Element orders in extraspecial groups

Abstract

By using the structure and some properties of extraspecial and generalized/almost extraspecial p-groups, we explicitly determine the number of elements of specific orders in such groups. As a consequence, one may find the number of cyclic subgroups of any (generalized/almost) extraspecial group. For a finite group G, the ratio of the number of cyclic subgroups to the number of subgroups is called the cyclicity degree of G and is denoted by cdeg(G). We show that the set containing the cyclicity degrees of all finite groups is dense in [0, 1]. This is equivalent to giving an affirmative answer to the following question posed by T\'oth and Tarnauceanu: ``For every a∈ [0, 1], does there exist a sequence (Gn)n≥ 1 of finite groups such that n∞ cdeg(Gn)=a?". We show that such sequences are formed of finite direct products of extraspecial groups of a specific type.

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