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Cardinal Invariants and Rosenthal families
- Speaker(s)
- Arturo Antonio Martínez Celis Rodríguez
- Affiliation
- IMPAN
- Date
- Oct. 31, 2019, 4:15 p.m.
- Room
- room 5050
- Seminar
- Topology and Set Theory Seminar
Rosenthal's lemma is a classical result that concerns sequences of measures on pairwise disjoint sets and a Rosenthal family is a collection of infinite subsets of the natural numbers that can replace the collection of all infinite subsets of natural numbers in Rosenthal's lemma. In this talk we will see that all ultrafilters are Rosenthal families and that the minimal cardinality of a Rosenthal family is r, where r is the reaping number.
