Categorical notions of fibration

Abstract

Fibrations over a category B, introduced to category theory by Grothendieck, encode pseudo-functors Bop Cat, while the special case of discrete fibrations encode presheaves Bop Set. A two-sided discrete variation encodes functors Bop × A Set, which are also known as profunctors from A to B. By work of Street, all of these fibration notions can be defined internally to an arbitrary 2-category or bicategory. While the two-sided discrete fibrations model profunctors internally to Cat, unexpectedly, the dual two-sided codiscrete cofibrations are necessary to model V-profunctors internally to V- Cat.