Countable dense homogeneity in powers of zero-dimensional definable spaces

Abstract

We show that, for a coanalytic subspace X of 2ω, the countable dense homogeneity of Xω is equivalent to X being Polish. This strengthens a result of Hrus\'ak and Zamora Avil\'es. Then, inspired by results of Hern\'andez-Guti\'errez, Hrus\'ak and van Mill, using a technique of Medvedev, we construct a non-Polish subspace X of 2ω such that Xω is countable dense homogeneous. This gives the first ZFC answer to a question of Hrus\'ak and Zamora Avil\'es. Furthermore, since our example is consistently analytic, the equivalence result mentioned above is sharp. Our results also answer a question of Medini and Milovich. Finally, we show that if every countable subset of a zero-dimensional separable metrizable space X is included in a Polish subspace of X then Xω is countable dense homogeneous.