Rigid inner forms over global function fields

Abstract

We construct an fpqc gerbe EV over a global function field F such that for a connected reductive group G over F with finite central subgroup Z, the set of GEV-torsors contains a subset H1(EV, Z G) which allows one to define a global notion of (Z-)rigid inner forms. There is a localization map H1(EV, Z G) H1(Ev, Z G), where the latter parametrizes local rigid inner forms (cf. [Kal16, Dil23]) which allows us to organize local rigid inner forms across all places v into coherent families. Doing so enables a construction of (conjectural) global L-packets and a conjectural formula for the multiplicity of an automorphic representation π in the discrete spectrum of G in terms of these L-packets. We also show that, for a connected reductive group G over a global function field F, the adelic transfer factor A for the ring of adeles A of F serving an endoscopic datum for G decomposes as the product of the normalized local transfer factors from [Dil20].

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