A recognition principle for the existence of descent data

Abstract

Suppose R→ S is a faithfully flat ring map. The theory of twisted forms lets one compute, given an R-module M, how many isomorphism classes of R-modules M satisfy SR M SR M. This is really a uniqueness problem. But this theory does not help one to solve the corresponding existence problem: given an S-module N, does there exists some R-module M such that SR M N? In this paper we work out (as a special case of a general theorem about existence of coalgebra structures over a comonad) a criterion for the existence of such an R-module M, under some reasonable hypotheses on the map R→ S.