On the maximum number of subgroups of a finite group
Abstract
Given a finite group R, we let Sub(R) denote the collection of all subgroups of R. We show that |Sub(R)|< c· |R|2|R|4, where c<7.372 is an explicit absolute constant. This result is asymptotically best possible. Indeed, as |R| tends to infinity and R is an elementary abelian 2-group, the ratio |Sub(R)||R|2|R|4 tends to c.
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