On the existence of models in some sporadic simple groups
Article
Received:
- 35 Downloads
- 1 Citations
Keywords
Simple Group Sporadic Simple Group
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
Preview
Unable to display preview. Download preview PDF.
References
- [1]J. H.Conway, R. T.Curtis, S. P.Norton, R. A.Parker and R. A.Wilson, Atlas of finite groups. Oxford 1985.Google Scholar
- [2]R. W. Baddeley, Models and involution models for wreath products and certain Weyl groups. J. London Math. Soc. (2)44, 55–74 (1991).Google Scholar
- [3]H. W.Gollan, Conjugacy class sums for induced modules. Preprint (1992).Google Scholar
- [4]N. F. J. Inglis, R. W. Richardson andJ. Saxl, An explicit model for the complex representations ofS n. Arch. Math.54, 258–259 (1990).Google Scholar
- [5]N. F. J. Inglis andJ. Saxl, An explicit model for the complex representations of the finite general linear groups. Arch. Math.57, 424–431 (1991).Google Scholar
- [6]Z. Janko, A new finite simple group with abelian Sylow-2-subgroups. J. Algebra3, 147–186 (1966).Google Scholar
- [7]A. A. Kljačko, Models for the representations of the groupsGL(n, q) and Weyl groups. Soviet Math. Dokl.24, 496–499 (1981).Google Scholar
- [8]A. A. Klyachko, Models for the complex representations of the groupsGL(n, q). Math. USSR-Sb.48, 365–379 (1984).Google Scholar
- [9]S. A.Linton, G. O.Michler and J. B.Olsson. Fourier transforms with respect to monomial representations. Preprint (1992).Google Scholar
- [10]K.Lux and H.Pahlings, Computational aspects of representation theory of finite groups. In: Representation theory of finite groups and finite-dimensional algebras, G. O. Michler, C. M. Ringel eds., 37–64, Basel-Boston 1991.Google Scholar
Copyright information
© Birkhäuser Verlag 1993