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Solvable-by-finite subgroups of GL(2, F)

Published online by Cambridge University Press:  18 May 2009

Abdul Majeed
Affiliation:
University of the Punjab (Lahore)
A. W. Mason
Affiliation:
University of Glasgow
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In a recent paper [5] Tits proves that a linear group over a field of characteristic zero is either solvable-by-finite or else contains a non-cyclic free subgroup. In this note we determine all the infinite irreducible solvable-by-finite subgroups of GL(2, F), where F is an algebraically closed field of characteristic zero. (Every reducible subgroup of GL(2, F) is metabelian.) In addition, we prove that an irreducible subgroup of GL(2, F) has an irreducible solvable-by-finite subgroup if and only if it contains an element of zero trace.

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 1978

References

REFERENCES

1.Dixon, J. D., The structure of linear groups (Van Nostrand, 1971).Google Scholar
2.Dornhoff, L., Group representation theory, part A (Marcel Dekker, 1971).Google Scholar
3.Majeed, A., Reducible and irreducible 2-generator subgroups of SL(2,ℂ), Punjab Univ. J. Math. (Lahore). 8 (1975), 19.Google Scholar
4.Majeed, A., Two generator subgroups of SL(2, ℂ), Ph.D. dissertation, Carleton University, Ottawa (1974).Google Scholar
5.Tits, J., Free subgroups in linear groups, J. Algebra 20 (1972), 250270.CrossRefGoogle Scholar
6.Wehrfritz, B. A. F., Infinite linear groups (Springer, 1973).Google Scholar