Skip to the main content

Original scientific paper

https://doi.org/10.3336/gm.52.1.07

Finite nonabelian p-groups of exponent >p with a small number of maximal abelian subgroups of exponent >p

Zvonimir Janko ; Mathematical Institute, University of Heidelberg, 69120 Heidelberg, Germany


Full text: english pdf 104 Kb

page 99-105

downloads: 540

cite


Abstract

Y. Berkovich has proposed to classify nonabelian finite p-groups G of exponent >p which have exactly p maximal abelian subgroups of exponent >p and this was done here in Theorem 1 for p=2 and in Theorem 2 for p>2. The next critical case, where G has exactly p+1 maximal abelian subgroups of exponent >p was done only for the case p=2 in Theorem 3.

Keywords

Finite p-groups; minimal nonabelian subgroups; maximal abelian subgroups; quasidihedral 2-groups; Hughes subgroup

Hrčak ID:

183125

URI

https://hrcak.srce.hr/183125

Publication date:

21.6.2017.

Visits: 1.150 *