By de Vries duality, the category KHaus of compact Hausdorff spaces is dually equivalent to the category DeV of de Vries algebras. There is a similar duality for KHaus, where de Vries algebras are replaced by proximity Baer-Specker algebras. The functor associating with each compact Hausdorff space a proximity Baer-Specker algebra is described by generalizing the notion of a boolean power of a totally ordered domain to that of a de Vries power. It follows that DeV is equivalent to the category PBSp of proximity Baer-Specker algebras. The equivalence is obtained by passing through KHaus, and hence is not choice-free. In this paper we give a direct algebraic proof of this equivalence, which is choice-independent. To do so, we give an alternate choice-free description of de Vries powers of a totally ordered domain.
De Vries Powers and Proximity Specker Algebras / G. Bezhanishvili, L. Carai, P. Morandi, B. Olberding. - In: APPLIED CATEGORICAL STRUCTURES. - ISSN 0927-2852. - 31:3(2023), pp. 24.1-24.24. [10.1007/s10485-023-09714-3]
De Vries Powers and Proximity Specker Algebras
L. Carai
Secondo
;
2023
Abstract
By de Vries duality, the category KHaus of compact Hausdorff spaces is dually equivalent to the category DeV of de Vries algebras. There is a similar duality for KHaus, where de Vries algebras are replaced by proximity Baer-Specker algebras. The functor associating with each compact Hausdorff space a proximity Baer-Specker algebra is described by generalizing the notion of a boolean power of a totally ordered domain to that of a de Vries power. It follows that DeV is equivalent to the category PBSp of proximity Baer-Specker algebras. The equivalence is obtained by passing through KHaus, and hence is not choice-free. In this paper we give a direct algebraic proof of this equivalence, which is choice-independent. To do so, we give an alternate choice-free description of de Vries powers of a totally ordered domain.
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