Decisive creatures and large continuum
Abstract
For f,g∈ω let f,g be the minimal number of uniform g-splitting trees needed to cover the uniform f-splitting tree, i.e. for every branch of the f-tree, one of the g-trees contains . f,g is the dual notion: For every branch , one of the g-trees guesses (m) infinitely often. It is consistent that fε,gε=fε,gε=ε for 1 many pairwise different cardinals ε and suitable pairs (fε,gε). For the proof we use creatures with sufficient bigness and halving. We show that the lim-inf creature forcing satisfies fusion and pure decision. We introduce decisiveness and use it to construct a variant of the countable support iteration of such forcings, which still satisfies fusion and pure decision.
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