A recursive function coding number theoretic functions

03/17/2022

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We show that there exists a fixed recursive function e such that for all functions hℕ→ℕ, there exists an injective function c_hℕ→ℕ such that c_h(h(n))=e(c_h(n)), i.e., h=c_h^-1ec_h.

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A recursive function coding number theoretic functions

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A recursive function coding number theoretic functions

Related Research

Recursive functions and existentially closed structures

Bouncing Towers move faster than Hanoi Towers, but still require exponential time

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Pointers in Recursion: Exploring the Tropics

On Mappings on the Hypercube with Small Average Stretch

Proving P!=NP in first-order PA

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