Recognizing flag varieties and reductive groups

Abstract

Fix a flat and projective morphism X→ of schemes. We show, first, that any set of P1-fibrations on X defines a set of simple roots, a set of simple coroots and a Cartan matrix C. Second, X is an \'etale F-bundle over some projective -scheme, where F is the flag variety of the adjoint Chevalley group over the integers defined by C. In particular, if the simple roots generate the N\'eron--Severi group of X relative to and X is cohomologically flat in degree zero over then X is a form of F. When X is a smooth Fano variety over the complex numbers all of whose extremal rays are accounted for by these fibrations this is due to Occhetta, Sol\'a-Conde, Watanabe and Wi\'sniewski. Third, we recover, in a uniform way, the isomorphism and isogeny theorems of Chevalley and Demazure: over any base a pinned reductive group is determined by its pinned root datum, and a p-morphism of pinned root data determines a unique homomorphism of the corresponding groups.