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Prime models and almost decidability

Published online by Cambridge University Press:  12 March 2014

Terrence Millar*
Affiliation:
Department of Mathematics, University of Wisconsin, Madison, Wisconsin 53706

Extract

This paper introduces and investigates a notion that approximates decidability with respect to countable structures. The paper demonstrates that there exists a decidable first order theory with a prime model that is not almost decidable. On the other hand it is proved that if a decidable complete first order theory has only countably many complete types, then it has a prime model that is almost decidable. It is not true that every decidable complete theory with only countably many complete types has a decidable prime model. It is not known whether a complete decidable theory with only countably many countable models up to isomorphism must have a decidable prime model. In [1] a weaker result was proven—if every complete extension, in finitely many additional constant symbols, of a theory T fails to have a decidable prime model, then T has 2 ω nonisomorphic countable models. The corresponding statement for saturated models is false, even if all the complete types are recursive, as was shown in [2]. This paper investigates a variation of the open question via a different notion of effectiveness—almost decidable.

A tree Tr will be a subset of ω that is closed under predecessor. For elements f, g in ω ωω , ƒg iffdfi < lh(ƒ)[ƒ(i) = g(i)].

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1986

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References

REFERENCES

[1] Millar, Terrence, Omitting types, type spectrums, and decidability, this Journal, vol. 48 (1983), pp. 171181.Google Scholar
[2] Millar, Terrence, Decidability and the number of countable models, Annals of Pure and Applied Logic, vol. 27 (1984), pp. 137153.CrossRefGoogle Scholar