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In the mathematical field of representation theory, a Lie algebra representation or representation of a Lie algebra is a way of writing a Lie algebra as a set of matrices (or endomorphisms of a vector space) in such a way that the Lie bracket is given by the commutator.

The notion is closely related to that of a representation of a Lie group. Roughly speaking, the representations of Lie algebras are the differentiated form of representations of Lie groups, while the representations of the universal cover of a Lie group are the integrated form of the representations of its Lie algebra.

In the study of representations of a Lie algebra, a particular ring, called the universal enveloping algebra, associated with the Lie algebra plays a decisive role. The universality of this construction of this ring says that the category of representations of a Lie algebra is the same as the category of modules over its enveloping algebra.

Formal definition

A representation of a Lie algebra ${\displaystyle \mathfrak{g}}$ is a Lie algebra homomorphism

${\displaystyle \rho :\mathfrak{g}\to \mathfrak{g}\mathfrak{l}(V)}$

from ${\displaystyle \mathfrak{g}}$ to the Lie algebra of endomorphisms on a vector space V (with the commutator as the Lie bracket), sending an element x of ${\displaystyle \mathfrak{g}}$ to an element ρ_x of ${\displaystyle \mathfrak{g}\mathfrak{l}(V)}$.

Explicitly, this means that

${\displaystyle {\rho }_{[x,y]}=[{\rho }_x,{\rho }_y]={\rho }_x{\rho }_y-{\rho }_y{\rho }_x}$

for all x,y in ${\displaystyle \mathfrak{g}}$. The vector space V, together with the representation ρ, is called a ${\displaystyle \mathfrak{g}}$-module. (Many authors abuse terminology and refer to V itself as the representation).

The representation ${\displaystyle \rho }$ is said to be faithful if it is injective.

One can equivalently define a ${\displaystyle \mathfrak{g}}$-module as a vector space V together with a bilinear map ${\displaystyle \mathfrak{g}\times V\to V}$ such that

${\displaystyle [x,y]\cdot v=x\cdot (y\cdot v)-y\cdot (x\cdot v)}$

for all x,y in ${\displaystyle \mathfrak{g}}$ and v in V. This is related to the previous definition by setting x ⋅ v = ρ_x (v).

Examples

Adjoint representations

Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. The most basic example of a Lie algebra representation is the adjoint representation of a Lie algebra ${\displaystyle \mathfrak{g}}$ on itself:

${\displaystyle \text{<mrow data-mjx-texclass="ORD">ad</mrow>}:\mathfrak{g}\to \mathfrak{g}\mathfrak{l}(\mathfrak{g}),x\mapsto {\mathrm{ad}}_x,{\mathrm{ad}}_x(y)=[x,y].}$

Indeed, by virtue of the Jacobi identity, ${\displaystyle \mathrm{ad}}$ is a Lie algebra homomorphism.

Infinitesimal Lie group representations

A Lie algebra representation also arises in nature. If φ: G → H is a homomorphism of (real or complex) Lie groups, and ${\displaystyle \mathfrak{g}}$ and ${\displaystyle \mathfrak{h}}$ are the Lie algebras of G and H respectively, then the differential ${\displaystyle d\varphi :\mathfrak{g}\to \mathfrak{h}}$ on tangent spaces at the identities is a Lie algebra homomorphism. In particular, for a finite-dimensional vector space V, a representation of Lie groups

${\displaystyle \varphi :G\to \mathrm{G}\mathrm{L}(V)}$

determines a Lie algebra homomorphism

${\displaystyle d\varphi :\mathfrak{g}\to \mathfrak{g}\mathfrak{l}(V)}$

from ${\displaystyle \mathfrak{g}}$ to the Lie algebra of the general linear group GL(V), i.e. the endomorphism algebra of V.

For example, let ${\displaystyle c_g(x)=gx{g}^{-1}}$. Then the differential of ${\displaystyle c_g:G\to G}$ at the identity is an element of ${\displaystyle \mathrm{G}\mathrm{L}(\mathfrak{g})}$. Denoting it by ${\displaystyle \mathrm{Ad}(g)}$ one obtains a representation ${\displaystyle \mathrm{Ad}}$ of G on the vector space ${\displaystyle \mathfrak{g}}$. Applying the preceding, one gets the Lie algebra representation ${\displaystyle d\mathrm{Ad}}$. It can be shown that ${\displaystyle d\mathrm{Ad}=\mathrm{ad}.}$

A partial converse to this statement says that every representation of a finite-dimensional (real or complex) Lie algebra lifts to a unique representation of the associated simply connected Lie group, so that representations of simply-connected Lie groups are in one-to-one correspondence with representations of their Lie algebras.

