Parametrization and reduction to depth zero of Z[1p]-blocks of tame p-adic groups

Abstract

Let G be a reductive group over a non-archimedean local field F of residue characteristic p. We consider pairs (φ,I) consisting of a "wild inertia" Langlands parameter φ: PF G whose centralizer CG(φ) is a Levi subgroup of G, and a cohomological invariant I whose definition is inspired by the theory of endoscopy. Assuming that p is odd and not a torsion prime of G nor of G, we associate to each such pair (φ,I) a Serre subcategory Repφ,I(G(F)) of the category of smooth Z[1p]-representations of G(F). Then we construct an equivalence between this Serre subcategory and the category of depth-zero Z[1p]-representations of a twisted Levi subgroup Gφ,I of G, which is dual to CG(φ). This pattern for reduction to depth zero fits well with the conjectural (categorical) local Langlands correspondence. When G is tamely ramified and p does not divide the order of its Weyl group, then the above Serre subcategories provide the block decomposition of the category of all smooth Z[1p]-representations of G(F). In this case, we thus obtain a reduction-to-depth-zero process for smooth representations of G(F) valued in any algebraically closed field of characteristic different from p. When that field has characteristic 0, this recovers some of the recent results of Adler--Fintzen--Mishra--Ohara. When that field is F, we use our results together with Zhu's unipotent categorical correspondence to produce a fully faithful embedding of DRepF(GLn(F)) into a suitable category of coherent sheaves on the moduli space of n-dimensional F-representations of the Weil group.