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Some cancellation theorems

Published online by Cambridge University Press:  09 April 2009

A. R. Shastri
Affiliation:
Tata Institute of Fundamental Research, Homi Bhabha Road Bombay 400 005, India
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Abstract

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If G, H and B are groups such that G × BH × B, G/[G, G]. Z(G) is free abelian and B is finitely generated abelian, then GH. The equivalence classes of triples (Vξ,A) where Vand A are finitely generated free abelian groups and ξ: VVA is a bilinear form constitute a semigroup B undera natural external orthogonal sum. This semigroup B is cancellative. A cancellation theorem for class 2 nilpotent groups is deduced.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 1980

References

Baumslag, G. (1975). ‘Direct decompositions of finitely generated torsion free nilpotent groups’, Math. Z. 145, 110.CrossRefGoogle Scholar
Hirshon, R. (1975), ‘The cancellation of an infinite cyclic group in direct products’, Arch. Math.(Basel) 26, 134138.CrossRefGoogle Scholar
Hirshon, R. (1977), ‘Some cancellation theorems with applications to nilpotent groups’, J. Austral. Math. Soc. Ser. A 23, 147155.CrossRefGoogle Scholar
Mislin, G. (1974), Nilpotent groups with finite commutator Subgroups, Reports of the Symposium held at Battelle. Seattle on ‘Localization in Group Theory and Homotopy Theory’, 103120 (Lecture Notes in Mathematics 478, Springer-Verlag, Berlin).Google Scholar
Walker, E. A. (1956), ‘Cancellation in direct sums of groups’, Proc. Amer. Math. Soc. 7, 898902.CrossRefGoogle Scholar
Warfield, R. B. Jr (1976), Nilpotent groups (Lecture Notes in Mathematics 513, Springer-Verlag, Berlin).CrossRefGoogle Scholar