The $\alpha$-union theorem and generalized primitive recursion
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- by Barry E. Jacobs PDF
- Trans. Amer. Math. Soc. 237 (1978), 63-81 Request permission
Abstract:
A generalization to $\alpha$-recursion theory of the McCreight-Meyer Union Theorem is proved. Theorem. Let $\Phi$ be an $\alpha$-computational complexity measure and $\{ {f_\varepsilon }|\varepsilon < \alpha \}$ an $\alpha$-r.e. strictly increasing sequence of $\alpha$-recursive functions. Then there exists an $\alpha$-recursive function k such that $C_k^\Phi = { \cup _{\varepsilon < \alpha }}C_{{f_\varepsilon }}^\Phi$. The proof entails a no-injury cancellation atop a finite-injury priority construction and necessitates a blocking strategy to insure proper convergence. Two infinite analogues to ($\omega$-) primitive recursive functions are studied. Although these generalizations coincide at $\omega$, they diverge on all admissible $\alpha > \omega$. Several well-known complexity properties of primitive recursive functions hold for one class but fail for the other. It is seen that the Jensen-Karp ordinally primitive recursive functions restricted to admissible $\alpha > \omega$ cannot possess natural analogues to Grzegorczyk’s hierarchy.References
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Additional Information
- © Copyright 1978 American Mathematical Society
- Journal: Trans. Amer. Math. Soc. 237 (1978), 63-81
- MSC: Primary 03D60; Secondary 68C25
- DOI: https://doi.org/10.1090/S0002-9947-1978-0479362-8
- MathSciNet review: 479362