [math]\displaystyle{ \mathfrak{g} }[/math], up to the natural notion of equivalence. In the semisimple case over a field of characteristic zero, Weyl's theorem^[15] says that every finite-dimensional representation is a direct sum of irreducible representations (those with no nontrivial invariant subspaces). The irreducible representations, in turn, are classified by a theorem of the highest weight.

Representation theory in physics

The representation theory of Lie algebras plays an important role in various parts of theoretical physics. There, one considers operators on the space of states that satisfy certain natural commutation relations. These commutation relations typically come from a symmetry of the problem—specifically, they are the relations of the Lie algebra of the relevant symmetry group. An example would be the angular momentum operators, whose commutation relations are those of the Lie algebra [math]\displaystyle{ \mathfrak{so}(3) }[/math] of the rotation group SO(3). Typically, the space of states is very far from being irreducible under the pertinent operators, but one can attempt to decompose it into irreducible pieces. In doing so, one needs to know the irreducible representations of the given Lie algebra. In the study of the quantum hydrogen atom, for example, quantum mechanics textbooks give (without calling it that) a classification of the irreducible representations of the Lie algebra [math]\displaystyle{ \mathfrak{so}(3) }[/math].

Structure theory and classification

Lie algebras can be classified to some extent. In particular, this has an application to the classification of Lie groups.

Abelian, nilpotent, and solvable

Analogously to abelian, nilpotent, and solvable groups, defined in terms of the derived subgroups, one can define abelian, nilpotent, and solvable Lie algebras.

A Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is abelian if the Lie bracket vanishes, i.e. [x,y] = 0, for all x and y in [math]\displaystyle{ \mathfrak{g} }[/math]. Abelian Lie algebras correspond to commutative (or abelian) connected Lie groups such as vector spaces [math]\displaystyle{ \mathbb{K}^n }[/math] or tori [math]\displaystyle{ \mathbb{T}^n }[/math], and are all of the form [math]\displaystyle{ \mathfrak{k}^n, }[/math] meaning an n-dimensional vector space with the trivial Lie bracket.

A more general class of Lie algebras is defined by the vanishing of all commutators of given length. A Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is nilpotent if the lower central series

[math]\displaystyle{ \mathfrak{g} \gt [\mathfrak{g},\mathfrak{g}] \gt [[\mathfrak{g},\mathfrak{g}],\mathfrak{g}] \gt [[[\mathfrak{g},\mathfrak{g}],\mathfrak{g}],\mathfrak{g}] \gt \cdots }[/math]

becomes zero eventually. By Engel's theorem, a Lie algebra is nilpotent if and only if for every u in [math]\displaystyle{ \mathfrak{g} }[/math] the adjoint endomorphism

[math]\displaystyle{ \operatorname{ad}(u):\mathfrak{g} \to \mathfrak{g}, \quad \operatorname{ad}(u)v=[u,v] }[/math]

is nilpotent.

More generally still, a Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is said to be solvable if the derived series:

[math]\displaystyle{ \mathfrak{g} \gt [\mathfrak{g},\mathfrak{g}] \gt \mathfrak{g},\mathfrak{g}],[\mathfrak{g},\mathfrak{g} \gt [\mathfrak{g},\mathfrak{g}],[\mathfrak{g},\mathfrak{g},\mathfrak{g},\mathfrak{g}],[\mathfrak{g},\mathfrak{g}] \gt \cdots }[/math]

becomes zero eventually.

The second term [math]\displaystyle{ [\mathfrak{g},\mathfrak{g}] }[/math] in the derived series (or, equivalently, the second term in the lower central series) is called the commutator subalgebra or commutator ideal of [math]\displaystyle{ \mathfrak{g} }[/math].

Every finite-dimensional Lie algebra has a unique maximal solvable ideal, called its radical. Under the Lie correspondence, nilpotent (respectively, solvable) connected Lie groups correspond to nilpotent (respectively, solvable) Lie algebras.

