Finite groups with nearly half as many cyclic subgroups as elements

Abstract

Suppose C(G) denotes the set of all cyclic subgroups of a finite group G, and O2(G) denotes the number of elements of order 2 in G. In [Marius T., Finite groups with a certain number of cyclic subgroups. The American Mathematical Monthly 122.3 (2015): 275-276], an open problem was asked to classify the groups G with |C(G)|=|G|-r, where 2 ≤ r ≤ |G|-1. In this article, first we show that, for an odd prime p, there are infinitely many groups G with |C(G)|= |G|2, |C(G)|=|G|pq-1 (for prime q≠ p), or |C(G)|=|G|2+2k, k≥ 0. Then, we partially answer the open question by classifying finite groups G having |G|2-1≤ |C(G)| ≤ |G|2+1 for some fix values of O2(G). Finally, we provide a complete list of finite groups G having |C(G)|=|G|+(2r+1)2 for r≥-1.