Reductification of parahoric group schemes

Abstract

Parahoric group schemes are certain possibly non-reductive, smooth, affine integral models of reductive group schemes defined over a henselian discretely valued field K whose residue field is perfect. We show that any such group scheme P becomes reductive, in a particular regard, after a (possibly wildly ramified) finite Galois extension L/K. More precisely, we prove that there exists a reductive integral model G of the base change PL such that P can be recovered as the smoothening of the subgroup of Galois invariants of the Weil restriction of G. Our work extends results of Balaji--Seshadri and Pappas--Rapoport from the tamely ramified and simply-connected semisimple setting. As an application, we establish a parahoric analogue of the Grothendieck--Serre conjecture in sufficiently good residue characteristics. Specifically, we confirm that generically trivial parahoric torsors are trivial whenever the generic reductive group is simply-connected. The proof proceeds by reducing the problem to a statement about a stacky reductive group over a stacky discrete valuation ring.

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