A non-cyclic finite p-group G is said to be thin if every normal subgroup of G lies between two consecutive terms of the lower central series and |γi(G):γi+1(G)|≤p2 for all i≥1. In this paper, we determine Beauville structures in metabelian thin p-groups.

Metabelian thin Beauville p-groups

Gavioli, Norberto
;
2018-01-01

Abstract

A non-cyclic finite p-group G is said to be thin if every normal subgroup of G lies between two consecutive terms of the lower central series and |γi(G):γi+1(G)|≤p2 for all i≥1. In this paper, we determine Beauville structures in metabelian thin p-groups.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11697/119630
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