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Published online by Cambridge University Press: 12 March 2014
This note will characterize those partial functions which are partial recursive under an arbitrary “renaming” of the integers.
The formal result. Let I be the non-negative integers. For any partial function f on I into I, and for any permutation σ of I, let fσ be the partial function which f becomes when the integers are renamed according to σ. That is, let fσ = σfσ−1 in the sense that fσ(x) is defined whenever σ−1(х) ∊ Dom f.
1 (Added May 31, 1961.) The referee has observed that the theorem could be strengthened by restricting the class of admissible permutations.