Representation theory of semisimple Lie algebras explained

In mathematics, the representation theory of semisimple Lie algebras is one of the crowning achievements of the theory of Lie groups and Lie algebras. The theory was worked out mainly by E. Cartan and H. Weyl and because of that, the theory is also known as the Cartan–Weyl theory.^[1] The theory gives the structural description and classification of a finite-dimensional representation of a semisimple Lie algebra (over

); in particular, it gives a way to parametrize (or classify) irreducible finite-dimensional representations of a semisimple Lie algebra, the result known as the theorem of the highest weight.

There is a natural one-to-one correspondence between the finite-dimensional representations of a simply connected compact Lie group K and the finite-dimensional representations of the complex semisimple Lie algebra

akg

that is the complexification of the Lie algebra of K (this fact is essentially a special case of the Lie group–Lie algebra correspondence). Also, finite-dimensional representations of a connected compact Lie group can be studied through finite-dimensional representations of the universal cover of such a group. Hence, the representation theory of semisimple Lie algebras marks the starting point for the general theory of representations of connected compact Lie groups.

The theory is a basis for the later works of Harish-Chandra that concern (infinite-dimensional) representation theory of real reductive groups.

Classifying finite-dimensional representations of semisimple Lie algebras

There is a beautiful theory classifying the finite-dimensional representations of a semisimple Lie algebra over

. The finite-dimensional irreducible representations are described by a theorem of the highest weight. The theory is described in various textbooks, including,, and .

Following an overview, the theory is described in increasing generality, starting with two simple cases that can be done "by hand" and then proceeding to the general result. The emphasis here is on the representation theory; for the geometric structures involving root systems needed to define the term "dominant integral element," follow the above link on weights in representation theory.

Overview

Classification of the finite-dimensional irreducible representations of a semisimple Lie algebra

ak{g}

over

generally consists of two steps. The first step amounts to analysis of hypothesized representations resulting in a tentative classification. The second step is actual realization of these representations.

A real Lie algebra is usually complexified enabling analysis in an algebraically closed field. Working over the complex numbers in addition admits nicer bases. The following theorem applies: A real-linear finite-dimensional representation of a real Lie algebra extends to a complex-linear representation of its complexification. The real-linear representation is irreducible if and only if the corresponding complex-linear representation is irreducible. Moreover, a complex semisimple Lie algebra has the complete reducibility property. This means that every finite-dimensional representation decomposes as a direct sum of irreducible representations.

Conclusion: Classification amounts to studying irreducible complex linear representations of the (complexified) Lie algebra.

Classification: Step One

The first step is to hypothesize the existence of irreducible representations. That is to say, one hypothesizes that one has an irreducible representation

\pi

of a complex semisimple Lie algebra

akg,

without worrying about how the representation is constructed. The properties of these hypothetical representations are investigated,^[2] and conditions necessary for the existence of an irreducible representation are then established.

The properties involve the weights of the representation. Here is the simplest description.^[3] Let

akh

be a Cartan subalgebra of

akg

, that is a maximal commutative subalgebra with the property that

\operatorname{ad}_H

is diagonalizable for each

H\inakh

, and let

H_1,\ldots,H_n

be a basis for

akh

. A weight

for a representation

(\pi,V)

akg

is a collection of simultaneous eigenvalues

(λ_1,\ldots,λ_n)

for the commuting operators

\pi(H_1),\ldots,\pi(H_n)

. In basis-independent language,

is a linear functional

akh

such that there exists a nonzero vector

v\inV

such that

\pi(H)v=λ(H)v

for every

H\inakh

A partial ordering on the set of weights is defined, and the notion of highest weight in terms of this partial ordering is established for any set of weights. Using the structure on the Lie algebra, the notions dominant element and integral element are defined. Every finite-dimensional representation must have a maximal weight

, i.e., one for which no strictly higher weight occurs. If

is irreducible and

is a weight vector with weight

, then the entire space

must be generated by the action of

akg

. Thus,

(\pi,V)

is a "highest weight cyclic" representation. One then shows that the weight

is actually the highest weight (not just maximal) and that every highest weight cyclic representation is irreducible. One then shows that two irreducible representations with the same highest weight are isomorphic. Finally, one shows that the highest weight

must be dominant and integral.

Conclusion: Irreducible representations are classified by their highest weights, and the highest weight is always a dominant integral element.

