The cohomology of Hyperquot schemes on curves via shifted Yangians in type A

Abstract

Let V be a vector bundle of rank r on a smooth projective complex curve C. The Hyperquot scheme FnQuot\,(V) is the moduli space of length n flags of rank r sub-sheaves of V. This article has two main results: First, we show that a certain shifted Yangian of sln+1 acts on H*(FnQuot\,(V)) by correspondences. Then, we define a family of rn commuting Yangian operators which yields a natural basis for H*(FnQuot\,(V)). This generalises the work arXiv:2307.13671 of Marian and Negut, who proved the above results in the case n=1. The new feature, which makes this generalisation possible, is the use of so called skew-nested Quot schemes. The rank 1 versions of these spaces, skew-nested Hilbert schemes, have been recently introduced by Sergej Monavari in the context of refined DT theory of local curves arXiv:2506.14359. In the present article, skew-nested Quot schemes appear as correspondences associated with iterated commutators of Yangian elements.

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