Simple and semisimple

Main page: Semisimple Lie algebra

A Lie algebra is "simple" if it has no non-trivial ideals and is not abelian. (This implies that a one-dimensional—necessarily abelian—Lie algebra is by definition not simple, even though it has no nontrivial ideals.) A Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is called semisimple if it is isomorphic to a direct sum of simple algebras. There are several equivalent characterizations of semisimple algebras, such as having no nonzero solvable ideals.

The concept of semisimplicity for Lie algebras is closely related with the complete reducibility (semisimplicity) of their representations. When the ground field F has characteristic zero, any finite-dimensional representation of a semisimple Lie algebra is semisimple (i.e., direct sum of irreducible representations). In general, a Lie algebra is called reductive if the adjoint representation is semisimple. Thus, a semisimple Lie algebra is reductive.

Cartan's criterion

Cartan's criterion gives conditions for a Lie algebra of characteristic zero to be nilpotent, solvable, or semisimple. It is based on the notion of the Killing form, a symmetric bilinear form on [math]\displaystyle{ \mathfrak{g} }[/math] defined by the formula

[math]\displaystyle{ K(u,v)=\operatorname{tr}(\operatorname{ad}(u)\operatorname{ad}(v)), }[/math]

where tr denotes the trace of a linear operator. A Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is semisimple if and only if the Killing form is nondegenerate. A Lie algebra [math]\displaystyle{ \mathfrak{g} }[/math] is solvable if and only if [math]\displaystyle{ K(\mathfrak{g},[\mathfrak{g},\mathfrak{g}])=0. }[/math]

Classification

The Levi decomposition expresses an arbitrary Lie algebra as a semidirect sum of its solvable radical and a semisimple Lie algebra, almost in a canonical way. (Such a decomposition exists for a finite-dimensional Lie algebra over a field of characteristic zero.^[16]) Furthermore, semisimple Lie algebras over an algebraically closed field of characteristic zero have been completely classified through their root systems.

Relation to Lie groups

Main page: Lie group–Lie algebra correspondence

The tangent space of a sphere at a point [math]\displaystyle{ x }[/math]. If [math]\displaystyle{ x }[/math] is the identity element, then the tangent space is also a Lie algebra.

Although Lie algebras are often studied in their own right, historically they arose as a means to study Lie groups.

We now briefly outline the relationship between Lie groups and Lie algebras. Any Lie group gives rise to a canonically determined Lie algebra over R (concretely, the tangent space at the identity). Conversely, for any finite-dimensional Lie algebra [math]\displaystyle{ \mathfrak g }[/math], there exists a corresponding connected Lie group [math]\displaystyle{ G }[/math] with Lie algebra [math]\displaystyle{ \mathfrak g }[/math]. This is Lie's third theorem; see the Baker–Campbell–Hausdorff formula. This Lie group is not determined uniquely; however, any two Lie groups with the same Lie algebra are locally isomorphic, and in particular, have the same universal cover. For instance, the special orthogonal group SO(3) and the special unitary group SU(2) give rise to the same Lie algebra, which is isomorphic to [math]\displaystyle{ \mathbb{R}^3 }[/math] with the cross-product, but SU(2) is a simply-connected twofold cover of SO(3).

If we consider simply connected Lie groups, however, we have a one-to-one correspondence: For each (finite-dimensional real) Lie algebra [math]\displaystyle{ \mathfrak g }[/math], there is a unique simply connected Lie group [math]\displaystyle{ G }[/math] with Lie algebra [math]\displaystyle{ \mathfrak g }[/math].

The correspondence between Lie algebras and Lie groups is used in several ways, including in the classification of Lie groups and the related matter of the representation theory of Lie groups. Every representation of a Lie algebra lifts uniquely to a representation of the corresponding simply connected Lie group, and conversely every representation of any Lie group induces a representation of the group's Lie algebra; the representations are in one-to-one correspondence. Therefore, knowing the representations of a Lie algebra settles the question of representations of the group.

