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Projective representations of rotation subgroups of Weyl groups

Published online by Cambridge University Press:  24 October 2008

D. Theo
D. Theo
Affiliation:
Department of Mathematics, University of Zambia, Lusaka, Zambia
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Extract

By exploiting the well known spin representations of the orthogonal groups O(l), Morris [12] was able to give a unified construction of some of the projective representations of Weyl groups W(Φ) which had previously only been available by ad hoc means [5]. The principal purpose of the present paper is to give a corresponding construction for projective representations of the rotation subgroups W+(Φ) of Weyl groups. Thus we construct non-trivial central extensions of W+(Φ) via the well-known double coverings of the rotation groups SO(l). This adaptation allows us to give a unified way of obtaining the basic projective representations of W+(Φ) from those of W(Φ) determined in [12]. Hence our work is a development of the recent work of Morris, and is an extension of Schur's work on the alternative groups [15].

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 101 , Issue 1 , January 1987 , pp. 21 - 35
Copyright
Copyright © Cambridge Philosophical Society 1987

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References

REFERENCES

[1]Atiyah, M., Bott, R. and Shapiro, A.. Clifford modules. Topology 3 (1964), 338.CrossRefGoogle Scholar
[2]Bourbaki., N.Groupes et Algèbres de Lie, chap. iv–vi (Hermann, 1968).Google Scholar
[3]Carter., R. W.Conjugacy classes in the Weyl group. Compositio Math. 25 (1972), 159.Google Scholar
[4]Frame., J. S.The classes and representations of groups of 27 lines and 28 bitangents. Ann. Mat. Pura Appl. 32 (1951), 83119.CrossRefGoogle Scholar
[5]Ihara, S. and Yokonuma., T.On the second cohomology groups (Schur multipliers) of finite reflection groups. J. Fac. Sci. Univ. Tokyo, 11 (1965), 155171.Google Scholar
[6]Lam., T.The Algebraic Theory of Quadratic Forma (Benjamin, 1973).Google Scholar
[7]Magnus, W., Karrass, A. and Solitar., D.Combinatorial Group Theory (Dover, 1976).Google Scholar
[8]Maxwell., G.The Schur multipliers of rotation subgroups of Coxeter groups. J. Algebra 53 (1978), 440451.CrossRefGoogle Scholar
[9]Morris., A. O.The spin representations of the symmetric groups. Proc. London Math. Soc. (3) 12 (1962), 5576.CrossRefGoogle Scholar
[10]Morris., A. O.Projective representations of Weyl groups. J. London Math. Soc. (2) 8 (1974), 125–33.CrossRefGoogle Scholar
[11]Morris., A. O.Projective characters of exceptional Weyl groups. J. Algebra 29 (1974), 567–86.CrossRefGoogle Scholar
[12]Morris., A. O.Projective representations of reflection groups. Proc. London Math. Soc. (3) 32 (1976), 403–20.CrossRefGoogle Scholar
[13]Morris., A. O.Projective representations of reflection groups II. Proc. London Math. Soc. (3) 40 (1980), 553–76.CrossRefGoogle Scholar
[14]Read., E. W.The projective representations of the generalized symmetric group. J. Algebra 46 (1977), 102–33.CrossRefGoogle Scholar
[15]Schur., I.Über die Darstellung der symmetrischen und der alternierenden Gruppe durch gebrochene lineare Substitutionen. J. für Math. 139 (1911), 155250.Google Scholar
[16]Theo., D.The α-regular classes of rotation subgroups of Weyl groups. J. Algebra (to appear).Google Scholar