On topological sigma-ideals

Abstract

The concept of S-topological σ-ideal in measurable space (X, S) was introduced by Hejduk and using a theorem of Wagner on convergence of measurable functions characterized S-topological σ-ideals. In this paper, we give a general construction of S-topological σ-ideals from structures induced by σ-algebras and weakly upper semicontinuous ω-small systems. We also show that instead of weak upper semicontinuity, if we use upper semicontinuity, we get S-uniformizable σ-ideals. This generalizes the approach of Wagner and Wilczynski metrizing Boolean Lattice of measurable functions