Dominating numbers at singular cardinals
Abstract
We study the generalized dominating number dμ at a singular cardinal μ of cofinality . We show two lower bounds: in ZFC, cf([μ],⊂eq) ≤ dμ, and under mild cardinal-arithmetic assumptions, 2<μ ≤ dμ. We also clarify when dμ can differ from 2μ: assuming GCH and = cf(μ) > ω, a finite-support iteration of Cohen forcing of length μ++ yields dμ < 2μ. On the other hand, for = cf(μ) = ω, natural μ-cc posets force dμ = 2μ.
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