Rosenthal families, pavings and generic cardinal invariants

Abstract

Following D. Sobota we call a family F of infinite subsets of N a Rosenthal family if it can replace the family of all infinite subsets of N in classical Rosenthal's Lemma concerning sequences of measures on pairwise disjoint sets. We resolve two problems on Rosenthal families: every ultrafilter is a Rosenthal family and the minimal size of a Rosenthal family is exactly equal to the reaping cardinal r. This is achieved through analyzing nowhere reaping families of subsets of N and through applying a paving lemma which is a consequence of a paving lemma concerning linear operators on 1n due to Bourgain. We use connections of the above results with free set results for functions on N and with linear operators on c0 to determine the values of several other derived cardinal invariants.