On finitely generated reducts of polyadic equality algebras
classification
🧮 math.LO
keywords
dimensionalgebraselementfinitelygeneratedpolyadicresultagebras
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Extending a deep result of Andreka and Nemeti, we show that unlike the dimension complemented case, there are weak set quasi-polyadic simple algebras of dimension >1, that are finitely genertaed with more than one element, but cannot be generated with a single element. We give a contrasting result for polyadic agebras of infinite dimension.
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