Step One has the side benefit that the structure of the irreducible representations is better understood. Representations decompose as direct sums of weight spaces, with the weight space corresponding to the highest weight one-dimensional. Repeated application of the representatives of certain elements of the Lie algebra called lowering operators yields a set of generators for the representation as a vector space. The application of one such operator on a vector with definite weight results either in zero or a vector with strictly lower weight. Raising operators work similarly, but results in a vector with strictly higher weight or zero. The representatives of the Cartan subalgebra acts diagonally in a basis of weight vectors.

Classification: Step Two

Step Two is concerned with constructing the representations that Step One allows for. That is to say, we now fix a dominant integral element

and try to construct an irreducible representation with highest weight

There are several standard ways of constructing irreducible representations:

Construction using Verma modules. This approach is purely Lie algebraic. (Generally applicable to complex semisimple Lie algebras.)
The compact group approach using the Peter - Weyl theorem. If, for example,

akg=\operatorname{sl}(n,C)

, one would work with the simply connected compact group

\operatorname{SU}(n)

. (Generally applicable to complex semisimple Lie algebras.)

Construction using the Borel - Weil theorem, in which holomorphic representations of the group corresponding to

ak{g}

are constructed. (Generally applicable to complex semisimple Lie algebras.)

Performing standard operations on known representations, in particular applying Clebsch - Gordan decomposition to tensor products of representations. (Not generally applicable.)^[4] In the case

akg=\operatorname{sl}(3,C)

, this construction is described below.

In the simplest cases, construction from scratch.^[5]

Conclusion: Every dominant integral element of a complex semisimple Lie algebra gives rise to an irreducible, finite-dimensional representation. These are the only irreducible representations.

The case of sl(2,C)

The Lie algebra sl(2,C) of the special linear group SL(2,C) is the space of 2x2 trace-zero matrices with complex entries. The following elements form a basis:

X=\begin{pmatrix} 0&1\\ 0&0 \end{pmatrix} Y=\begin{pmatrix} 0&0\\ 1&0 \end{pmatrix} H=\begin{pmatrix} 1&0\\ 0&-1 \end{pmatrix}~,

These satisfy the commutation relations

[H,X]=2X, [H,Y]=-2Y, [X,Y]=H

Every finite-dimensional representation of sl(2,C) decomposes as a direct sum of irreducible representations. This claim follows from the general result on complete reducibility of semisimple Lie algebras,^[6] or from the fact that sl(2,C) is the complexification of the Lie algebra of the simply connected compact group SU(2).^[7] The irreducible representations

\pi

, in turn, can be classified^[8] by the largest eigenvalue of

\pi(H)

, which must be a non-negative integer m. That is to say, in this case, a "dominant integral element" is simply a non-negative integer. The irreducible representation with largest eigenvalue m has dimension

m+1

and is spanned by eigenvectors for

\pi(H)

with eigenvalues

m,m-2,\ldots,-m+2,-m

. The operators

\pi(X)

and

\pi(Y)

move up and down the chain of eigenvectors, respectively. This analysis is described in detail in the representation theory of SU(2) (from the point of the view of the complexified Lie algebra).

One can give a concrete realization of the representations (Step Two in the overview above) in either of two ways. First, in this simple example, it is not hard to write down an explicit basis for the representation and an explicit formula for how the generators

X,Y,H

of the Lie algebra act on this basis.^[9] Alternatively, one can realize the representation^[10] with highest weight

by letting

V_m

denote the space of homogeneous polynomials of degree

in two complex variables, and then defining the action of

, and

\pi_m(X)=-z

2	\partial
	\partialz₁

; \pi_m(Y)=-z

1	\partial
	\partialz₂

; \pi_m(H)=-z

1	\partial
	\partialz₁

2	\partial
	\partialz₂

Note that the formulas for the action of

, and

do not depend on

; the subscript in the formulas merely indicates that we are restricting the action of the indicated operators to the space of homogeneous polynomials of degree

z₁

and

z₂

The case of sl(3,C)

See also: Clebsch–Gordan coefficients for SU(3). There is a similar theory^[11] classifying the irreducible representations of sl(3,C), which is the complexified Lie algebra of the group SU(3). The Lie algebra sl(3,C) is eight dimensional. We may work with a basis consisting of the following two diagonal elements

H₁=\begin{pmatrix}1&0&0\ 0&-1&0\ 0&0&0\end{pmatrix}, H₂=\begin{pmatrix}0&0&0\ 0&1&0\ 0&0&-1\end{pmatrix}

,together with six other matrices

X_1,X_2,X₃

and

Y_1,Y_2,Y₃

each of which has a 1 in an off-diagonal entry and zeros elsewhere. (The

X_i

's have a 1 above the diagonal and the

Y_i

's have a 1 below the diagonal.)

