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Finite p-groups G with p>2 and d(G)=2 having exactly one maximal subgroup which is neither abelian nor minimal nonabelian (CROSBI ID 169255)
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Zvonimir Janko
Finite p-groups G with p>2 and d(G)=2 having exactly one maximal subgroup which is neither abelian nor minimal nonabelian // Glasnik matematički, 45 (2010), 65; 441-452
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Zvonimir Janko
engleski
Finite p-groups G with p>2 and d(G)=2 having exactly one maximal subgroup which is neither abelian nor minimal nonabelian
We give here a complete classification (up to isomotphism) of the title groups (Theorem 8 and Zheorem 9). The corresponding problem for p=2 was solved in /4/.
Minimal nonabelian p-groups; A2-groups; metacyclic p-groups; Frattini subgroups; Hall-Petrescu formula; generators and relations.
Prof.dr. Zvonimir Janko je istraživač na projektu iz hrvatske dijaspore.
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