Existential arithmetization of Diophantine equations

Annals of Pure and Applied Logic 157 (2-3):225-233 (2009)
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Abstract

A new method of coding Diophantine equations is introduced. This method allows checking that a coded sequence of natural numbers is a solution of a coded equation without decoding; defining by a purely existential formula, the code of an equation equivalent to a system of indefinitely many copies of an equation represented by its code. The new method leads to a much simpler construction of a universal Diophantine equation and to the existential arithmetization of Turing machines, register machines, and partial recursive functions

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10.1016/j.apal.2008.09.009

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References found in this work

Computability of Recursive Functions.J. C. Shepherdson & H. E. Sturgis - 1967 - Journal of Symbolic Logic 32 (1):122-123.
Arithmetical problems and recursively enumerable predicates.Martin Davis - 1953 - Journal of Symbolic Logic 18 (1):33-41.
Existential Definability in Arithmetic.Julia Robinson - 1955 - Journal of Symbolic Logic 20 (2):182-183.

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