Normalizer Quotients of Symmetric Groups and Inner Holomorphs

Abstract

We show that every finite group T is isomorphic to a normalizer quotient NSn(H)/H for some n and a subgroup H≤ Sn. We show that this holds for all large enough n n0(T) and also with Sn replaced by An. The two main ingredients in the proof are a recent construction due to Cornulier and Sambale of a finite group G with Out(G) T (for any given finite group T) and the determination of the normalizer in Sym(G) of the inner holomorph InHol(G)≤Sym(G) for any centerless indecomposable finite group G, which may be of independent interest.