On totally k-closed nilpotent groups

Abstract

A group G is said to be totally k-closed for a positive integer k if, in each of its faithful permutation representations on a set k, G is the largest subgroup of the symmetric group Sym() that preserves every k-orbit in the induced action on the set ×…× =k. We prove that for k≥1, every finite nilpotent group with Sylow subgroups of orders at most pk for all primes p dividing |G| is totally k-closed if and only if it does not contain an elementary abelian subgroup Zpk for every prime p.

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