Relative ideals in homological categories, with an application to MV-algebras
Abstract
Let A be a homological category and U B A be a faithful conservative right adjoint. We introduce the notion of relative ideal with respect to U, and we show that, under suitable conditions, any object of A can be seen as a relative ideal of some object in B. We then develop a case study. We first prove that the category of hoops is semi-abelian and that the category of MV-algebras is protomodular, then we apply our results to the forgetful functor from the category of MV-algebras to the category of Wajsberg hoops.
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