Note on generalizing theorems in algebraically closed fields

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Archive for Mathematical Logic 37 (5-6):297-307 (1998)
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Abstract

The generalization properties of algebraically closed fields $ACF_p$ of characteristic $p > 0$ and $ACF_0$ of characteristic 0 are investigated in the sequent calculus with blocks of quantifiers. It is shown that $ACF_p$ admits finite term bases, and $ACF_0$ admits term bases with primality constraints. From these results the analogs of Kreisel's Conjecture for these theories follow: If for some $k$ , $A(1 + \cdots + 1)$ ( $n$ 1's) is provable in $k$ steps, then $(\forall x)A(x)$ is provable

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10.1007/s001530050100

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Author Profiles

Matthias Baaz
TU Wien
Richard Zach
University of Calgary

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Proof theory.Gaisi Takeuti - 1975 - New York, N.Y., U.S.A.: Sole distributors for the U.S.A. and Canada, Elsevier Science Pub. Co..
Proof Theory.Gaisi Takeuti - 1990 - Studia Logica 49 (1):160-161.
Generalizing theorems in real closed fields.Matthias Baaz & Richard Zach - 1995 - Annals of Pure and Applied Logic 75 (1-2):3-23.

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