Cauchy Completeness, Lax Epimorphisms and Effective Descent for Split Fibrations

Abstract

For any suitable base category V , we find that V -fully faithful lax epimorphisms in V -Cat are precisely those V-functors F A B whose induced V -functors Cauchy F Cauchy A Cauchy B between the Cauchy completions are equivalences. For the case V = Set , this is equivalent to requiring that the induced functor CAT ( F,Cat) between the categories of split (op)fibrations is an equivalence. By reducing the study of effective descent functors with respect to the indexed category of split (op)fibrations F to the study of the codescent factorization, we find that these observations on fully faithful lax epimorphisms provide us with a characterization of (effective) F-descent morphisms in the category of small categories Cat; namely, we find that they are precisely the (effective) descent morphisms with respect to the indexed categories of discrete opfibrations -- previously studied by Sobral. We include some comments on the Beck-Chevalley condition and future work.