Arithmetical definability over finite structures

Mathematical Logic Quarterly 49 (4):385 (2003)
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Abstract

Arithmetical definability has been extensively studied over the natural numbers. In this paper, we take up the study of arithmetical definability over finite structures, motivated by the correspondence between uniform AC0 and FO. We prove finite analogs of three classic results in arithmetical definability, namely that < and TIMES can first-order define PLUS, that < and DIVIDES can first-order define TIMES, and that < and COPRIME can first-order define TIMES. The first result sharpens the equivalence FO =FO to FO = FO, answering a question raised by Barrington et al. about the Crane Beach Conjecture. Together with previous results on the Crane Beach Conjecture, our results imply that FO is strictly less expressive than FO = FO = FO. In more colorful language, one could say that, for parallel computation, multiplication is harder than addition

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10.1002/malq.200310041

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Citations of this work

Theories of arithmetics in finite models.Michał Krynicki & Konrad Zdanowski - 2005 - Journal of Symbolic Logic 70 (1):1-28.
Arithmetic of divisibility in finite models.A. E. Wasilewska & M. Mostowski - 2004 - Mathematical Logic Quarterly 50 (2):169.

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References found in this work

Definability and decision problems in arithmetic.Julia Robinson - 1949 - Journal of Symbolic Logic 14 (2):98-114.
On Pascal triangles modulo a prime power.Alexis Bés - 1997 - Annals of Pure and Applied Logic 89 (1):17-35.
Elementary Properties of the Finite Ranks.Anuj Dawar, Kees Doets, Steven Lindell & Scott Weinstein - 1998 - Mathematical Logic Quarterly 44 (3):349-353.

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