As for classification, it can be shown that any connected Lie group with a given Lie algebra is isomorphic to the universal cover mod a discrete central subgroup. So classifying Lie groups becomes simply a matter of counting the discrete subgroups of the center, once the classification of Lie algebras is known (solved by Cartan et al. in the semisimple case).

If the Lie algebra is infinite-dimensional, the issue is more subtle. In many instances, the exponential map is not even locally a homeomorphism (for example, in Diff(S¹), one may find diffeomorphisms arbitrarily close to the identity that are not in the image of exp). Furthermore, some infinite-dimensional Lie algebras are not the Lie algebra of any group.

Real form and complexification

Given a complex Lie algebra [math]\displaystyle{ \mathfrak g }[/math], a real Lie algebra [math]\displaystyle{ \mathfrak{g}_0 }[/math] is said to be a real form of [math]\displaystyle{ \mathfrak g }[/math] if the complexification [math]\displaystyle{ \mathfrak{g}_0 \otimes_{\mathbb R} \mathbb{C} \simeq \mathfrak{g} }[/math] is isomorphic to [math]\displaystyle{ \mathfrak{g} }[/math].^[17] A real form need not be unique; for example, [math]\displaystyle{ \mathfrak{sl}_2 \mathbb{C} }[/math] has two real forms, [math]\displaystyle{ \mathfrak{sl}_2 \mathbb{R} }[/math] and [math]\displaystyle{ \mathfrak{su}_2 }[/math].^[17]

Given a semisimple finite-dimensional complex Lie algebra [math]\displaystyle{ \mathfrak g }[/math], a split form of it is a real form that splits; i.e., it has a Cartan subalgebra which acts via an adjoint representation with real eigenvalues. A split form exists and is unique (up to isomorphisms).^[17] A compact form is a real form that is the Lie algebra of a compact Lie group. A compact form exists and is also unique.^[17]

Lie algebra with additional structures

A Lie algebra can be equipped with some additional structures that are assumed to be compatible with the bracket. For example, a graded Lie algebra is a Lie algebra with a graded vector space structure. If it also comes with a differential (so that the underlying graded vector space is a chain complex), then it is called a differential graded Lie algebra.

A simplicial Lie algebra is a simplicial object in the category of Lie algebras; in other words, it is obtained by replacing the underlying set with a simplicial set (so it might be better thought of as a family of Lie algebras).

Lie ring

A Lie ring arises as a generalisation of Lie algebras, or through the study of the lower central series of groups. A Lie ring is defined as a nonassociative ring with multiplication that is anticommutative and satisfies the Jacobi identity. More specifically we can define a Lie ring [math]\displaystyle{ L }[/math] to be an abelian group with an operation [math]\displaystyle{ [\cdot,\cdot] }[/math] that has the following properties:

Bilinearity:

[math]\displaystyle{ [x + y, z] = [x, z] + [y, z], \quad [z, x + y] = [z, x] + [z, y] }[/math]

for all x, y, z ∈ L.

The Jacobi identity:

[math]\displaystyle{ [x,[y,z]] + [y,[z,x]] + [z,[x,y]] = 0 \quad }[/math]

for all x, y, z in L.

For all x in L:

[math]\displaystyle{ [x,x]=0. }[/math]

Lie rings need not be Lie groups under addition. Any Lie algebra is an example of a Lie ring. Any associative ring can be made into a Lie ring by defining a bracket operator [math]\displaystyle{ [x,y] = xy - yx }[/math]. Conversely to any Lie algebra there is a corresponding ring, called the universal enveloping algebra.

Lie rings are used in the study of finite p-groups through the Lazard correspondence. The lower central factors of a p-group are finite abelian p-groups, so modules over Z/pZ. The direct sum of the lower central factors is given the structure of a Lie ring by defining the bracket to be the commutator of two coset representatives. The Lie ring structure is enriched with another module homomorphism, the pth power map, making the associated Lie ring a so-called restricted Lie ring.

