Gδ σ-games and generalized computation

Abstract

We show the equivalence between the existence of winning strategies for Gδ σ (also called 03) games in Cantor or Baire space, and the existence of functions generalized-recursive in a higher type-2 functional. (Such recursions are associated with certain transfinite computational models.) We show, inter alia, that the set of indices of convergent recursions in this sense is a complete 30 set: as paraphrase, the listing of those games at this level that are won by player I, essentially has the same information as the `halting problem' for this notion of recursion. Moreover the strategies for the first player in such games are recursive in this sense. We thereby establish the ordinal length of monotone 03-inductive operators, and characterise the first ordinal where such strategies are to be found in the constructible hierarchy. In summary: Theorem (a) The following sets are recursively isomorphic. (i) The complete ittm-semi-recursive-in-eJ set, HeJ; (ii) the 1-theory of ( Lη0 , ∈ ) , where η0 is the closure ordinal of 30-monotone induction; (iii) the complete 30 set of integers. (b) The ittm-recursive-in-eJ sets of integers are precisely those of Lη0.