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On a Theorem of Bovdi

Published online by Cambridge University Press:  20 November 2018

M, M. Parmenter*
Affiliation:
University of Alberta, Edmonton, Alberta
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If p is a prime, we call an element x ≠ 1 of a group G a generalized p-element if, for every n ≧ 1, there exists r ≧ 0 such that xprGn, where Gn is the nth term of the lower central series of G. Bovdi [1] proved that if G is a finitely generated group having a generalized p-element, and if ∩nΔn(Z(G) = 0 where Δ(Z(G)) is the augmentation ideal, then G is residually a finite p-group.

We recall that if R is a ring, then the nth dimension subgroup of G over R, denoted by Dn(R(G)), is defined to be {g | g – 1 ∈ Δn(R(G))}. In this note, we show that if G is finitely generated, then ∩nDn(Zp(G)) = 1 ⇔ ∩nΔn(Zp (G)) = 0 ⇔ G is residually a finite p-group.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1971

Footnotes

This work will form part of the author's Ph.D. thesis, written at the University of Alberta under the direction of Professor S. K. Sehgal.

References

1. Bovdi, A. A., The intersection of the powers of the fundamental ideal of an integral group ring, Mat. Zametki 2 (1967), 129132.Google Scholar
2. Hall, P., Nilpotent groups (Canad. Math. Congress, University of Alberta, 1957).Google Scholar
3. Hartley, B., The residual nilpotence of wreath products, Proc. London Math. Soc. 20 (1970), 365392.Google Scholar
4. Mital, J. N., On residual nilpotence, J. London Math. Soc. 2 (1970), 337345.Google Scholar
5. Passi, I. B. S., Polynomial maps on groups, J. Algebra 9 (1968), 121151.Google Scholar
6. Passi, I. B. S., Dimension subgroups, J. Algebra 9 (1968), 152182.Google Scholar
7. Sandling, R., The modular group rings of p-groups, Ph.D. Thesis, University of Chicago, 1969.Google Scholar