On the automorphism group of the monoid of the integers modulo a prime power

Abstract

This paper determines the structure of the automorphism group of the unit group \((Upe, ·)\) and the monoid \((Z/pe Z, ·)\). For \( e ≥ 5 \), we establish that the automorphism group \( (U2e, ·) \) is the direct product of \( Z/2Z \) with the central product of a dihedral group of order 8 and the cyclic group \( Z/2e-3Z \). Moreover, we show that the automorphism group \( (Z/pe Z, ·) \) is isomorphic to a canonical semidirect product of \( Upe-1 \) and the subgroup of \( (Upe, ·) \) consisting of automorphisms that induce an automorphism of \( (Upf, ·) \) for any integer \( f \) such that \( 0 ≤ f ≤ e \).