The strong Spector-Gandy Theorem for the higher analytical pointclasses
Abstract
Assuming projective determinacy, we extend Spector's strong version of the Spector-Gandy Theorem to all odd levels of the projective hierarchy: Theorem. For every space X which is a finite product of the natural numbers N and Baire space NN and for every n, if P is a 12n+1 subset of X, then there is a 12n set Q such that P(x) (∃!α)Q(x,α) (∃α∈12n+1(x))Q(x,α).
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