The endomorphism tower of a finite symmetric group

Abstract

We consider the endomorphism tower of a monoid M, that is, the sequence of monoids Endi(M) where End0(M)=M and for all i≥ 1, Endi(M) is the monoid of all endomorphisms of Endi-1(M). We show that for a finite monoid M this sequence does not stabilise in a finite number of steps. Our focus is then on the case where M=Sn, the symmetric group on a finite number n of points. It is well known that other than in exceptional cases (which are avoided by taking n ≥ 7), the corresponding automorphism tower of Sn stabilises at the first step. In spite of the natural nature of this question, nothing was known of the endomorphism tower above the level i=1. We determine (for each n ≥ 7) the elements of End2(Sn) and their multiplication and thus verify that the monoids Endi(Sn) for i=0,1,2 all have group of units isomorphic to Sn. We show that the same is true of End3(Sn).