$\mathrm{Gr}_{G, \mathrm{Ran}(X)}$ is reduced

Abstract: Let $k$ be a field of characteristic zero. Fix a smooth algebraic curve $X$ and a split reductive group $G$ over $k$. We show that the Beilinson--Drinfeld affine Grassmannian $\mathrm{Gr}{G, \mathrm{Ran}(X)}$ is the presheaf colimit of the reduced ind-schemes $(\mathrm{Gr}{G, X^I})^{\mathrm{red}}$ for finite sets $I$. This implies that every map from an affine $k$-scheme to $\mathrm{Gr}_{G, \mathrm{Ran}(X)}$ factors through a reduced quasi-projective $k$-scheme. In the course of the proof, we generalize the notion of 'reduction of a scheme' to apply to any presheaf, and we show that this notion is well-behaved on any pseudo-ind-scheme which admits a colimit presentation whose indexing category satisfies the amalgamation property.