Maximal irredundant families of minimal size in the alternating group
Abstract
Let G be a finite group. A family M of maximal subgroups of G is called `irredundant' if its intersection is not equal to the intersection of any proper subfamily. M is called `maximal irredundant' if M is irredundant and it is not properly contained in any other irredundant family. We denote by Mindim(G) the minimal size of a maximal irredundant family of G. In this paper we compute Mindim(G) when G is the alternating group on n letters.
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