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Verma modules, named after Daya-Nand Verma, are objects in the representation theory of Lie algebras, a branch of mathematics.

Verma modules can be used in the classification of irreducible representations of a complex semisimple Lie algebra. Specifically, although Verma modules themselves are infinite dimensional, quotients of them can be used to construct finite-dimensional representations with highest weight , where is dominant and integral.[1] Their homomorphisms correspond to invariant differential operators over flag manifolds.

Informal construction

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Weights of Verma module for   with highest weight  

We can explain the idea of a Verma module as follows.[2] Let   be a semisimple Lie algebra (over  , for simplicity). Let   be a fixed Cartan subalgebra of   and let   be the associated root system. Let   be a fixed set of positive roots. For each  , choose a nonzero element   for the corresponding root space   and a nonzero element   in the root space  . We think of the  's as "raising operators" and the  's as "lowering operators."

Now let   be an arbitrary linear functional, not necessarily dominant or integral. Our goal is to construct a representation   of   with highest weight   that is generated by a single nonzero vector   with weight  . The Verma module is one particular such highest-weight module, one that is maximal in the sense that every other highest-weight module with highest weight   is a quotient of the Verma module. It will turn out that Verma modules are always infinite dimensional; if   is dominant integral, however, one can construct a finite-dimensional quotient module of the Verma module. Thus, Verma modules play an important role in the classification of finite-dimensional representations of  . Specifically, they are an important tool in the hard part of the theorem of the highest weight, namely showing that every dominant integral element actually arises as the highest weight of a finite-dimensional irreducible representation of  .

We now attempt to understand intuitively what the Verma module with highest weight   should look like. Since   is to be a highest weight vector with weight  , we certainly want

 

and

 .

Then   should be spanned by elements obtained by lowering   by the action of the  's:

 .

We now impose only those relations among vectors of the above form required by the commutation relations among the  's. In particular, the Verma module is always infinite-dimensional. The weights of the Verma module with highest weight   will consist of all elements   that can be obtained from   by subtracting integer combinations of positive roots. The figure shows the weights of a Verma module for  .

A simple re-ordering argument shows that there is only one possible way the full Lie algebra   can act on this space. Specifically, if   is any element of  , then by the easy part of the Poincaré–Birkhoff–Witt theorem, we can rewrite

 

as a linear combination of products of Lie algebra elements with the raising operators   acting first, the elements of the Cartan subalgebra, and last the lowering operators  . Applying this sum of terms to  , any term with a raising operator is zero, any factors in the Cartan act as scalars, and thus we end up with an element of the original form.

To understand the structure of the Verma module a bit better, we may choose an ordering of the positive roots as   and we denote the corresponding lowering operators by  . Then by a simple re-ordering argument, every element of the above form can be rewritten as a linear combination of elements with the  's in a specific order:

 ,

where the  's are non-negative integers. Actually, it turns out that such vectors form a basis for the Verma module.

Although this description of the Verma module gives an intuitive idea of what   looks like, it still remains to give a rigorous construction of it. In any case, the Verma module gives—for any  , not necessarily dominant or integral—a representation with highest weight  . The price we pay for this relatively simple construction is that   is always infinite dimensional. In the case where   is dominant and integral, one can construct a finite-dimensional, irreducible quotient of the Verma module.[3]

The case of sl(2; C)

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Let   be the usual basis for  :

 

with the Cartan subalgebra being the span of  . Let   be defined by   for an arbitrary complex number  . Then the Verma module with highest weight   is spanned by linearly independent vectors   and the action of the basis elements is as follows:[4]

 .

(This means in particular that   and that  .) These formulas are motivated by the way the basis elements act in the finite-dimensional representations of  , except that we no longer require that the "chain" of eigenvectors for   has to terminate.

In this construction,   is an arbitrary complex number, not necessarily real or positive or an integer. Nevertheless, the case where   is a non-negative integer is special. In that case, the span of the vectors   is easily seen to be invariant—because  . The quotient module is then the finite-dimensional irreducible representation of   of dimension  

Definition of Verma modules

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There are two standard constructions of the Verma module, both of which involve the concept of universal enveloping algebra. We continue the notation of the previous section:   is a complex semisimple Lie algebra,   is a fixed Cartan subalgebra,   is the associated root system with a fixed set   of positive roots. For each  , we choose nonzero elements   and  .

