Ideal convergent subsequences and rearrangements for divergent sequences of functions

Abstract

Let be an ideal on which is either analytic or coanalytic. Assume that (fn) is a sequence of functions with the Baire property from a Polish space X into a complete metric space Z, which is divergent on a comeager set. We investigate the Baire category of -convergent subsequences and rearrangements of (fn). Our result generalizes a theorem of Kallman. A similar theorem for subsequences is obtained if (X,μ) is a σ-finite complete measure space and a sequence (fn) of measurable functions from X to Z is -divergent μ-almost everywhere. Then the set of subsequences of (fn), -divergent μ-almost everywhere, is of full product measure on \ 0,1\. Here we assume additionally that I has property (G).