The strategy is then to simultaneously diagonalize

\pi(H₁₎

and

\pi(H₂₎

in each irreducible representation

\pi

. Recall that in the sl(2,C) case, the action of

\pi(X)

and

\pi(Y)

raise and lower the eigenvalues of

\pi(H)

. Similarly, in the sl(3,C) case, the action of

\pi(X_i)

and

\pi(Y_i)

"raise" and "lower" the eigenvalues of

\pi(H₁₎

and

\pi(H₂₎

. The irreducible representations are then classified^[12] by the largest eigenvalues

m₁

and

m₂

\pi(H₁₎

and

\pi(H₂₎

, respectively, where

m₁

and

m₂

are non-negative integers. That is to say, in this setting, a "dominant integral element" is precisely a pair of non-negative integers.

Unlike the representations of sl(2,C), the representation of sl(3,C) cannot be described explicitly in general. Thus, it requires an argument to show that every pair

(m_1,m₂₎

actually arises the highest weight of some irreducible representation (Step Two in the overview above). This can be done as follows. First, we construct the "fundamental representations", with highest weights (1,0) and (0,1). These are the three-dimensional standard representation (in which

\pi(X)=X

) and the dual of the standard representation. Then one takes a tensor product of

m₁

copies of the standard representation and

m₂

copies of the dual of the standard representation, and extracts an irreducible invariant subspace.^[13]

Although the representations cannot be described explicitly, there is a lot of useful information describing their structure. For example, the dimension of the irreducible representation with highest weight

(m_1,m₂₎

is given by^[14]

\dim(m_1,m

2)=	1
	2

(m_1+1)(m_2+1)(m_1+m₂₊₂₎

There is also a simple pattern to the multiplicities of the various weight spaces. Finally, the irreducible representations with highest weight

(0,m)

can be realized concretely on the space of homogeneous polynomials of degree

in three complex variables.^[15]

The case of a general semisimple Lie algebras

See main article: Theorem of the highest weight.

Let

akg

be a semisimple Lie algebra and let

akh

be a Cartan subalgebra of

akg

, that is, a maximal commutative subalgebra with the property that ad_H is diagonalizable for all H in

akh

. As an example, we may consider the case where

akg

is sl(n,C), the algebra of n by n traceless matrices, and

akh

is the subalgebra of traceless diagonal matrices.^[16] We then let R denote the associated root system. We then choose a base (or system of positive simple roots)

\Delta

for R.

We now briefly summarize the structures needed to state the theorem of the highest weight; more details can be found in the article on weights in representation theory.We choose an inner product on

akh

that is invariant under the action of the Weyl group of R, which we use to identify

akh

with its dual space. If

(\pi,V)

is a representation of

akg

, we define a weight of V to be an element

akh

with the property that for some nonzero v in V, we have

\pi(H)v=\langleλ,H\ranglev

for all H in

akh

. We then define one weight

to be higher than another weight

\mu

λ-\mu

is expressible as a linear combination of elements of

\Delta

with non-negative real coefficients. A weight

\mu

is called a highest weight if

\mu

is higher than every other weight of

\pi

. Finally, if

is a weight, we say that

is dominant if it has non-negative inner product with each element of

\Delta

and we say that

is integral if

2\langleλ,\alpha\rangle/\langle\alpha,\alpha\rangle

is an integer for each

\alpha

in R.

Finite-dimensional representations of a semisimple Lie algebra are completely reducible, so it suffices to classify irreducible (simple) representations. The irreducible representations, in turn, may be classified by the "theorem of the highest weight" as follows:^[17]

Every irreducible, finite-dimensional representation of

akg

has a highest weight, and this highest weight is dominant and integral.

Two irreducible, finite-dimensional representations with the same highest weight are isomorphic.
Every dominant integral element arises as the highest weight of some irreducible, finite-dimensional representation of

akg

. The last point of the theorem (Step Two in the overview above) is the most difficult one. In the case of the Lie algebra sl(3,C), the construction can be done in an elementary way, as described above. In general, the construction of the representations may be given by using Verma modules.^[18]

Construction using Verma modules

is any weight, not necessarily dominant or integral, one can construct an infinite-dimensional representation

W_λ

akg

with highest weight

known as a Verma module. The Verma module then has a maximal proper invariant subspace

U_λ

, so that the quotient representation

V_λ:=W_λ/U_λ

is irreducible—and still has highest weight

. In the case that

is dominant and integral, we wish to show that

V_λ

is finite dimensional.^[19]

