Etale Fundamental group of moduli of torsors under Bruhat-Tits group scheme over a curve

Abstract

Let X be a smooth projective curve over an algebraically closed field k. Let G be a Bruhat-Tits group scheme on X which is generically semi-simple and trivial. We show that the \'etale fundamental group of the moduli stack MX(G) of torsors under G is isomorphic to that of the moduli stack MX(G) of principal G-bundles. For any smooth, noetherian and irreducible stack X, we show that an inclusion of an open substack X, whose complement has codimension at least two, will induce an isomorphism of \'etale fundamental group. Over C, we show that the open substack of regularly stable torsors in MX(G) has complement of codimension at least two when gX ≥ 3. As an application, we show that the moduli space MX(G) of G-torsors is simply-connected.