A Coherent Version of Geometric Satake Equivalence for Type A

Abstract

In this paper we prove a coherent version of geometric Satake equivalence proposed in Cautis-Williams' work arXiv:2306.03023 for type A. In their work, they studied an abelian version of the classical limit Satake category, namely, the Koszul perverse heart of the categorified Coulomb branch for adjoint representations. In this paper we study a subcategory generated by a collection of simple objects. We endow this subcategory with a neutral Tannakian structure and identify it with the finite dimensional representation category Rep(G) for the Langlands dual group G. Our method uses tools in Cautis-Williams theory and a Hodge module description of the coherent IC extensions of differential sheaves in Xin's work arXiv:2503.14890.