G_{\delta \sigma}-games and generalized computation
Abstract
We show the equivalence between the existence of winning strategies for (also called ) 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 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 -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- set, ; (ii) the -theory of , where is the closure ordinal of -monotone induction; (iii) the complete set of integers. (b) The ittm-recursive-in- sets of integers are precisely those of .
Keywords
Cite
@article{arxiv.1509.09135,
title = {G_{\delta \sigma}-games and generalized computation},
author = {P. D. Welch},
journal= {arXiv preprint arXiv:1509.09135},
year = {2015}
}