On automorphism groups of power semigroups over numerical semigroups or over numerical monoids
Abstract
A numerical semigroup S is a cofinite subsemigroup of N, where N is the additive monoid of non-negative integers. Denote by P fin (S) the semigroup consisting of all non-empty finite subsets of S endowed with the operation of setwise addition defined by X+Y=\x+y:x∈ X, y∈ Y\, all X, Y ∈ Pfin(S). We call P fin (S) the finitary power semigroup of S. When 0∈ S (and hence S is a numerical monoid), the family Pfin,0(S) of all finite subsets of S containing 0 is a submonoind of Pfin(S); we call P fin, 0(S) the reduced finitary power monoid of S with the singleton \0\ as zero-element. For a non-empty finite subset X of N, we denote by X and X the minimum and the maximum in X. Tringali and Yan have recently proved in [J.\ Combin.\ Theory Ser.\ A 209 (2025)] that the only non-trivial automorphism of P fin,0(N) is the involution X X - X. By applying Tringali-Yan's result, we in this article determined the automorphism group of the finitary power semigroup P fin(S) of an arbitrary numerical semigroup S. More precisely, if S is the set of all integers larger than or equal to a fixed k ∈ N, then the only non-trivial automorphism of P fin(S) is the involution X X - X+ X; otherwise, P fin(S) has only the identity automorphism.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.