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Structures elementarily closed relative to a model for arithmetic

Published online by Cambridge University Press:  12 March 2014

Eugene W. Madison*
Affiliation:
University of Iowa

Extract

The present paper is a sequel to [1]. It is our purpose to formulate a general theory derived from the methods used to obtain three results for the field of real algebraic numbers in [1]. As there, we shall concern ourselves almost exclusively with fields of characteristic zero; thus we assume a convenient formulation of first order logic with extralogical constants E(x, y), S(x, y, z), F(x, y, z), F(x, y), N(x) and 0, whose intended interpretations are equality, sum, product, y is the successor of x, x ∈ (where is a substructure satisfying all first order truths of the natural numbers) and zero, respectively. In addition, we shall use Q(x, y) for x ≤ y in those cases where our field is ordered, e.g. the field of real algebraic numbers.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1968

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References

[1]Madison, E. W., Computable algebraic structures and non-standard arithmetic, Transactions of the American Mathematical Society, 1968 (to appear).CrossRefGoogle Scholar
[2]Robinson, A., Introduction to model theory and to the metamathematlcs of algebra, North-Holland, Amsterdam, 1963.Google Scholar
[3]Robinson, A., Model theory and non-standard arithmetic, Infinitistic methods. Symposium on Foundations of Mathematics, Warsaw, pp 265302, 1959.Google Scholar
[4]Tarski, A. and Vaught, R., Arithmetical extensions of relational systems, Compositio mathematica, vol. 18 (1957), pp. 81102.Google Scholar