On automorphism group of the reduced finitary power monoid of the additive group of integers

Abstract

Let Z be the additive group of all integers and N the sub-monoid of Z of all non-negative integers. For a finite subset X of Z, we denote by max\ X the maximum member in X. %Recently, Tringali and Yan (tri2, J. Combin. Theory Ser. A, 209(2025)) proved that the only non-trivial automorphism of P fin, 0(N) %is the involution X β(X) - X, and they posed a conjecture: The automorphism group of the reduced power monoid P fin, 0(S) of a numerical %monoid S properly contained in N must be the identity. Recently, Tringali and Yan (tri2, J. Comb. Theory, Ser. A, 209(2025)) proved that the only non-trivial automorphism of P fin, 0(N) is the involution X max\ X - X. Following up on the result in tri2, Tringali and Wen triwen proved that the automorphism group of the power monoid P fin(Z) is isomorphic to Z2 × Dih∞, where Dih∞ refers to the infinite dihedral group. At the end part of triwen, Tringali and Wen left a conjecture as follows: The only non-trivial automorphism of the reduced finitary power monoid of (Z,+) is given by X -X. In the present paper, we aim to give a positive proof for the above conjecture.