On the base size of a finite group on its action on the lattice of subgroups
Abstract
Given a finite group R, we investigate the base size of the action of the automorphism group of R on the lattice of subgroups of R. Our main result shows that this base size is 1 if and only if R is cyclic. Our motivation arises from a conjecture of Babai on the problem of representing groups as automorphism groups of lattices with a bounded number of orbits.
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