The Derived Unipotent Block of p-Adic GL2 as Perfect Complexes over a dg Schur Algebra

Abstract

For a p-adic field F of residual cardinality q, we provide a triangulated equivalence between the bounded derived category Db(B1(G)fg) of finitely generated unipotent representations of G=GL2(F) and perfect complexes over a dg enriched Schur algebra, in the non-banal case of odd characteristic l dividing q+1. The dg Schur algebra is the dg endomorphism algebra of a projective resolution of a direct sum V of the parahoric inductions of the trivial representations of the reductive quotients of G, and V is shown to be a classical generator of Db(B1(G)fg).

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