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The class of infinite dimensional neat reducts of quasi-polyadic algebras is not axiomatizable
Mathematical Logic Quarterly 52 (1):106-112 (2006)
Abstract
SC, CA, QA and QEA denote the classes of Pinter's substitution algebras, Tarski's cylindric algebras, Halmos' quasi-polyadic algebras and quasi-polyadic equality algebras, respectively. Let ω ≤ α < β and let K ∈ {SC,CA,QA,QEA}. We show that the class of α -dimensional neat reducts of algebras in Kβ is not elementary. This solves a problem in [3]. Also our result generalizes results proved in [2] and [3].My notes
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Citations of this work
Finitary Polyadic Algebras from Cylindric Algebras.Miklós Ferenczi - 2007 - Studia Logica 87 (1):1-11.
On the definition and the representability of quasi‐polyadic equality algebras.Miklós Ferenczi - 2016 - Mathematical Logic Quarterly 62 (1-2):9-15.
Neat reducts and amalgamation in retrospect, a survey of results and some methods Part I: Results on neat reducts.Judit Madarász & Tarek Ahmed - 2009 - Logic Journal of the IGPL 17 (4):429-483.
The class of neat reducts is not Boolean closed.Tarek Sayed Ahmed - 2008 - Bulletin of the Section of Logic 37 (1):51-61.
Neat embeddings and amalgamation.Tarek Sayed Ahmed & Basim Samir - 2006 - Bulletin of the Section of Logic 35 (4):163-171.
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