Towards the decidability of the theory of modules over finite commutative rings

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Annals of Pure and Applied Logic 159 (1-2):49-70 (2009)
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Abstract

On the basis of the Klingler–Levy classification of finitely generated modules over commutative noetherian rings we approach the old problem of classifying finite commutative rings R with a decidable theory of modules. We prove that if R is wild, then the theory of all R-modules is undecidable, and verify decidability of this theory for some classes of tame finite commutative rings

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10.1016/j.apal.2008.10.009

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References found in this work

Model theory of modules.Martin Ziegler - 1984 - Annals of Pure and Applied Logic 26 (2):149-213.
On the elementary theory of quadruples of vector spaces.Walter Baur - 1980 - Annals of Mathematical Logic 19 (3):243.

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