Partitions of topological spaces and a new club-like principle
Abstract
We give a new proof of the following theorem due to W. Weiss and P. Komjath: if X is a regular topological space, with character < b and X → (top ω + 1)1ω, then, for all α < ω1, X → (top α)1ω, fixing a gap in the original one. For that we consider a new decomposition of topological spaces. We also define a new combinatorial principle F, and use it to prove that it is consistent with CH that b is the optimal bound for the character of X. In WeissKomjath, this was obtained using .
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