Effective descent morphisms of filtered preorders

Abstract

We characterize effective descent morphisms of what we call filtered preorders, and apply these results to slightly improve a known result, due to the first author and F. Lucatelli Nunes, on the effective descent morphisms in lax comma categories of preorders. A filtered preorder, over a fixed preorder X, is defined as a preorder A equipped with a profunctor X A and, equivalently, as a set A equipped with a family (Ax)x∈ X of upclosed subsets of A with x'≤slant x⇒ Ax⊂eq Ax'.

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