Geometric constructions preserve fibrations
Abstract
Let C be a representable 2-category, and T a 2-endofunctor of the arrow 2-category C such that (i) cod T = cod and (ii) T preserves proneness of morphisms in C. Then T preserves fibrations and opfibrations in C. The proof takes Street's characterization of (e.g.) opfibrations as pseudoalgebras for 2-monads LB on slice categories C/B and develops it by defining a 2-monad L on C that takes change of base into account, and uses known results on the lifting of 2-functors to pseudoalgebras.
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