On the first Banach problem, concerning condensations of absolute -Borel sets onto compacta

Abstract

It is consistent that the continuum be arbitrary large and no absolute -Borel set X of density , 1<<c, condenses onto a compact metric space. It is consistent that the continuum be arbitrary large and any absolute -Borel set X of density , ≤c, containing a closed subspace of the Baire space of weight , condenses onto a compactum. In particular, applying Brian's results in model theory, we get the following unexpected result. Given any A⊂eq N with 1∈ A, there is a forcing extension in which every absolute n-Borel set, containing a closed subspace of the Baire space of weight n, condenses onto a compactum if, and only if, n∈ A.