Noncommutative resolutions of affine Schubert varieties in type A and canonical bases
Abstract: Given a resolution $\widetilde{\mathrm{Gr}}{\underlineλ} \rightarrow \overline{\mathrm{Gr}}λ$ of an affine Schubert variety for $GL_n$, we define its noncommutative version -- a sheaf of algebras on $\overline{\mathrm{Gr}}λ$, derived equivalent to $\widetilde{\mathrm{Gr}}{\underlineλ}$ as well as its Steinberg versions in both zero and positive characteristics. This, in particular, allows us to define the perversely-exotic t-structure on the derived category of equivariant coherent sheaves on $\widetilde{\mathrm{Gr}}{\underlineλ}$, analogously to Bezrukavnikov--Mirković in the case of Springer resolution. We study the basis of classes of irreducible objects in the equivariant K-theory, and explicitly identify it with the (parabolic) Kazhdan--Lusztig canonical basis in a certain cell quotient. This allows us to relate it to the canonical basis for the quantum affine group. In the course of the proof, we establish some properties of coherent-constructible equivalences.
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