Unramified F-divided objects and the \'etale fundamental pro-groupoid in positive characteristic

Abstract

Fix a scheme S of characteristic p. Let M be an S-algebraic stack and let Fdiv(M) be the stack of F-divided objects, that is sequences of objects xi∈M with isomorphisms σi:xi F*xi+1. Let X be a flat, finitely presented S-algebraic stack and X 1(X/S) the \'etale fundamental pro-groupoid, constructed in the present text. We prove that if M is a quasi-separated Deligne-Mumford stack and X S has geometrically reduced fibres, there is a bifunctorial isomorphism of stacks \[H\!om(1(X/S),M) H\!om(X,Fdiv(M)).\] In particular, the system of relative Frobenius morphisms X Xp/S Xp2/S… allows to recover the space of connected components π0(X/S) and the relative \'etale fundamental gerbe. In order to obtain these results, we study the existence and properties of relative perfection for algebras in characteristic p.