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Artin-Schreier theory for commutative regular rings

L. van den Dries

Annals of Mathematical Logic 12 (2):113 (1977)

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On Boolean algebras and integrally closed commutative regular rings.Misao Nagayama - 1992 - Journal of Symbolic Logic 57 (4):1305-1318.details In this paper we consider properties, related to model-completeness, of the theory of integrally closed commutative regular rings. We obtain the main theorem claiming that in a Boolean algebra B, the truth of a prenex Σn-formula whose parameters ai partition B, can be determined by finitely many conditions built from the first entry of Tarski invariant T(ai)'s, n-characteristic D(n, ai)'s and the quantities S(ai, l) and S'(ai, l) for $l < n$. Then we derive two important theorems. One claims that (...) Download Export citation Bookmark
Positive definite functions over regular f-rings and representations as sums of squares.W. A. MacCaull - 1989 - Annals of Pure and Applied Logic 44 (3):243-257.details Download Export citation Bookmark 1 citation
On the validity of hilbert's nullstellensatz, artin's theorem, and related results in grothendieck toposes.W. A. MacCaull - 1988 - Journal of Symbolic Logic 53 (4):1177-1187.details Download Export citation Bookmark 2 citations
Boolean products of real closed valuation rings and fields.Jorge I. Guier - 2001 - Annals of Pure and Applied Logic 112 (2-3):119-150.details We present some results concerning elimination of quantifiers and elementary equivalence for Boolean products of real closed valuation rings and fields. We also study rings of continuous functions and rings of definable functions over real closed valuation rings under this point of view. Download Export citation Bookmark 2 citations
Sheaves of structures, Heyting‐valued structures, and a generalization of Łoś's theorem.Hisashi Aratake - 2021 - Mathematical Logic Quarterly 67 (4):445-468.details Sheaves of structures are useful to give constructions in universal algebra and model theory. We can describe their logical behavior in terms of Heyting‐valued structures. In this paper, we first provide a systematic treatment of sheaves of structures and Heyting‐valued structures from the viewpoint of categorical logic. We then prove a form of Łoś's theorem for Heyting‐valued structures. We also give a characterization of Heyting‐valued structures for which Łoś's theorem holds with respect to any maximal filter. Download Export citation Bookmark 2 citations

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