Finite aﬃne algebras are fully dualizable

Bentz, Wolfram; Gillibert, Pierre; Sequeira, Luís

doi:10.1080/00927872.2017.1350693

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“…Note that the author, with Bentz and Sequeira in [1], extend the result to prove that finite Abelian algebras are strongly dualizable.…”

Section: Introductionmentioning

confidence: 85%

Finite Abelian algebras are dualizable

Gillibert

2015

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A finite algebra A = A; F is dualizable if there exists a discrete topological relational structure A = A; G; T , compatible with F, such that the canonical evaluation map e B : B → Hom(Hom(B, A), A) is an isomorphism for every B in the quasivariety generated by A. Here, e B is defined by e B (x)(f ) = f (x) for all x ∈ B and all f ∈ Hom(B, A).We prove that, given a finite congruence-modular Abelian algebra A, the set of all relations compatible with A, up to a certain arity, entails the whole set of all relations compatible with A. By using a classical compactness result, we infer that A is dualizable. Moreover we can choose a dualizing alter-ego with only relations of arity ≤ 1 + α 3 , where α is the largest exponent of a prime in the prime decomposition of |A|.This improves Kearnes and Szendrei result that modules are dualizable, and Bentz and Mayr's result that finite modules with constants are dualizable. This also solves a problem stated by Bentz and Mayr in 2013.

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“…Note that the author, with Bentz and Sequeira in [1], extend the result to prove that finite Abelian algebras are strongly dualizable.…”

Section: Introductionmentioning

confidence: 85%