p-groups with small number of character degrees and their normal subgroups

Abstract

If G be a finite p-group and is a non-linear irreducible character of G, then (1)≤ |G/Z(G)|12. In fernandez2001groups, Fern\'andez-Alcober and Moret\'o obtained the relation between the character degree set of a finite p-group G and its normal subgroups depending on whether |G/Z(G)| is a square or not. In this paper we investigate the finite p-group G where for any normal subgroup N of G with G' ≤ N either N≤ Z(G) or |NZ(G)/Z(G)|≤ p and obtain some alternate characterizations of such groups. We find that if G is a finite p-group with |G/Z(G)|=p2n+1 and G satisfies the condition that for any normal subgroup N of G either G' ≤ N or N≤ Z(G), then cd(G)=\1, pn\. We also find that if G is a finite p-group with nilpotency class not equal to 3 and |G/Z(G)|=p2n and G satisfies the condition that for any normal subgroup N of G either G' ≤ N or |NZ(G)/Z(G)|≤ p, then cd(G) ⊂eq \1, pn-1, pn\.