As a quotient of the enveloping algebra

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The first construction[5] of the Verma module is a quotient of the universal enveloping algebra   of  . Since the Verma module is supposed to be a  -module, it will also be a  -module, by the universal property of the enveloping algebra. Thus, if we have a Verma module   with highest weight vector  , there will be a linear map   from   into   given by

 .

Since   is supposed to be generated by  , the map   should be surjective. Since   is supposed to be a highest weight vector, the kernel of   should include all the root vectors   for   in  . Since, also,   is supposed to be a weight vector with weight  , the kernel of   should include all vectors of the form

 .

Finally, the kernel of   should be a left ideal in  ; after all, if   then   for all  .

The previous discussion motivates the following construction of Verma module. We define   as the quotient vector space

 ,

where   is the left ideal generated by all elements of the form

 

and

 .

Because   is a left ideal, the natural left action of   on itself carries over to the quotient. Thus,   is a  -module and therefore also a  -module.

By extension of scalars

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The "extension of scalars" procedure is a method for changing a left module   over one algebra   (not necessarily commutative) into a left module over a larger algebra   that contains   as a subalgebra. We can think of   as a right  -module, where   acts on   by multiplication on the right. Since   is a left  -module and   is a right  -module, we can form the tensor product of the two over the algebra  :

 .

Now, since   is a left  -module over itself, the above tensor product carries a left module structure over the larger algebra  , uniquely determined by the requirement that

 

for all   and   in  . Thus, starting from the left  -module  , we have produced a left  -module  .

We now apply this construction in the setting of a semisimple Lie algebra. We let   be the subalgebra of   spanned by   and the root vectors   with  . (Thus,   is a "Borel subalgebra" of  .) We can form a left module   over the universal enveloping algebra   as follows:

  •   is the one-dimensional vector space spanned by a single vector   together with a  -module structure such that   acts as multiplication by   and the positive root spaces act trivially:
 .

The motivation for this formula is that it describes how   is supposed to act on the highest weight vector in a Verma module.

Now, it follows from the Poincaré–Birkhoff–Witt theorem that   is a subalgebra of  . Thus, we may apply the extension of scalars technique to convert   from a left  -module into a left  -module   as follow:

 .

Since   is a left  -module, it is, in particular, a module (representation) for  .

The structure of the Verma module

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Whichever construction of the Verma module is used, one has to prove that it is nontrivial, i.e., not the zero module. Actually, it is possible to use the Poincaré–Birkhoff–Witt theorem to show that the underlying vector space of   is isomorphic to

 

where   is the Lie subalgebra generated by the negative root spaces of   (that is, the  's).[6]

Basic properties

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Verma modules, considered as  -modules, are highest weight modules, i.e. they are generated by a highest weight vector. This highest weight vector is   (the first   is the unit in   and the second is the unit in the field  , considered as the  -module  ) and it has weight  .

Multiplicities

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Verma modules are weight modules, i.e.   is a direct sum of all its weight spaces. Each weight space in   is finite-dimensional and the dimension of the  -weight space   is the number of ways of expressing   as a sum of positive roots (this is closely related to the so-called Kostant partition function). This assertion follows from the earlier claim that the Verma module is isomorphic as a vector space to  , along with the Poincaré–Birkhoff–Witt theorem for  .

Universal property

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Verma modules have a very important property: If   is any representation generated by a highest weight vector of weight  , there is a surjective  -homomorphism   That is, all representations with highest weight   that are generated by the highest weight vector (so called highest weight modules) are quotients of  

Irreducible quotient module

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  contains a unique maximal submodule, and its quotient is the unique (up to isomorphism) irreducible representation with highest weight  [7] If the highest weight   is dominant and integral, one then proves that this irreducible quotient is actually finite dimensional.[8]

As an example, consider the case   discussed above. If the highest weight   is "dominant integral"—meaning simply that it is a non-negative integer—then   and the span of the elements   is invariant. The quotient representation is then irreducible with dimension  . The quotient representation is spanned by linearly independent vectors  . The action of   is the same as in the Verma module, except that   in the quotient, as compared to   in the Verma module.

