Ideals in P G and β G

Abstract

For a discrete group G, we use the natural correspondence between ideals in the Boolean algebra PG of subsets of G and closed subsets in the Stone-Cech compactifi-cation β G as a right topological semigroup to introduce and characterize some new ideals in β G. We show that if a group G is either countable or Abelian then there are no closed ideals in β G maximal in G*, G* = β G G, but this statement does not hold for the group S of all permutations of an infinite cardinal . We characterize the minimal closed ideal in β G containing all idempotents of G*.