Lie rings are also useful in the definition of a p-adic analytic groups and their endomorphisms by studying Lie algebras over rings of integers such as the p-adic integers. The definition of finite groups of Lie type due to Chevalley involves restricting from a Lie algebra over the complex numbers to a Lie algebra over the integers, and then reducing modulo p to get a Lie algebra over a finite field.

Examples

Any Lie algebra over a general ring instead of a field is an example of a Lie ring. Lie rings are not Lie groups under addition, despite the name.
Any associative ring can be made into a Lie ring by defining a bracket operator

[math]\displaystyle{ [x,y] = xy - yx. }[/math]

For an example of a Lie ring arising from the study of groups, let [math]\displaystyle{ G }[/math] be a group with [math]\displaystyle{ [x,y]= x^{-1}y^{-1}xy }[/math] the commutator operation, and let [math]\displaystyle{ G = G_0 \supseteq G_1 \supseteq G_2 \supseteq \cdots \supseteq G_n \supseteq \cdots }[/math] be a central series in [math]\displaystyle{ G }[/math] — that is the commutator subgroup [math]\displaystyle{ [G_i,G_j] }[/math] is contained in [math]\displaystyle{ G_{i+j} }[/math] for any [math]\displaystyle{ i,j }[/math]. Then

[math]\displaystyle{ L = \bigoplus G_i/G_{i+1} }[/math]

is a Lie ring with addition supplied by the group operation (which is abelian in each homogeneous part), and the bracket operation given by

[math]\displaystyle{ [xG_i, yG_j] = [x,y]G_{i+j}\ }[/math]

extended linearly. The centrality of the series ensures that the commutator [math]\displaystyle{ [x,y] }[/math] gives the bracket operation the appropriate Lie theoretic properties.

Remarks

↑ (Bourbaki 1989) allows more generally for a module over a commutative ring; in this article, this is called a Lie ring.

References

↑ O'Connor & Robertson 2000
↑ O'Connor & Robertson 2005
↑ Humphreys 1978, p. 1
↑ Due to the anticommutativity of the commutator, the notions of a left and right ideal in a Lie algebra coincide.
↑ Jacobson 1962, p. 28
↑ Humphreys 1978, p. 4
↑ Varadarajan 2004, p. 49
↑ Jacobson 1962, p. 42
↑ Bourbaki 1989, §1.2. Example 1.
↑ Bourbaki 1989, §1.2. Example 2.
↑ Humphreys 1978, p. 2
↑ Hall 2015, §3.4
↑ Hall 2015, Example 3.27
↑ Jacobson 1962, Ch. VI
↑ Hall 2015, Theorem 10.9
↑ Jacobson 1962, Ch. III, § 9.
↑ ^17.0 ^17.1 ^17.2 ^17.3 Fulton & Harris 1991, §26.1.