Basic concepts

Let ${\displaystyle \mathfrak{g}}$ be a Lie algebra. Let V, W be ${\displaystyle \mathfrak{g}}$-modules. Then a linear map ${\displaystyle f:V\to W}$ is a homomorphism of ${\displaystyle \mathfrak{g}}$-modules if it is ${\displaystyle \mathfrak{g}}$-equivariant; i.e., ${\displaystyle f(xv)=xf(v)}$ for any ${\displaystyle x\in \mathfrak{g},v\in V}$. If f is bijective, ${\displaystyle V,W}$ are said to be equivalent. Similarly, many other constructions from module theory in abstract algebra carry over to this setting: submodule, quotient, subquotient, direct sum, Jordan-Hölder series, etc.

Let V be a ${\displaystyle \mathfrak{g}}$-module. Then V is said to be semisimple or completely reducible if it satisfies the following equivalent conditions: (cf. semisimple module)

1. V is a direct sum of simple modules.
2. V is the sum of its simple submodules.
3. Every submodule of V is a direct summand: for every submodule W of V, there is a complement P such that V = W ⊕ P.

If ${\displaystyle \mathfrak{g}}$ is a finite-dimensional semisimple Lie algebra over a field of characteristic zero and V is finite-dimensional, then V is semisimple (Weyl's complete reducibility theorem).^[1] A Lie algebra is said to be reductive if the adjoint representation is semisimple. Thus, a semisimple Lie algebra is reductive. An element v of V is said to be ${\displaystyle \mathfrak{g}}$-invariant if ${\displaystyle xv=v}$ for all ${\displaystyle x\in \mathfrak{g}}$. The set of all invariant elements is denoted by ${\displaystyle V^{\mathfrak{g}}}$. ${\displaystyle V\mapsto V^{\mathfrak{g}}}$ is a left-exact functor.

Basic constructions

If we have two representations, with V₁ and V₂ as their underlying vector spaces and ·[·]₁ and ·[·]₂ as the representations, then the product of both representations would have V₁ ⊗ V₂ as the underlying vector space and

${\displaystyle x[v_1\otimes v_2]=x[v_1]\otimes v_2+v_1\otimes x[v_2].}$

If L is a real Lie algebra and ρ: L × V→ V is a complex representation of it, we can construct another representation of L called its dual representation as follows.

Let V^∗ be the dual vector space of V. In other words, V^∗ is the set of all linear maps from V to C with addition defined over it in the usual linear way, but scalar multiplication defined over it such that ${\displaystyle (z\omega )[X]=\overline{z}\omega [X]}$ for any z in C, ω in V^∗ and X in V. This is usually rewritten as a contraction with a sesquilinear form ⟨·,·⟩. i.e. ⟨ω,X⟩ is defined to be ω[X].

We define ${\displaystyle \overline{\rho }}$ as follows:

⟨${\displaystyle \overline{\rho }}$(A)[ω],X⟩ + ⟨ω, ρA[X]⟩ = 0,

for any A in L, ω in V^∗ and X in V. This defines ${\displaystyle \overline{\rho }}$ uniquely.

Let ${\displaystyle V,W}$ be ${\displaystyle \mathfrak{g}}$-modules, ${\displaystyle \mathfrak{g}}$ a Lie algebra. Then ${\displaystyle \mathrm{Hom}(V,W)}$ becomes a ${\displaystyle \mathfrak{g}}$-module by setting ${\displaystyle (x\cdot f)(v)=xf(v)-f(xv)}$. In particular, ${\displaystyle {\mathrm{Hom}}_{\mathfrak{g}}(V,W)=\mathrm{Hom}(V,W{)}^{\mathfrak{g}}}$. Since any field becomes a ${\displaystyle \mathfrak{g}}$-module with a trivial action, taking W to be the base field, the dual vector space ${\displaystyle V^{*}}$ becomes a ${\displaystyle \mathfrak{g}}$-module.

