Partitions of Baire space into compact sets
Abstract
Under CH we construct a partition of Baire space into compact sets, which is indestructible by countably supported iteration and product of Sacks forcing of any length, answering a question of Newelski. Further, we present an in-depth isomorphism-of-names argument for spec(aT) = \1, c\ in the product-Sacks model. Finally, we prove that Shelah's ultrapower model for the consistency of d < a also satisfies a = aT. Thus, consistently 1 < d < a = aT holds relative to a measurable.
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