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In mathematics, generalized Verma modules are a generalization of a (true) Verma module,[1] and are objects in the representation theory of Lie algebras. They were studied originally by James Lepowsky in the 1970s. The motivation for their study is that their homomorphisms correspond to invariant differential operators over generalized flag manifolds. The study of these operators is an important part of the theory of parabolic geometries.
Definition
editLet be a semisimple Lie algebra and a parabolic subalgebra of . For any irreducible finite-dimensional representation of we define the generalized Verma module to be the relative tensor product
- .
The action of is left multiplication in .
If λ is the highest weight of V, we sometimes denote the Verma module by .
Note that makes sense only for -dominant and -integral weights (see weight) .
It is well known that a parabolic subalgebra of determines a unique grading so that . Let . It follows from the Poincaré–Birkhoff–Witt theorem that, as a vector space (and even as a -module and as a -module),
- .
In further text, we will denote a generalized Verma module simply by GVM.
Properties of GVMs
editGVM's are highest weight modules and their highest weight λ is the highest weight of the representation V. If is the highest weight vector in V, then is the highest weight vector in .
GVM's are weight modules, i.e. they are direct sum of its weight spaces and these weight spaces are finite-dimensional.
As all highest weight modules, GVM's are quotients of Verma modules. The kernel of the projection is
where is the set of those simple roots α such that the negative root spaces of root are in (the set S determines uniquely the subalgebra ), is the root reflection with respect to the root α and is the affine action of on λ. It follows from the theory of (true) Verma modules that is isomorphic to a unique submodule of . In (1), we identified . The sum in (1) is not direct.
In the special case when , the parabolic subalgebra is the Borel subalgebra and the GVM coincides with (true) Verma module. In the other extremal case when , and the GVM is isomorphic to the inducing representation V.
The GVM 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 GVMs
editBy a homomorphism of GVMs we mean -homomorphism.
For any two weights a 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.
Unlike in the case of (true) Verma modules, the homomorphisms of GVM's are in general not injective and the dimension
may be larger than one in some specific cases.
If is a homomorphism of (true) Verma modules, resp. is the kernels of the projection , resp. , then there exists a homomorphism and f factors to a homomorphism of generalized Verma modules . Such a homomorphism (that is a factor of a homomorphism of Verma modules) is called standard. However, the standard homomorphism may be zero in some cases.
Standard
editLet us suppose that there exists a nontrivial homomorphism of true Verma modules . Let be the set of those simple roots α such that the negative root spaces of root are in (like in section Properties). The following theorem is proved by Lepowsky:[2]
The standard homomorphism is zero if and only if there exists such that is isomorphic to a submodule of ( is the corresponding root reflection and is the affine action).
The structure of GVMs on the affine orbit of a -dominant and -integral weight can be described explicitly. If W is the Weyl group of , there exists a subset of such elements, so that is -dominant. It can be shown that where is the Weyl group of (in particular, does not depend on the choice of ). The map is a bijection between and the set of GVM's with highest weights on the affine orbit of . Let as suppose that , and in the Bruhat ordering (otherwise, there is no homomorphism of (true) Verma modules and the standard homomorphism does not make sense, see Homomorphisms of Verma modules).
The following statements follow from the above theorem and the structure of :
Theorem. If for some positive root and the length (see Bruhat ordering) l(w')=l(w)+1, then there exists a nonzero standard homomorphism .
Theorem. The standard homomorphism is zero if and only if there exists such that and .
However, if is only dominant but not integral, there may still exist -dominant and -integral weights on its affine orbit.
The situation is even more complicated if the GVM's have singular character, i.e. there and are on the affine orbit of some such that is on the wall of the fundamental Weyl chamber.
Nonstandard
editA homomorphism is called nonstandard, if it is not standard. It may happen that the standard homomorphism of GVMs is zero but there still exists a nonstandard homomorphism.
Bernstein–Gelfand–Gelfand resolution
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Examples
edit- The fields of conformal field theory belong to generalized Verma modules of the conformal algebra.[3]
See also
editExternal links
editReferences
edit- ^ Named after Daya-Nand Verma.
- ^ Lepowsky J., A generalization of the Bernstein-Gelfand-Gelfand resolution, J. Algebra, 49 (1977), 496-511.
- ^ Penedones, João; Trevisani, Emilio; Yamazaki, Masahito (2016). "Recursion relations for conformal blocks". Journal of High Energy Physics. 2016 (9). doi:10.1007/JHEP09(2016)070. hdl:11449/173478. ISSN 1029-8479.