Forcing many positive polarized partition relations between a cardinal and its powerset

Journal of Symbolic Logic 66 (3):1359-1370 (2001)
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Abstract

A fairly quotable special, but still representative, case of our main result is that for 2 ≤ n ≤ ω, there is a natural number m (n) such that, the following holds. Assume GCH: If $\lambda are regular, there is a cofinality preserving forcing extension in which 2 λ = μ and, for all $\sigma such that η +m(n)-1) ≤ μ, ((η +m(n)-1) ) σ ) → ((κ) σ ) η (1)n . This generalizes results of [3], Section 1, and the forcing is a "many cardinals" version of the forcing there

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