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Published online by Cambridge University Press: 30 January 2019
Given a family 
${\cal C}$ of infinite subsets of 
${\Bbb N}$, we study when there is a Borel function 
$S:2^{\Bbb N} \to 2^{\Bbb N} $ such that for every infinite 
$x \in 2^{\Bbb N} $, 
$S\left( x \right) \in {\Cal C}$ and 
$S\left( x \right) \subseteq x$. We show that the family of homogeneous sets (with respect to a partition of a front) as given by the Nash-Williams’ theorem admits such a Borel selector. However, we also show that the analogous result for Galvin’s lemma is not true by proving that there is an 
$F_\sigma $ tall ideal on 
${\Bbb N}$ without a Borel selector. The proof is not constructive since it is based on complexity considerations. We construct a 
${\bf{\Pi }}_2^1 $ tall ideal on 
${\Bbb N}$ without a tall closed subset.
${\text{\Sigma }}_2^1 $ sets in harmonic analysis. Transactions of the American Mathematical Society, vol. 339 (1993), no. 1, pp. 323–336.Google Scholar
$F_\sigma $ -ideals and 
$\omega _1 \omega _1^{\text{*}} $ -gaps in the Boolean algebras
$P\left( \omega \right)/I$ . Fundamenta Mathematicae, vol. 138 (1991), no. 2, pp. 103–111.10.4064/fm-138-2-103-111CrossRefGoogle Scholar
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