On the number of non-cyclic subgroups of finite p-groups
Abstract
Let G be a finite p-group and δ(G) denote the number of all non-cyclic subgroups of G. In this paper, an upper bound for δ(G) is obtained. Furthermore, we prove that δ(G)≤ δ(Mp(1, 1, 1) × Cpn-3) (if p=2, then δ(G)≤ δ(D8× C2n-3)), for any non-elementary abelian p-group G of order pn.
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