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Perverse sheaves and t-structures on the thin and thick affine flag varieties

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abstract

We study the categories $\mathrm{Perv}_{\mathrm{thin}}$ and $\mathrm{Perv}_{\mathrm{thick}}$ of Iwahori-equivariant perverse sheaves on the thin and thick affine flag varieties associated to a split reductive group $G$. An earlier work of the first author describes $\mathrm{Perv}_{\mathrm{thin}}$ in terms of bimodules over the so-called non-commutative Springer resolution. We partly extend this result to $\mathrm{Perv}_{\mathrm{thick}}$, providing a similar description for its anti-spherical quotient. The long intertwining functor realizes $\mathrm{Perv}_{\mathrm{thick}}$ as the Ringel dual of $\mathrm{Perv}_{\mathrm{thin}}$; we point out that it shares some exactness properties with the similar functor acting on perverse sheaves on the finite-dimensional flag variety. We use this result to resolve a conjecture of Arkhipov and the first author, proving that the image in the Iwahori-Whittaker category of any convolution-exact perverse sheaf on the affine flag variety is tilting.

fields

math.RT 1

years

2026 1

verdicts

UNVERDICTED 1

representative citing papers

The tilting property of Whittaker averaged central sheaves

math.RT · 2026-06-24 · unverdicted · novelty 6.0

Characterizes kernel of Iwahori-Whittaker averaging microlocally, generalizes anti-temperedness equivalence theorem, and extends tilting property of central sheaves to integer coefficients.

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  • The tilting property of Whittaker averaged central sheaves math.RT · 2026-06-24 · unverdicted · none · ref 7 · internal anchor

    Characterizes kernel of Iwahori-Whittaker averaging microlocally, generalizes anti-temperedness equivalence theorem, and extends tilting property of central sheaves to integer coefficients.