Power Semigroups and Two Rigidity Theorems for Groups

Abstract

Let P(H) be the semigroup obtained by endowing the family of all non-empty subsets of a semigroup H with the setwise operation naturally induced by H on its power set, and denote by Pfin(H) the subsemigroup of P(H) consisting of all non-empty finite subsets of H. We obtain (as a corollary of a theorem of independent interest) that if H is a group and K is a semigroup, then P(H) P(K) implies H K. The finitary analogue of this statement is considerably more difficult, and we prove it only for H an additive subgroup of the rationals. Most notably, the proof of the second result relies, in a rather circuitous way, on a special case of the Evertse--Schlickewei--Schmidt theorem.