Conjugacy classes of maximal cyclic subgroups
Abstract
In this paper, we set η (G) to be the number of conjugacy classes of maximal cyclic subgroups of G. We consider η and direct and semi-direct products. We characterize the normal subgroups N so that η (G/N) = η (G). We set G- = \ g ∈ G g ~is~not ~maximal~cyclic \. We show if G- < G, then G/ G- is either (1) an elementary abelian p-group for some prime p, (2) a Frobenius group whose Frobenius kernel is a p-group of exponent p and a Frobenius complement has order q for distinct primes p and q, or (3) isomorphic to A5.
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