Supersaturated ideals
Abstract
A σ-ideal I on a set X is supersaturated if for every family F of I-positive sets with |F| < add(I), there exists a countable set that meets every set in F. We show that many well-known ccc forcings preserve supersaturation. We also show that the existence of supersaturated ideals is independent of ZFC plus "There exists an ω1-saturated σ-ideal".
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