Enveloping algebras

To each Lie algebra ${\displaystyle \mathfrak{g}}$ over a field k, one can associate a certain ring called the universal enveloping algebra of ${\displaystyle \mathfrak{g}}$. The construction is universal and consequently (along with the PBW theorem) representations of ${\displaystyle \mathfrak{g}}$ corresponds in one-to-one with algebra representations of universal enveloping algebra of ${\displaystyle \mathfrak{g}}$. The construction is as follows.^[2] Let T be the tensor algebra of the vector space ${\displaystyle \mathfrak{g}}$. Thus, by definition, ${\displaystyle T={\displaystyle \underset{n=0}{\overset{\mathrm{\infty }}{\oplus }}}{\displaystyle \underset{1}{\overset{n}{\otimes }}}\mathfrak{g}}$ and the multiplication on it is given by ${\displaystyle \otimes }$. Let ${\displaystyle U(\mathfrak{g})}$ be the quotient ring of T by the ideal generated by elements ${\displaystyle [x,y]-x\otimes y+y\otimes x}$. Since ${\displaystyle U(\mathfrak{g})}$ is an associative algebra over the field k, it can be turned into a Lie algebra via the commutator ${\displaystyle [x,y]=xy-yx}$ (omitting ${\displaystyle \otimes }$ from the notation). There is a canonical morphism of Lie algebras ${\displaystyle \mathfrak{g}\to U(\mathfrak{g})}$ obtained by restricting ${\displaystyle T\to U(\mathfrak{g})}$ to degree one piece. The PBW theorem implies that the canonical map is actually injective. Note if ${\displaystyle \mathfrak{g}}$ is abelian, then ${\displaystyle U(\mathfrak{g})}$ is the symmetric algebra of the vector space ${\displaystyle \mathfrak{g}}$.

Since ${\displaystyle \mathfrak{g}}$ is a module over itself via adjoint representation, the enveloping algebra ${\displaystyle U(\mathfrak{g})}$ becomes a ${\displaystyle \mathfrak{g}}$-module by extending the adjoint representation. But one can also use the left and right regular representation to make the enveloping algebra a ${\displaystyle \mathfrak{g}}$-module; namely, with the notation ${\displaystyle l_x(y)=xy,x\in \mathfrak{g},y\in U(\mathfrak{g})}$, the mapping ${\displaystyle x\mapsto l_x}$ defines a representation of ${\displaystyle \mathfrak{g}}$ on ${\displaystyle U(\mathfrak{g})}$. The right regular representation is defined similarly.

Induced representation

Let ${\displaystyle \mathfrak{g}}$ be a finite-dimensional Lie algebra over a field of characteristic zero and ${\displaystyle \mathfrak{h}\subset \mathfrak{g}}$ a subalgebra. ${\displaystyle U(\mathfrak{h})}$ acts on ${\displaystyle U(\mathfrak{g})}$ from the right and thus, for any ${\displaystyle \mathfrak{h}}$-module W, one can form the left ${\displaystyle U(\mathfrak{g})}$-module ${\displaystyle U(\mathfrak{g}){\otimes }_{U(\mathfrak{h})}W}$. It is a ${\displaystyle \mathfrak{g}}$-module denoted by ${\displaystyle {\mathrm{Ind}}_{\mathfrak{h}}^{\mathfrak{g}}W}$ and called the ${\displaystyle \mathfrak{g}}$-module induced by W. It satisfies (and is in fact characterized by) the universal property: for any ${\displaystyle \mathfrak{g}}$-module E

${\displaystyle {\mathrm{Hom}}_{\mathfrak{g}}({\mathrm{Ind}}_{\mathfrak{h}}^{\mathfrak{g}}W,E)\simeq {\mathrm{Hom}}_{\mathfrak{h}}(W,{\mathrm{Res}}_{\mathfrak{h}}^{\mathfrak{g}}E)}$.

Furthermore, ${\displaystyle {\mathrm{Ind}}_{\mathfrak{h}}^{\mathfrak{g}}}$ is an exact functor from the category of ${\displaystyle \mathfrak{h}}$-modules to the category of ${\displaystyle \mathfrak{g}}$-modules. These uses the fact that ${\displaystyle U(\mathfrak{g})}$ is a free right module over ${\displaystyle U(\mathfrak{h})}$. In particular, if ${\displaystyle {\mathrm{Ind}}_{\mathfrak{h}}^{\mathfrak{g}}W}$ is simple (resp. absolutely simple), then W is simple (resp. absolutely simple). Here, a ${\displaystyle \mathfrak{g}}$-module V is absolutely simple if ${\displaystyle V{\otimes }_{k}F}$ is simple for any field extension ${\displaystyle F/k}$.

