Ranked Discontinuities of Multivalued Functions

Abstract

We study discontinuity of multivalued functions (also known as problems) P on Baire space by assigning an ordinal rank to points in the domain of P that have no local realizers. For each countable ordinal α, let ACC Nα be the problem of solving ACC N in at most α many attempts, with a new instance provided for each attempt. Our main theorem shows that, for any problem P, the following are equivalent: (i) P is discontinuous on some set all of whose points have Cantor--Bendixson rank at most α, and (ii) ACC Nα≤ W*P. This extends to points: P ≥W* ACCNα via a forward function that sends \#N to p ∈ dom(P) if and only if P is discontinuous on a set A with rankA(p) ≤ α. We also characterize these properties via a Wadge-style discontinuity game for P. We apply this framework to the thin set and achromatic Ramsey theorems. Extending RTnk,j to ordinal parameters, we define RTnα,β and compute their ranks of discontinuity. The problems RTnα,β provide examples of problems with discontinuities of each countable rank which are not reducible to ACCN. The separation from ACCN is obtained via the notion of guessability with identified errors.

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