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arxiv: 1710.08979 · v1 · pith:K52RVHGGnew · submitted 2017-10-24 · 🧮 math.GR

Intense automorphisms of finite groups

classification 🧮 math.GR
keywords groupsautomorphismsfinitegroupintenseclassdeterminedmathrm
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Let $G$ be a group. An automorphism of $G$ is called intense if it sends each subgroup of $G$ to a conjugate; the collection of such automorphisms is denoted by $\mathrm{Int}(G)$. In the special case in which $p$ is a prime number and $G$ is a finite $p$-group, one can show that $\mathrm{Int}(G)$ is the semidirect product of a normal $p$-Sylow and a cyclic subgroup of order dividing $p-1$. In this thesis we classify the finite $p$-groups whose groups of intense automorphisms are not themselves $p$-groups. It emerges from our investigation that the structure of such groups is almost completely determined by their nilpotency class: for $p>3$, they share a quotient, growing with their class, with a uniquely determined infinite $2$-generated pro-$p$ group.

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