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Equivalence of certain categories of modules for quantized affine lie algebras

Published online by Cambridge University Press:  09 April 2009

Vyacheslav M. Futorny
Affiliation:
Instituto de Matematica Universidade do Sao PauloSao PauloBrasil e-mail: [email protected]
Duncan J. Melville
Affiliation:
Department of Mathematics St. Lawrence University Canton, New York 13617USA e-mail: [email protected]
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Abstract

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We show that a quantum Verma-type module for a quantum group associated to an affine Kac-Moody algebra is characterized by its subspace of finite-dimensional weight spaces. In order to do this we prove an explicit equivalence of categories between a certain category containing the quantum Verma modules and a category of modules for a subalgebra of the quantum group for which the finite part of the Verma module is itself a module.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 2000

References

[Be]Beck, J., ‘Braid group action and quantum affine algebras’, Comm. Math. Phys. 165 (1994), 555568.CrossRefGoogle Scholar
[BK]Beck, J. and Kac, V. G., ‘Finite-dimensional representations of quantum affine algebras at roots of unity’, J. Amer. Math. Soc. 9 (1996), 391423.Google Scholar
[CFKM]Cox, B., Futorny, V. M., Kang, S.-J. and Melville, D. J., ‘Quantum deformations of imaginary Verma modules’, Proc. London Math. Soc. 74 (1997), 5280.Google Scholar
[CFM]Cox, B., Futorny, V. M. and Melville, D. J., ‘Categories of nonstandard highest weight modules for affine Lie algebras’, Math. Z. 221 (1996), 193209.Google Scholar
[FO]Fabbri, M. and Okoh, F., ‘Representations of quantum Heisenberg algebras’, Canad. J. Math. 46 (1994), 920929.Google Scholar
[Ful]Futorny, V. M., ‘Root systems, representations and geometries’, Ac. Sci. Ukrain. Math. 8 (1990), 3039.Google Scholar
[Fu2]Futorny, V. M., ‘The parabolic subsets of root systems and corresponding representations of affine Lie algebras’, Contemp. Math. 131 (1992), 4552.CrossRefGoogle Scholar
[Fu3]Futorny, V. M., ‘Irreducible non-dense A1(1)-modules’. Pac. J. Math. 172 (1996), 8399.CrossRefGoogle Scholar
[Fu4]Futorny, V. M., Representations of affine Lie algebras, Queen's Papers in Pure and Appl. Math. 106 (Queen's University, Kingston, 1997).Google Scholar
[FGM]Futorny, V. M., Grishkov, A. N. and Melville, D. J., ‘Verma-type modules for quantum affine Lie algebras’, preprint 1998.Google Scholar
[JK1]Jakobsen, H. P. and Kac, V. G., A new class of unitarizable highest weight representations of infinite dimensional Lie algebras, Lecture Notes in Phys. 226 (Springer, Berlin, 1985) pp. 120.Google Scholar
[JK2]Jakobsen, H. P. and Kac, V. G., ‘A new class of unitarizable highest weight representations of infinite dimensional Lie algebras II’, J. Funct. Anal. 82 (1989), 6990.Google Scholar
[KT]Khoroshkin, S. M. and Tolstoy, V. N., ‘On Drinfeld's realization of quantum affine algebras’, J. Geom. Phys. 11 (1993), 445452.Google Scholar
[RW]Rocha-Caridi, A. and Wallach, N., ‘Projective modules over graded Lie algebras. I’, Math. Z. 180 (1982), 151177.Google Scholar
[R]Rotman, J. J., An introduction to homological algebra (Academic Press, New York, 1979).Google Scholar