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arxiv: 1709.01706 · v1 · pith:VEUUEI3Hnew · submitted 2017-09-06 · 🧮 math.CT

When are profinite many-sorted algebras retracts of ultraproducts of finite many-sorted algebras?

classification 🧮 math.CT
keywords algebrassigmafiniteprojectivecategorymany-sortedobjectprofinite
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For a set of sorts $S$ and an $S$-sorted signature $\Sigma$ we prove that a profinite $\Sigma$-algebra, i.e., a projective limit of a projective system of finite $\Sigma$-algebras, is a retract of an ultraproduct of finite $\Sigma$-algebras if the family consisting of the finite $\Sigma$-algebras underlying the projective system is with constant support. In addition, we provide a categorial rendering of the above result. Specifically, after obtaining a category where the objects are the pairs formed by a nonempty upward directed preordered set and by an ultrafilter containing the filter of the final sections of it, we show that there exists a functor from the just mentioned category whose object mapping assigns to an object a natural transformation which is a retraction.

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