Glasnik matematički, Vol. 44 No. 1, 2009.
Original scientific paper
https://doi.org/10.3336/gm.44.1.09
Finite p-groups in which some subgroups are generated by elements of order p
Yakov Berkovich
; Department of Mathematics, University of Haifa, Haifa 31905, Israel
Abstract
We prove that if a p-group G of exponent pe > p has no subgroup H such that |Ω1(H)| = pp and H/Ω1(H) is cyclic of order pe-1 ≥ p and H is regular provided e = 2, then G is either absolutely regular or of maximal class. This result supplements the fundamental theorem of Blackburn on p-groups without normal subgroups of order pp and exponent p. For p > 2, we deduce even stronger result than (respective result for p = 2 is unknown) a theorem of Bozikov and Janko.
Keywords
p-groups of maximal class; regular and absolutely regular p-groups; metacyclic p-groups; Lp-groups
Hrčak ID:
36950
URI
Publication date:
21.5.2009.
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