Torsion groups and the Bienvenu--Geroldinger conjecture

Abstract

Equipped with the operation of setwise multiplication induced by a (multiplicatively written) monoid H on its parts, the collection of all finite subsets of H containing the identity element is itself a monoid, denoted by Pfin, 1(H) and called the reduced finitary power monoid of H. One is naturally led to ask whether, for all H and K in a given class of monoids, Pfin,1(H) and Pfin,1(K) are isomorphic if and only if H and K are. The problem originates from a conjecture of Bienvenu and Geroldinger that was recently settled by the authors. Here, we provide a positive answer to the problem in the case where H and K are cancellative monoids, one of which is torsion. In particular, the answer is in the affirmative when H and K are torsion groups. Whether the conclusion extends to arbitrary groups remains open.