The induction is transitive: ${\displaystyle {\mathrm{Ind}}_{\mathfrak{h}}^{\mathfrak{g}}\simeq {\mathrm{Ind}}_{{\mathfrak{h}}^{\prime }}^{\mathfrak{g}}\circ {\mathrm{Ind}}_{\mathfrak{h}}^{{\mathfrak{h}}^{\prime }}}$ for any Lie subalgebra ${\displaystyle {\mathfrak{h}}^{\prime }\subset \mathfrak{g}}$ and any Lie subalgebra ${\displaystyle \mathfrak{h}\subset {\mathfrak{h}}^{\prime }}$. The induction commutes with restriction: let ${\displaystyle \mathfrak{h}\subset \mathfrak{g}}$ be subalgebra and ${\displaystyle \mathfrak{n}}$ an ideal of ${\displaystyle \mathfrak{g}}$ that is contained in ${\displaystyle \mathfrak{h}}$. Set ${\displaystyle {\mathfrak{g}}_1=\mathfrak{g}/\mathfrak{n}}$ and ${\displaystyle {\mathfrak{h}}_1=\mathfrak{h}/\mathfrak{n}}$. Then ${\displaystyle {\mathrm{Ind}}_{\mathfrak{h}}^{\mathfrak{g}}\circ {\mathrm{Res}}_{\mathfrak{h}}\simeq {\mathrm{Res}}_{\mathfrak{g}}\circ {\mathrm{Ind}}_{{\mathfrak{h}}_{\mathfrak{1}}}^{{\mathfrak{g}}_{\mathfrak{1}}}}$.

Representations of a semisimple Lie algebra

Let ${\displaystyle \mathfrak{g}}$ be a finite-dimensional semisimple Lie algebra over a field of characteristic zero. (in the solvable or nilpotent case, one studies primitive ideals of the enveloping algebra; cf. Dixmier for the definitive account.)

The category of modules over ${\displaystyle \mathfrak{g}}$ turns out to be too large especially for homological algebra methods to be useful: it was realized that a smaller subcategory category O is a better place for the representation theory in the semisimple case in zero characteristic. For instance, the category O turned out to be of a right size to formulate the celebrated BGG reciprocity.^[3]

${\displaystyle (\mathfrak{g},K)}$-module

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One of the most important applications of Lie algebra representations is to the representation theory of real reductive Lie group. The application is based on the idea that if ${\displaystyle \pi }$ is a Hilbert-space representation of, say, a connected real semisimple linear Lie group G, then it has two natural actions: the complexification ${\displaystyle \mathfrak{g}}$ and the connected maximal compact subgroup K. The ${\displaystyle \mathfrak{g}}$-module structure of ${\displaystyle \pi }$ allows algebraic especially homological methods to be applied and ${\displaystyle K}$-module structure allows harmonic analysis to be carried out in a way similar to that on connected compact semisimple Lie groups.

Classification

Finite-dimensional representations of semisimple Lie algebras

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Briefly, finite-dimensional representations of a semisimple Lie algebra are completely reducible, so it suffices to classify irreducible (simple) representations. Semisimple Lie algebras are classified in terms of the weights of the adjoint representation, the so-called root system; in a similar manner all finite-dimensional irreducible representations can be understood in terms of weights; see weight (representation theory) for details.

Representation on an algebra

If we have a Lie superalgebra L, then a representation of L on an algebra is a (not necessarily associative) Z₂ graded algebra A which is a representation of L as a Z₂ graded vector space and in addition, the elements of L acts as derivations/antiderivations on A.

More specifically, if H is a pure element of L and x and y are pure elements of A,

H[xy] = (H[x])y + (−1)^xHx(H[y])

Also, if A is unital, then

H[1] = 0

Now, for the case of a representation of a Lie algebra, we simply drop all the gradings and the (−1) to the some power factors.

A Lie (super)algebra is an algebra and it has an adjoint representation of itself. This is a representation on an algebra: the (anti)derivation property is the superJacobi identity.

If a vector space is both an associative algebra and a Lie algebra and the adjoint representation of the Lie algebra on itself is a representation on an algebra (i.e., acts by derivations on the associative algebra structure), then it is a Poisson algebra. The analogous observation for Lie superalgebras gives the notion of a Poisson superalgebra.

See also

• Quillen's lemma - analog of Schur's lemma
• Verma module
• Geometric quantization
• Kazhdan–Lusztig conjectures
• Representation of a Lie superalgebra
• Whitehead's lemma (Lie algebras)

Notes

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References

• Bernstein I.N., Gelfand I.M., Gelfand S.I., "Structure of Representations that are generated by vectors of highest weight," Functional. Anal. Appl. 5 (1971)
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• A. Beilinson and J. Bernstein, "Localisation de g-modules," C. R. Acad. Sci. Paris Sér. I Math., vol. 292, iss. 1, pp. 15-18, 1981.
• Template:Fulton-Harris
• D. Gaitsgory, Geometric Representation theory, Math 267y, Fall 2005
• Ryoshi Hotta, Kiyoshi Takeuchi, Toshiyuki Tanisaki, D-modules, perverse sheaves, and representation theory; translated by Kiyoshi Takeuch
• J.Humphreys, Introduction to Lie algebras and representation theory, Birkhäuser, 2000.
• N. Jacobson, Lie algebras, Courier Dover Publications, 1979.