Hostname: page-component-cd9895bd7-dk4vv Total loading time: 0 Render date: 2024-12-26T07:15:18.978Z Has data issue: false hasContentIssue false

Fitting classes of certain metanilpotent groups

Published online by Cambridge University Press:  18 May 2009

Hermann Heinenken
Affiliation:
Mathematishes Institut, Universität Würzburg, Am Hubland, 8700 Würzburg, Germany
Rights & Permissions [Opens in a new window]

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

There are two families of group classes that are of particular interest for clearing up the structure of finite soluble groups: Saturated formations and Fitting classes. In both cases there is a unique conjugacy class of subgroups which are maximal as members of the respective class combined with the property of being suitably mapped by homomorphisms (in the case of saturated formations) or intersecting suitably with normal subgroups (when considering Fitting classes). While it does not seem too difficult, however, to determine the smallest saturated formation containing a given group, the same problem regarding Fitting classes does not seem answered for the dihedral group of order 6. The object of this paper is to determine the smallest Fitting class containing one of the groups described explicitly later on; all of them are qp-groups with cyclic commutator quotient group and only one minimal normal subgroup which in addition coincides with the centre. Unlike the results of McCann [7], which give a determination “up to metanilpotent groups”, the description is complete in this case. Another family of Fitting classes generated by a metanilpotent group was considered and described completely by Hawkes (see [5, Theorem 5.5 p. 476]); it was shown later by Brison [1, Proposition 8.7, Corollary 8.8], that these classes are in fact generated by one finite group. The Fitting classes considered here are not contained in the Fitting class of all nilpotent groups but every proper Fitting subclass is. They have the following additional properties: all minimal normal subgroups are contained in the centre (this follows in fact from Gaschiitz [4, Theorem 10, p. 64]) and the nilpotent residual is nilpotent of class two (answering the open question on p. 482 of Hawkes [5]), while the quotient group modulo the Fitting subgroup may be nilpotent of any class. In particular no one of these classes consists of supersoluble groups only.

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 1994

References

REFERENCES

1.Brison, O. J., Relevant groups for Fitting classes, J. Algebra 68 (1981), 3153.CrossRefGoogle Scholar
2.Carter, R. W. and Fong, P., The Sylow 2-subgroups of the finite classical groups, J. Algebra 1 (1964), 139151.Google Scholar
3.Doerk, K. and Hawkes, T. O., Finite Soluble Groups. (De Gruyter, Berlin, New York 1992).CrossRefGoogle Scholar
4.Gaschütz, W., Lectures on subgroups of Sylow type in finite soluble groups. Notes on Pure Mathematics 11 (ANU, Canberra 1979).Google Scholar
5.Hawkes, T. O., On metanilpotent Fitting classes, J. Algebra 63 (1980), 459483.CrossRefGoogle Scholar
6.Loos, M., Die von einer Gruppe der Ordnung 54 erzeugte Fittingklasse. Diploma Thesis, Würzburg 1992.Google Scholar
7.McCann, B., Examples of minimal Fitting classes of finite groups. Arch. Math. 49 (1987), 179186.CrossRefGoogle Scholar
8.Weir, A. J., Sylow p-subgroups of the classical groups over finite fields with characteristic prime to p, Proc. Amer. Math. Soc. 6 (1955), 529533.Google Scholar
9.Zassenhaus, H., Verfahren, Ein, jeder endlichen p-Gruppe einen Lie-Ring mit der Charakteristik p zuzuordnen, Abh. Math. Sent. Univ. Hamburg 13 (1939), 200207.CrossRefGoogle Scholar