Coherent IC-sheaves on type 𝐴_{𝑛} affine Grassmannians and dual canonical basis of affine type 𝐴₁

Finkelberg, Michael; Fujita, Ryo

doi:10.1090/ert/558

Represent. Theory

2021

DOI: 10.1090/ert/558

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Coherent IC-sheaves on type 𝐴_{𝑛} affine Grassmannians and dual canonical basis of affine type 𝐴₁

Michael Finkelberg

Ryo Fujita

Abstract: The convolution ring K GL n (O) C × (Gr GL n ) was identified with a quantum unipotent cell of the loop group LSL 2 in Cautis and Williams [J. Amer. Math. Soc. 32 (2019), pp. 709-778]. We identify the basis formed by the classes of irreducible equivariant perverse coherent sheaves with the dual canonical basis of the quantum unipotent cell.

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A Geometric Approach to Feigin–Loktev Fusion Product and Cluster Relations in Coherent Satake Category

Dumanski

2024

International Mathematics Research Notices

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We propose a geometric realization of the Feigin–Loktev fusion product of graded cyclic modules over the current algebra. This allows us to compute it in several new cases. We also relate the Feigin–Loktev fusion product to the convolution of perverse coherent sheaves on the affine Grassmannian of the adjoint group. This relation allows us to establish the existence of exact triples, conjecturally corresponding to cluster relations in the Grothendieck ring of coherent Satake category.

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A Geometric Approach to Feigin–Loktev Fusion Product and Cluster Relations in Coherent Satake Category

Dumanski

2024

International Mathematics Research Notices

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Coherent categorification of quantum loop algebras: The SL(2) case

Shan

Varagnolo

Vasserot

2022

Journal Für Die Reine Und Angewandte Mathematik (Crelles Journal)

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We construct an equivalence of graded Abelian categories from a category of representations of the quiver-Hecke algebra of type A 1 ( 1 ) {A_{1}^{(1)}} to the category of equivariant perverse coherent sheaves on the nilpotent cone of type A. We prove that this equivalence is weakly monoidal. This gives a representation-theoretic categorification of the preprojective K-theoretic Hall algebra considered by Schiffmann and Vasserot. Using this categorification, we compare the monoidal categorification of the quantum open unipotent cells of type A 1 ( 1 ) {A_{1}^{(1)}} given by Kang, Kashiwara, Kim, Oh and Park in terms of quiver-Hecke algebras with the one given by Cautis and Williams in terms of equivariant perverse coherent sheaves on the affine Grassmannians.

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Coherent IC-sheaves on type 𝐴_{𝑛} affine Grassmannians and dual canonical basis of affine type 𝐴₁

Cited by 2 publications

References 19 publications

A Geometric Approach to Feigin–Loktev Fusion Product and Cluster Relations in Coherent Satake Category

A Geometric Approach to Feigin–Loktev Fusion Product and Cluster Relations in Coherent Satake Category

Coherent categorification of quantum loop algebras: The SL(2) case

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