All spaces of countable spread can be small
Abstract
The main result of this paper is the proof of the simultaneous consistency, modulo a weakly compact cardinal, of the equality 2< c = c with the following property (*) of partitions of pairs of c: (*) For any coloring (or partition) k : [c]2 → 2 either there is a homogeneous set of size c in color 0 or there is a set S ∈ [c]c such that for every countable A ⊂ S there is β ∈ c for which A ⊂ β and k(\α, β\) = 1 for all α ∈ A. (*) plus 2< c = c together then imply that for every topological space X of countable spread, i.e. not containing any uncountable discrete subset, |X| c if it is Hausdorff and o(X) = c if it is also infinite and regular. Here o(X) denotes the number of all open subsets of X.
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