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Idempotent ideals on Abelian groups
Journal of Symbolic Logic 49 (3):813-817 (1984)
Abstract
An ideal I defined on a group G is called idempotent if for every $A \in I, \{g \in G: Ag^{-1} \not\in I\} \in I$ . We show that a countably complete idempotent ideal on an abelian group cannot be prime but may have strong saturation propertiesOther Versions
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