Revisiting mixed geometry

Abstract

We provide a uniform construction of "mixed versions" or "graded lifts" in the sense of Beilinson-Ginzburg-Soergel which works for arbitrary Artin stacks. In particular, we obtain a general construction of graded lifts of many categories arising in geometric representation theory and categorified knot invariants. Our new theory associates to each Artin stack of finite type Y over Fq a symmetric monoidal DG-category Shvgr, c(Y) of constructible graded sheaves on Y along with the six-functor formalism, a perverse t-structure, and a weight (or co-t-)structure in the sense of Bondarko and Pauksztello, compatible with the six-functor formalism, perverse t-structures, and Frobenius weights on the category of (mixed) -adic sheaves. Classically, mixed versions were only constructed in very special cases due to the non-semisimplicity of Frobenius. Our construction sidesteps this issue by semi-simplifying the Frobenius action itself. However, the category Shvgr, c(Y) agrees with those previously constructed when they are available. For example, for any reductive group G with a fixed pair T⊂ B of a maximal torus and a Borel subgroup, we have an equivalence of monoidal DG weight categories Shvgr, c(B G/B) Chb(SBimW), where Chb(SBimW) is the monoidal DG-category of bounded chain complexes of Soergel bimodules and W is the Weyl group of G.