Partitions of 2ω and completely ultrametrizable spaces

Abstract

We prove that, for every n, the topological space ωnω (where ωn has the discrete topology) can be partitioned into ωn copies of the Baire space. Using this fact, the authors then prove two new theorems about completely ultrametrizable spaces. We say that Y is a condensation of X if there is a continuous bijection from X to Y. First, it is proved that the Baire space is a condensation of ωnω if and only if it can be partitioned into ωn Borel sets, and some consistency results are given regarding such partitions. It is also proved that it is consistent with ZFC that, for any n < ω, the continuum is ωn and there are exactly n+3 similarity types of perfect completely ultrametrizable spaces of size continuum. These results answer two questions of the first author from a previous paper.