Grzegorz Plebanek: Strictly positive measures on Boolean algebras
20/03/18 21:43
Tuesday, March 27, 2018 17:15
Room: D1-215
Speaker: Grzegorz Plebanek
Title: Strictly positive measures on Boolean algebras
Abstract. \(SPM\) denotes the class of Boolean algebras possessing strictly positive measure (finitely additive and probabilistic). Together with Menachem Magidor, we consider the following problem: Assume that \(B\) belongs to \(SPM\) for every subalgebra \(B\) of a given algebra \(A\) such that \(|B|\le\mathfrak c\). Does it imply that the algebra \(A\) belongs to \(SPM\)?
It turns out that the positive answer follows from the existence of some large cardinals, while the counterexample can be found in the model of \(V=L\).
Room: D1-215
Speaker: Grzegorz Plebanek
Title: Strictly positive measures on Boolean algebras
Abstract. \(SPM\) denotes the class of Boolean algebras possessing strictly positive measure (finitely additive and probabilistic). Together with Menachem Magidor, we consider the following problem: Assume that \(B\) belongs to \(SPM\) for every subalgebra \(B\) of a given algebra \(A\) such that \(|B|\le\mathfrak c\). Does it imply that the algebra \(A\) belongs to \(SPM\)?
It turns out that the positive answer follows from the existence of some large cardinals, while the counterexample can be found in the model of \(V=L\).