Ramsey-product subsets of a group
Abstract
We say that a subset S of an infinite group G is a Ramsey-product subset if, for any infinite subsets X, Y of G, there exist x ∈ X and y∈ Y such that x y ∈ S and y x ∈ S . We show that the family of all Ramsey-product subsets of G is a filter and defines the subsemigroup G*G* of the semigroup G* of all free ultrafilters on G.
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