Classification of GVZ and Nested GVZ p-groups up to Order p6
Abstract
Let G be a finite group and let (G) denote the set of irreducible complex characters of G. For a normal subgroup N G and ∈ (G), we say that is fully ramified over N if (g)=0 for all g ∈ G N. A group G is said to be of central type if there exists ∈ (G) that is fully ramified over Z(G). Motivated by this notion, an irreducible character ∈ (G) is called of central type if vanishes on G Z(), where \[ Z()=\\, g ∈ G : |(g)|=(1) \,\ \] is the center of . Groups in which every irreducible character is of central type are called GVZ-groups. Furthermore, a group G is said to be nested if for all , ∈ (G), either Z()⊂eq Z() or Z()⊂eq Z(). It is known that a GVZ-group is nilpotent. In this article, we classify all GVZ and nested GVZ p-groups of order at most p6, where p is an odd prime.
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