Note on s0 nonmeasurable unions

Abstract

In this note we consider an arbitrary families of sets of s0 ideal introduced by Marczewski-Szpilrajn. We show that in any uncountable Polish space X and under some combinatorial and set theoretical assumptions (cov(s0)= for example), that for any family ⊂eq s0 with =X, we can find a some subfamily '⊂eq such that the union ' is not s-measurable. We have shown a consistency of the cov(s0)=ω1< and existence a partition of the size ω1 ∈ [s0]ω of the real line , such that there exists a subfamily '⊂eq for which ' is s-nonmeasurable. We also showed that it is relatively consistent with ZFC theory that ω1< and existence of m.a.d. family such that is s-nonmeasurable in Cantor space 2ω or Baire space ωω. The consistency of a<cov(s0) and cov(s0)<a is proved also.