Sources

Beltiţă, Daniel (2006). Smooth Homogeneous Structures in Operator Theory. CRC Monographs and Surveys in Pure and Applied Mathematics. 137. CRC Press. ISBN 978-1-4200-3480-6. https://books.google.com/books?id=x8NQc-pWbLQC&q=%22Lie+algebra%22.
Boza, Luis; Fedriani, Eugenio M.; Núñez, Juan (2001-06-01). "A new method for classifying complex filiform Lie algebras". Applied Mathematics and Computation 121 (2–3): 169–175. doi:10.1016/s0096-3003(99)00270-2. ISSN 0096-3003.
Bourbaki, Nicolas (1989). Lie Groups and Lie Algebras: Chapters 1-3. Springer. ISBN 978-3-540-64242-8. https://books.google.com/books?id=brSYF_rB2ZcC.
Erdmann, Karin; Wildon, Mark (2006). Introduction to Lie Algebras. Springer. ISBN 1-84628-040-0.
Fulton, William; Harris, Joe (1991) (in en-gb). Representation theory. A first course. Graduate Texts in Mathematics, Readings in Mathematics. 129. New York: Springer-Verlag. doi:10.1007/978-1-4612-0979-9. ISBN 978-0-387-97495-8. OCLC 246650103. https://link.springer.com/10.1007/978-1-4612-0979-9.
Hall, Brian C. (2015). Lie groups, Lie algebras, and Representations: An Elementary Introduction. Graduate Texts in Mathematics. 222 (2nd ed.). Springer. doi:10.1007/978-3-319-13467-3. ISBN 978-3319134666.
Hofmann, Karl H.; Morris, Sidney A (2007). The Lie Theory of Connected Pro-Lie Groups. European Mathematical Society. ISBN 978-3-03719-032-6.
Humphreys, James E. (1978). Introduction to Lie Algebras and Representation Theory. Graduate Texts in Mathematics. 9 (2nd ed.). Springer-Verlag. ISBN 978-0-387-90053-7. https://archive.org/details/introductiontoli00jame.
Jacobson, Nathan (1979). Lie algebras. Dover. ISBN 978-0-486-63832-4.
Kac, Victor G.. Course notes for MIT 18.745: Introduction to Lie Algebras. http://math.mit.edu/~lesha/745lec/.
Mubarakzyanov, G.M. (1963). "On solvable Lie algebras" (in ru). Izv. Vys. Ucheb. Zaved. Matematika 1 (32): 114–123. http://mi.mathnet.ru/eng/ivm2141.
O'Connor, J.J; Robertson, E.F. (2000). "Biography of Sophus Lie". MacTutor History of Mathematics Archive. http://www-history.mcs.st-andrews.ac.uk/Mathematicians/Lie.html.
O'Connor, J.J; Robertson, E.F. (2005). "Biography of Wilhelm Killing". MacTutor History of Mathematics Archive. http://www-history.mcs.st-andrews.ac.uk/Mathematicians/Killing.html.
Popovych, R.O. et al. (2003). "Realizations of real low-dimensional Lie algebras". J. Phys. A: Math. Gen. 36 (26): 7337–60. doi:10.1088/0305-4470/36/26/309. Bibcode: 2003JPhA...36.7337P.
Serre, Jean-Pierre (2006). Lie Algebras and Lie Groups (2nd ed.). Springer. ISBN 978-3-540-55008-2.
Steeb, Willi-Hans (2007). Continuous Symmetries, Lie Algebras, Differential Equations and Computer Algebra (2nd ed.). World Scientific. doi:10.1142/6515. ISBN 978-981-270-809-0.
Varadarajan, Veeravalli S. (2004). Lie Groups, Lie Algebras, and Their Representations (1st ed.). Springer. ISBN 978-0-387-90969-1.

External links

Hazewinkel, Michiel, ed. (2001), "Lie algebra", Encyclopedia of Mathematics, Springer Science+Business Media B.V. / Kluwer Academic Publishers, ISBN 978-1-55608-010-4, https://www.encyclopediaofmath.org/index.php?title=p/l058370
McKenzie, Douglas (2015). "An Elementary Introduction to Lie Algebras for Physicists". http://www.liealgebrasintro.com.

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Original source: https://en.wikipedia.org/wiki/Lie algebra. Read more

[3] (Bourbaki 1989) allows more generally for a module over a commutative ring; in this article, this is called a Lie ring.

[1] O'Connor & Robertson 2000

[2] O'Connor & Robertson 2005

[4] Humphreys 1978, p. 1

[5] Due to the anticommutativity of the commutator, the notions of a left and right ideal in a Lie algebra coincide.

[6] Jacobson 1962, p. 28

[7] Humphreys 1978, p. 4

[8] Varadarajan 2004, p. 49

[9] Jacobson 1962, p. 42

[10] Bourbaki 1989, §1.2. Example 1.

[11] Bourbaki 1989, §1.2. Example 2.

[12] Humphreys 1978, p. 2

[13] Hall 2015, §3.4

[14] Hall 2015, Example 3.27

[15] Jacobson 1962, Ch. VI

[16] Hall 2015, Theorem 10.9

[17] Jacobson 1962, Ch. III, § 9.

[Fulton_26-18] 17.0 ^17.1 ^17.2 ^17.3 Fulton & Harris 1991, §26.1.

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