The strategy for proving finite-dimensionality of

V_λ

is to show that the set of weights of

V_λ

is invariant under the action of the Weyl group

akg

relative to the given Cartan subalgebra

akh

.^[20] (Note that the weights of the Verma module

W_λ

itself are definitely not invariant under

.) Once this invariance result is established, it follows that

V_λ

has only finitely many weights. After all, if

\mu

is a weight of

V_λ

, then

\mu

must be integral—indeed,

\mu

must differ from

by an integer combination of roots—and by the invariance result,

w ⋅ \mu

must be lower than

for every

. But there are only finitely many integral elements

\mu

with this property. Thus,

V_λ

has only finitely many weights, each of which has finite multiplicity (even in the Verma module, so certainly also in

V_λ

). From this, it follows that

V_λ

must be finite dimensional.

Additional properties of the representations

Much is known about the representations of a complex semisimple Lie algebra

akg

, besides the classification in terms of highest weights. We mention a few of these briefly. We have already alluded to Weyl's theorem, which states that every finite-dimensional representation of

akg

decomposes as a direct sum of irreducible representations. There is also the Weyl character formula, which leads to the Weyl dimension formula (a formula for the dimension of the representation in terms of its highest weight), the Kostant multiplicity formula (a formula for the multiplicities of the various weights occurring in a representation). Finally, there is also a formula for the eigenvalue of the Casimir element, which acts as a scalar in each irreducible representation.

Lie group representations and Weyl's unitarian trick

Although it is possible to develop the representation theory of complex semisimple Lie algebras in a self-contained way, it can be illuminating to bring in a perspective using Lie groups. This approach is particularly helpful in understanding Weyl's theorem on complete reducibility. It is known that every complex semisimple Lie algebra

akg

has a compact real form

akk

.^[21] This means first that

akg

is the complexification of

akk

akg=akk+iakk

and second that there exists a simply connected compact group

whose Lie algebra is

akk

. As an example, we may consider

akg=\operatorname{sl}(n;C)

, in which case

may be taken to be the special unitary group SU(n).

Given a finite-dimensional representation

akg

, we can restrict it to

akk

. Then since

is simply connected, we can integrate the representation to the group

.^[22] The method of averaging over the group shows that there is an inner product on

that is invariant under the action of

; that is, the action of

is unitary. At this point, we may use unitarity to see that

decomposes as a direct sum of irreducible representations.^[23] This line of reasoning is called the unitarian trick and was Weyl's original argument for what is now called Weyl's theorem. There is also a purely algebraic argument for the complete reducibility of representations of semisimple Lie algebras.

akg

is a complex semisimple Lie algebra, there is a unique complex semisimple Lie group

with Lie algebra

akg

, in addition to the simply connected compact group

. (If

akg=\operatorname{sl}(n;C)

then

G=\operatorname{SL}(n;C)

.) Then we have the following result about finite-dimensional representations.

Statement: The objects in the following list are in one-to-one correspondence:

Smooth representations of
Holomorphic representations of
Real linear representations of

ak{k}

Complex linear representations of

ak{g}

Conclusion: The representation theory of compact Lie groups can shed light on the representation theory of complex semisimple Lie algebras.

References

Book: Bäuerle. G. G. A.. de Kerf. E. A.. ten Kroode. A. P. E.. Finite and infinite dimensional Lie algebras and their application in physics. 1997. Studies in mathematical physics. 7. A. van Groesen. E.M. de Jager. North-Holland. 978-0-444-82836-1. ScienceDirect. subscription .
- - - - .
.

Notes and References

Reviewed work: Matrix Groups: An Introduction to Lie Group Theory, Andrew Baker; Lie Groups: An Introduction through Linear Groups, Wulf Rossmann. 3647845. Knapp. A. W.. The American Mathematical Monthly. 2003. 110. 5. 446–455. 10.2307/3647845.
See Section 6.4 of in the case of sl(3,C)
(There specialized to
\operatorname{sl}(3,C

)
This approach is used heavily for classical Lie algebras in .
This approach for
\operatorname{sl}(2,C)

can be found in Example 4.10. of
Section 10.3
Theorems 4.28 and 5.6
Section 4.6
Equation 4.16
Example 4.10
Chapter 6
Theorem 6.7
Proposition 6.17
Theorem 6.27
Exercise 6.8
Section 7.7.1
Theorems 9.4 and 9.5
Sections 9.5-9.7
Section 9.7
Proposition 9.22
Section VI.1
Theorem 5.6
Section 4.4