The Verma module   itself is irreducible if and only if   is antidominant.[9] Consequently, when   is integral,   is irreducible if and only if none of the coordinates of   in the basis of fundamental weights is from the set  , while in general, this condition is necessary but insufficient for   to be irreducible.

Other properties

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The Verma module   is called regular, if its highest weight λ is on the affine Weyl orbit of a dominant weight  . In other word, there exist an element w of the Weyl group W such that

 

where   is the affine action of the Weyl group.

The Verma module   is called singular, if there is no dominant weight on the affine orbit of λ. In this case, there exists a weight   so that   is on the wall of the fundamental Weyl chamber (δ is the sum of all fundamental weights).

Homomorphisms of Verma modules

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For any two weights   a non-trivial homomorphism

 

may exist only if   and   are linked with an affine action of the Weyl group   of the Lie algebra  . This follows easily from the Harish-Chandra theorem on infinitesimal central characters.

Each homomorphism of Verma modules is injective and the dimension

 

for any  . So, there exists a nonzero   if and only if   is isomorphic to a (unique) submodule of  .

The full classification of Verma module homomorphisms was done by Bernstein–Gelfand–Gelfand[10] and Verma[11] and can be summed up in the following statement:

There exists a nonzero homomorphism   if and only if there exists

a sequence of weights

 

such that   for some positive roots   (and   is the corresponding root reflection and   is the sum of all fundamental weights) and for each   is a natural number (  is the coroot associated to the root  ).

If the Verma modules   and   are regular, then there exists a unique dominant weight   and unique elements w, w′ of the Weyl group W such that

 

and

 

where   is the affine action of the Weyl group. If the weights are further integral, then there exists a nonzero homomorphism

 

if and only if

 

in the Bruhat ordering of the Weyl group.

Jordan–Hölder series

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Let

 

be a sequence of  -modules so that the quotient B/A is irreducible with highest weight μ. Then there exists a nonzero homomorphism  .

An easy consequence of this is, that for any highest weight modules   such that

 

there exists a nonzero homomorphism  .

Bernstein–Gelfand–Gelfand resolution

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Let   be a finite-dimensional irreducible representation of the Lie algebra   with highest weight λ. We know from the section about homomorphisms of Verma modules that there exists a homomorphism

 

if and only if

 

in the Bruhat ordering of the Weyl group. The following theorem describes a projective resolution of   in terms of Verma modules (it was proved by BernsteinGelfandGelfand in 1975[12]) :

There exists an exact sequence of  -homomorphisms

 

where n is the length of the largest element of the Weyl group.

A similar resolution exists for generalized Verma modules as well. It is denoted shortly as the BGG resolution.

See also

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Notes

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  1. ^ E.g., Hall 2015 Chapter 9
  2. ^ Hall 2015 Section 9.2
  3. ^ Hall 2015 Sections 9.6 and 9.7
  4. ^ Hall 2015 Sections 9.2
  5. ^ Hall 2015 Section 9.5
  6. ^ Hall 2015 Theorem 9.14
  7. ^ Hall 2015 Section 9.6
  8. ^ Hall 2015 Section 9.7
  9. ^ Humphreys, James (2008-07-22). Representations of Semisimple Lie Algebras in the BGG Category 𝒪. Graduate Studies in Mathematics. Vol. 94. American Mathematical Society. doi:10.1090/gsm/094. ISBN 978-0-8218-4678-0.
  10. ^ 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)
  11. ^ Verma N., Structure of certain induced representations of complex semisimple Lie algebras, Bull. Amer. Math. Soc. 74 (1968)
  12. ^ Bernstein I. N., Gelfand I. M., Gelfand S. I., Differential Operators on the Base Affine Space and a Study of g-Modules, Lie Groups and Their Representations, I. M. Gelfand, Ed., Adam Hilger, London, 1975.

References

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This article incorporates material from Verma module on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License.