Word Images and Their Impostors in Finite Nilpotent Groups

Abstract

It was shown by Lubotzky in 2014 that automorphism invariant subsets of finite simple groups which contain identity are always word images. In this article, we study word maps on finite nilpotent groups and show that for arbitrary finite groups, the number of automorphism invariant subsets containing identity which are not word images, referred to as word image impostors, may be arbitrarily larger than the number of actual word images. In the course of it, we construct a 2-exhaustive set of word maps on nilpotent groups of class 2 and demonstrate its minimality in some cases.

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