Fundamental Exact Sequence for the Pro-Étale Fundamental Group

Abstract: The pro-\'etale fundamental group of a scheme, introduced by Bhatt and Scholze, generalizes formerly known fundamental groups -- the usual \'etale fundamental group $\pi_1^{\mathrm{et}}$ defined in SGA1 and the more general group defined in SGA3. It controls local systems in the pro-\'etale topology and leads to an interesting class of "geometric covers" of schemes, generalizing finite \'etale covers. We prove the homotopy exact sequence over a field for the pro-\'etale fundamental group of a geometrically connected scheme $X$ of finite type over a field $k$, i.e. that the sequence $$1 \rightarrow \pi_1^{\mathrm{proet}}(X_{\bar{k}}) \rightarrow \pi_1^{\mathrm{proet}}(X) \rightarrow \mathrm{Gal}k \rightarrow 1$$ is exact as abstract groups and the map $\pi_1^{\mathrm{proet}}(X{\bar{k}}) \rightarrow \pi_1^{\mathrm{proet}}(X)$ is a topological embedding. On the way, we prove a general van Kampen theorem and the K\"unneth formula for the pro-\'etale fundamental group.