Imaginary Verma Modules for Affine Lie Algebras

V. M. Futorny

doi:10.4153/CMB-1994-031-9

Abstract

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We study a class of irreducible modules for Affine Lie algebras which possess weight spaces of both finite and infinite dimensions. These modules appear as the quotients of "imaginary Verma modules" induced from the "imaginary Borel subalgebra".

References

1. Jakobsen, H. P. and Kac, V. G., A new class of unitarizable highest weight representations of infinitedimensional Lie algebras, Lecture Notes in Physics, 226(1985), 1–20.Google Scholar

2. 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), 69–90.Google Scholar

3. Futorny, V. M., On imaginary Verma modules over the Affine Lie algebra

, Oslo Univ. 9(1991 ), preprint.Google Scholar

4. Futorny, V. M., Modules of Verma type for Affine Lie algebras, Funktsional. Anal, i Prilozhen., to appear.Google Scholar

5. Futorny, V. M., Root systems, representations and geometries, Ac. Sci. Ukrain. Math. 8(1990), 30–39.Google Scholar

6. Futorny, V. M., The parabolic subsets of root systems and corresponding representations of Affine Lie algebras, Contemp. Math (2) 131(1992), 45–52.Google Scholar

7. Kac, V. G., Infinite Dimensional Lie Algebras, Cambridge University Press, third edition, 1990.Google Scholar

8. Spirin, S. A., ℤ² -graded modules with one-dimensional components over the Lie algebra

Funktsional. Anal, i Prilozhen. 21(1987), 84–85.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Cox, B. Futorny, V. and Melville, D. 1996. Categories of nonstandard highest weight modules for affine Lie algebras. Mathematische Zeitschrift, Vol. 221, Issue. 1, p. 193.

Futorny, Viatcheslav 1997. Verma type modules of level zero for affine Lie algebras. Transactions of the American Mathematical Society, Vol. 349, Issue. 7, p. 2663.

Futorny, Vyacheslay and Kashuba, Iryna 1999. Verma type modules for toroidal lie algebras. Communications in Algebra, Vol. 27, Issue. 8, p. 3979.

Dokuchaev, M. Figueiredo, L. M. Vasconcellos and Futorny, V. 2003. Imaginary Verma Modules for the Extended Affine Lie Algebrasl2(ℂq). Communications in Algebra, Vol. 31, Issue. 1, p. 289.

Cox, Ben L and Futorny, Vyacheslav 2004. Intermediate Wakimoto modules for affine. Journal of Physics A: Mathematical and General, Vol. 37, Issue. 21, p. 5589.

Cox, Ben L. 2005. Fock Space Realizations of Imaginary Verma Modules. Algebras and Representation Theory, Vol. 8, Issue. 2, p. 173.

Futorny, Vyacheslav M. Grishkov, Alexander N. and Melville, Duncan J. 2005. Verma-Type Modules for Quantum Affine Lie Algebras. Algebras and Representation Theory, Vol. 8, Issue. 1, p. 99.

Cox, Ben L. and Futorny, Vyacheslav 2006. Structure of intermediate Wakimoto modules. Journal of Algebra, Vol. 306, Issue. 2, p. 682.

Christodoulopoulou, Konstantina 2008. Whittaker modules for Heisenberg algebras and imaginary Whittaker modules for affine Lie algebras. Journal of Algebra, Vol. 320, Issue. 7, p. 2871.

Bueno, André Cox, Ben and Futorny, Vyacheslav 2009. Free field realizations of the elliptic affine Lie algebra sl(2,R)⊕(ΩR/dR). Journal of Geometry and Physics, Vol. 59, Issue. 9, p. 1258.

Wilson, Benjamin J. 2009. Imaginary Highest-Weight Representation Theory and Symmetric Functions. Communications in Algebra, Vol. 37, Issue. 10, p. 3729.

Cox, Ben L. Futorny, Vyacheslav and Martins, Renato A. 2012. Virasoro Action on Imaginary Verma Modules and the Operator Form of the KZ-Equation. Letters in Mathematical Physics, Vol. 102, Issue. 2, p. 125.

Martins, Renato A. 2013. 𝕁-Intermediate Wakimoto Modules. Communications in Algebra, Vol. 41, Issue. 10, p. 3591.

Bekkert, Viktor Benkart, Georgia Futorny, Vyacheslav and Kashuba, Iryna 2013. New irreducible modules for Heisenberg and affine Lie algebras. Journal of Algebra, Vol. 373, Issue. , p. 284.

Futorny, Vyacheslav and Kashuba, Iryna 2014. Developments and Retrospectives in Lie Theory. Vol. 38, Issue. , p. 175.

Kashuba, Iryna and Martins, Renato A. 2014. Free Field Realizations of Induced Modules for Affine Lie Algebras. Communications in Algebra, Vol. 42, Issue. 6, p. 2428.

Cox, Ben Futorny, Vyacheslav and Misra, Kailash C. 2015. Imaginary Verma modules and Kashiwara algebras for Uq(gˆ). Journal of Algebra, Vol. 424, Issue. , p. 390.

Xu, Chengkang Tan, Shaobin and Wang, Qing 2015. φ-imaginary Verma modules and their generalizations for the toroidal Lie algebras. Journal of Mathematical Physics, Vol. 56, Issue. 4,

Futorny, Vyacheslav Grantcharov, Dimitar and Martins, Renato A. 2015. Localization of Free Field Realizations of Affine Lie Algebras. Letters in Mathematical Physics, Vol. 105, Issue. 4, p. 483.

Cox, Ben Futorny, Vyacheslav and Misra, Kailash C. 2015. An imaginary PBW basis for quantum affine algebras of type 1. Journal of Pure and Applied Algebra, Vol. 219, Issue. 1, p. 83.

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Imaginary Verma Modules for Affine Lie Algebras

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References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Imaginary Verma Modules for Affine Lie Algebras

Abstract

Keywords

References

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