Quantum K-invariants via Quot schemes I
Abstract
We study the virtual Euler characteristics of sheaves over Quot schemes of curves, establishing that these invariants fit into a topological quantum field theory (TQFT) valued in Z[[q]]. We show that the three-pointed genus-zero K-theoretic stable map invariants of the Grassmannian coincide with the genus-zero K-theoretic invariants defined via the Quot scheme. Utilizing Quot scheme compactifications alongside the TQFT framework, we derive presentations of the small quantum K-ring of the Grassmannian. Our approach offers a new method for finding explicit formulas for quantum K-invariants.
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