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On the centre of the cyclotomic Hecke algebra of G(m, 1, 2)

Part of: Representation theory of groups Lie algebras and Lie superalgebras

Published online by Cambridge University Press:  12 April 2012

Kevin McGerty
Kevin McGerty
Affiliation:
Mathematical Institute, University of Oxford, 24–29 St Giles', Oxford OX1 3LB, UK ([email protected])
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Abstract

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We compute the centre of the cyclotomic Hecke algebra attached to G(m, 1, 2) and show that if q ≠ 1, it is equal to the image of the centre of the affine Hecke algebra Haff2. We also briefly discuss what is known about the relation between the centre of an arbitrary cyclotomic Hecke algebra and the centre of the affine Hecke algebra of type A.

Keywords

affine and cyclotomic Hecke algebrascentresrepresentation theoryalgebraic theory

MSC classification

Secondary: 20C08: Hecke algebras and their representations 17B10: Representations, algebraic theory (weights)
Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 55 , Issue 2 , June 2012 , pp. 497 - 506
Copyright
Copyright © Edinburgh Mathematical Society 2012

References

1.Ariki, S., On the semi-simplicity of the Hecke algebra of , J. Alg. 169 (1994), 216225.CrossRefGoogle Scholar
2.Ariki, S., On the decomposition numbers of the Hecke algebra of G(m, 1, , n), J. Math. Kyoto Univ. 36(4) (1996), 789808.Google Scholar
3.Ariki, S. and Koike, K., A Hecke algebra of and construction of its irreducible representations, Adv. Math. 106(2) (1994), 216243.CrossRefGoogle Scholar
4.Brundan, J., Centers of degenerate cyclotomic Hecke algebras and parabolic category , Represent. Theory 12 (2008), 236259.CrossRefGoogle Scholar
5.Brundan, J. and Kleshchev, S., Blocks of cyclotomic Hecke algebras and Khovanov–Lauda algebras, Invent. Math. 178(3) (2009), 451484.CrossRefGoogle Scholar
6.Dipper, R. and Mathas, A., Morita equivalences of Ariki–Koike algebras, Math. Z. 240 (2002), 579610.CrossRefGoogle Scholar
7.Francis, A. and Graham, J., Centres of Hecke algebras: the Dipper–James conjecture, J. Alg. 306(1) (2006), 244267.CrossRefGoogle Scholar
8.Lusztig, G., Affine Hecke algebras and their graded version, J. Am. Math. Soc. 2(3) (1989), 599635.CrossRefGoogle Scholar
9.Lyle, S. and Mathas, A., Blocks of cyclotomic Hecke algebras, Adv. Math. 216 (2007), 854878.CrossRefGoogle Scholar
10.Mathas, A., The representation theory of the Ariki–Koike and cyclotomic q-Schur algebras, Representation theory of algebraic groups and quantum groups, Adv. Stud. Pure Math. 40 (2004), 261320.CrossRefGoogle Scholar