Note di Matematica

In a previous work with Mildenberger and Shelah, we showed that the combinatorics of the selection hypotheses involving τ-covers is sensitive to the selection operator used. We introduce a natural generalization of Scheepers’ selection operators, and show that: (1) A slight change in the selection operator, which in classical cases makes no difference,leads to different properties when τ-covers are involved. (2) One of the newly introduced properties sheds some light on a problem of Scheepers concerning τ-covers. Improving an earlier result, we also show that no generalized Luzin set satisfies U_fin(Γ,τ)