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A class of groups rich in finite quotients

Published online by Cambridge University Press:  18 May 2009

Vonn Walter
Vonn Walter
Affiliation:
Department of Mathematics, Southeastern Oklahoma State University, Durant, OK, 74701, USA
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If X is a class of groups, the class of counter-Xgroups is defined to consist of all groups having no non-trivial X-quotients. The counter-abelian groups are the perfect groups and the counter-counter-abelian groups are the imperfect groups studied by Berrick and Robinson [2]. This paper is concerned with the class of counter-counterfinite groups. It turns out that these are the groups in which any non-trivial quotient has a non-trivial representation over any finitely generated domain (Theorem 1.1), so we shall call these groups highly representable or HR-groups.

Type
Research Article
Information
Glasgow Mathematical Journal , Volume 38 , Issue 3 , September 1996 , pp. 263 - 274
Copyright
Copyright © Glasgow Mathematical Journal Trust 1996

References

REFERENCES

1.Arnold, D. M., Finite Rank Torsion Free Abelian Croups and Rings (Springer, Berlin, 1982).CrossRefGoogle Scholar
2.Berrick, A. J. and Robinson, D. J. S., Imperfect groups, J. Pure Appl. Algebra 88 (1993), 322.CrossRefGoogle Scholar
3.Fuchs, L., Infinite Abelian Groups, 2 vols. (Academic Press, New York, 1970/1973).Google Scholar
4.Gruenberg, K. W., Residual properties of infinite soluble groups, Proc. London Math. Soc. (3) 7 (1957), 2962.CrossRefGoogle Scholar
5.Hall, P., The Edmonton Notes on Nilpotent Groups (Queen Mary College Mathematics Notes, 1969).Google Scholar
6.Hickin, K. K., Complete universal locally finite groups, Trans. Amer. Math. Soc. 239 (1978), 213227.CrossRefGoogle Scholar
7.Kuroš, A. G., The Theory of Groups, 2nd ed., vol. 2 (Chelsea, New York, 1960).Google Scholar
8.Robinson, D. J. S., Finiteness Conditions and Generalized Solvable Groups, 2 vols., (Springer, Berlin, 1972).Google Scholar
9.Robinson, D. J. S., A Course in the Theory of Groups (Springer, New York, 1980).Google Scholar
10.Rose, J. S., A Course on Group Theory (Cambridge University Press, 1978).Google Scholar
11.Scott, W. R., Group Theory (Prentice-Hall, Englewood Cliffs, NJ, 1964).Google Scholar
12.Warfield, R. B., Nilpotent Groups (Springer, Berlin, 1976).CrossRefGoogle Scholar
13.Wehrfritz, B. A. F., Infinite Linear groups (Springer, Berlin, 1973).CrossRefGoogle Scholar