There is a P-measure in the random model

Abstract

We say that a finitely additive probability measure μ on ω is a P-measure if it vanishes on points and for each decreasing sequence (En) of infinite subsets of ω there is E⊂eqω such that E⊂eq* En for each n∈ω and μ(E) = n∞μ(En). Thus, P-measures generalize in a natural way P-points and it is known that, similarly as in the case of P-points, their existence is independent of ZFC. In this paper we show that there is a P-measure in the model obtained by adding any number of random reals to a model of CH. As a corollary, we obtain that in the classical random model ω* contains a nowhere dense ccc closed P-set.