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On Nilpotent Products of Cyclic Groups

Published online by Cambridge University Press:  20 November 2018

Ruth Rebekka Struik
Ruth Rebekka Struik*
Affiliation:
University of British Columbia
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In this paper G = F/Fn is studied for F a free product of a finite number of cyclic groups, and Fn the normal subgroup generated by commutators of weight n. The case of n = 4 is completely treated (F/F2 is well known; F/F3 is completely treated in (2)); special cases of n > 4 are studied; a partial conjecture is offered in regard to the unsolved cases. For n = 4 a multiplication table and other properties are given.

The problem arose from Golovin's work on nilpotent products ((1), (2), (3)) which are of interest because they are generalizations of the free and direct product of groups: all nilpotent groups are factor groups of nilpotent products in the same sense that all groups are factor groups of free products, and all Abelian groups are factor groups of direct products. In particular (as is well known) every finite Abelian group is a direct product of cyclic groups. Hence it becomes of interest to investigate nilpotent products of finite cyclic groups.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 12 , 1960 , pp. 447 - 462
Copyright
Copyright © Canadian Mathematical Society 1960

References

1. Golovin, O.N., Nilpotent products of groups, Mat. Sbornik N.D., 27 (69) (1950), 427-454. Amer. Math. Soc. Translations, 2, 2 (1956), 89115.Google Scholar
2. Golovin, O.N., Metabelian products of groups, Mat. Sbornik N.S., 28 (70) (1951), 431-444. Amer. Math. Soc. Translations, 2, 2 (1956), 117132.Google Scholar
3. Golovin, O.N., On the isomorphism of nilpotent decompositions of groups, Mat. Sbornik N.S., 28 (70) (1951), 445-452. Amer. Math. Soc. Translations, 2, 2 (1956), 133140.Google Scholar
4. Gruenberg, K.W., Residual properties of infinite soluble groups, Proc. London Math. Soc, Series 3, 7 (1957), 2962.Google Scholar
5. Hall, Philip, A contribution to the theory of groups of prime-power order, Proc. London Math. Soc, 36 (1934), 2995.Google Scholar
6. Hall, Philip, Nilpotent groups, Lecture Notes of Summer Seminar, Canadian Mathematical Congress (University of Alberta, August, 1957).Google Scholar
7. Marshall, Hall, A basis for free Lie rings and higher commutators in free groups, Proc. Amer. Math. Soc, 1 (1950), 575581.Google Scholar
8. Karass, A. and Solitar, D., On free products of groups, Bull. Amer. Math. Soc, 68 (1957), 407 Google Scholar
9. Levi, Friedrich and van der Waerden, B. L., Ueber eine Besondere Klasse von Gruppen, Abhandlungen aus dem Hamburg Universitât., 9 (1932), 154158.Google Scholar
10. Lyndon, R C, On Burnsides problem, I. Trans. Amer. Math. Soc, 77 (1954), 202215.Google Scholar
11. Magnus, W., Ueber Beziehungen zwischen hôheren Kommutatoren, J. Reine Angew. Math., 177 (1937), 105115.Google Scholar
12. Moran, S., Associative operations on group I. Proc. London Math. Soc, 6 (1956), 581596.Google Scholar
13. Sanov, I.N., Establishment of a connection between periodic groups with prime power periods and Lie rings. Izvestiya Akad Nauk SSSR Ser Mat., 16 (1952), 2358.Google Scholar
14. Struik, R.R., Notes on a paper by sanov, Proc. Amer. Math. Soc, 8 (1957), 638641.Google Scholar
15. Struik, R.R.,A note on prime power groups, Can. Math. Bull., 3 (1960), 2730.Google Scholar