Homotopy Exact Sequence for the Pro-\'Etale Fundamental Group II

Abstract

The pro-\'etale fundamental group of a scheme, introduced by Bhatt and Scholze, generalizes the usual \'etale fundamental group π1et defined in SGA1 and leads to an interesting class of "geometric coverings" of schemes, generalizing finite \'etale covers. We prove exactness of the general homotopy sequence for the pro-\'etale fundamental group, i.e. that for a geometric point s on S and a flat proper morphism X → S of finite presentation whose geometric fibres are connected and reduced, the sequence π1proet(Xs) → π1proet(X) → π1proet(S) → 1 is "nearly exact". This generalizes a theorem of Grothendieck from finite \'etale covers to geometric coverings. We achieve the proof by constructing an infinite (i.e. non-quasi-compact) analogue of the Stein factorization in this setting.