Endoscopy for Hecke categories, character sheaves and representations

Abstract

For a split reductive group G over a finite field, we show that the neutral block of its mixed Hecke category with a fixed monodromy under the torus action is monoidally equivalent to the mixed Hecke category of the corresponding endoscopic group H with trivial monodromy. We also extend this equivalence to all blocks. We give two applications. One is a relationship between character sheaves on G with a fixed semisimple parameter and unipotent character sheaves on the endoscopic group H, after passing to asymptotic versions. The other is a similar relationship between representations of G(Fq) with a fixed semisimple parameter and unipotent representations of H(Fq).