A closed subset of Baire space not Medvedev equivalent to any closed set of Cantor space

Abstract

For mass problems P,Q⊂eq NN (Baire space), P is Medvedev reducible to Q (P≤sQ) if for some Turing funcional , (Q)⊂eq P, and Medvedev equivalent to Q if also Q≤sP. Shafer asked if every closed problem P is Medvedev equivalent to a closed problem Q with Q⊂eq 2N (Cantor space). We show that this is not the case.

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