The automorphism group of reduced power monoids of finite abelian groups

Abstract

Let H be an additively written monoid and let P0(H) denote the reduced power monoid of H, that is, the monoid consisting of all subsets of H containing 0 with set addition as operation. Following work of Tringali, Wen and Yan, we give a full description of the automorphism group of P0(G), where G is a finite abelian group. More precisely, we show that Aut(P0(G)) and Aut(G) are isomorphic in a canonic way, except in the special case when G is isomorphic to the Klein four-group.

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