Fukaya categories of Coulomb branches as unique deformations
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Abstract
The symplectic geometry of Coulomb branches is complicated and it is particularly difficult to determine their Fukaya categories.
Relative Fukaya categories present an approach to circumvent these difficulties by first computing the Fukaya category of the complement of a divisor and then solving a deformation problem.
In this paper, we apply this approach to the specific case of horizontal Hilbert schemes by removing their matter divisor and narrowing down the set of possible deformations through an additional $ \mathbb{Z}^2 $-grading.
We utilize an existing description of the Fukaya category after removal of the matter divisor, in particular we use a specific generating Lagrangian and the identification between its endomorphism algebra and the NilHecke algebra.
The core of this paper consists of solving the deformation problem, after which we recover the result of Aganagic et al.