Abstract
This paper presents several results whose common element is their connection with Hubert's tenth problem.1 The one that seems most striking (perhaps because it can be stated with a minimum of technical apparatus) is this: there does not exist an algorithm for determining whether or not a polynomial (in n variables) represents every integer.2In addition, the present paper (i) gives a simple characterization of the diophantine sets (of positive, non-negative, and arbitrary integers), and (ii) gives a rigorous proof of Myhill's theorem [6] that there is no decision method for statements of the form
Publisher
Cambridge University Press (CUP)
Reference7 articles.
1. Arithmetical problems and recursively enumerable predicates;Davis;this Journal,1953
2. Existential definability in arithmetic
3. Arithmetical representation of recursively enumerable sets;Robinson;this Journal,1956
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