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The decision problem for {vec Z}C(p^3)-lattices with p prime
Archive for Mathematical Logic 37 (2):127-142 (1998)
Abstract
We show undecidability for lattices over a group ring ${\vec Z} \, G$ where $G$ has a cyclic subgroup of order $p^3$ for some odd prime $p$ . Then we discuss the decision problem for ${\vec Z} \, G$ -lattices where $G$ is a cyclic group of order 8, and we point out that a positive answer implies – in some sense – the solution of the “wild $\Leftrightarrow$ undecidable” conjectureMy notes
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Citations of this work
Comparing First Order Theories of Modules over Group Rings.Saverio Cittadini & Carlo Toffalori - 2002 - Mathematical Logic Quarterly 48 (1):147-156.
Decidability for ℤ2G‐lattices when G Extends the Noncyclic Group of Order 4.Annalisa Marcja & Carlo Toffalori - 2002 - Mathematical Logic Quarterly 48 (2):203-212.
The torsionfree part of the Ziegler spectrum of $RG$ when $R$ is a Dedekind domain and $G$ is a finite group.A. Marcja, M. Prest & C. Toffalori - 2002 - Journal of Symbolic Logic 67 (3):1126-1140.
References found in this work
An undecidability theorem for lattices over group rings.Carlo Toffalori - 1997 - Annals of Pure and Applied Logic 88 (2-3):241-262.
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