Determinacy and Fast-growing Sequences of Turing Degrees
Abstract
We discuss sufficiently fast-growing sequences of Turing degrees. The key result is that, assuming sufficient determinacy, if φ is a formula with one free variable, and S and T are sufficiently fast-growing sequences of Turing degrees of length ω1, then φ(S) φ(T). We also define degrees for subsets of ω1 analogous to Turing degrees, and prove that under sufficient determinacy and CH, all sufficiently high degrees are also effectively indistinguishable.
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