Quantum operations on the ring of symmetric functions

Abstract

We define a version of stable maps into the classifying stack BGLN, and develop a corresponding notion of K-theoretic Gromov-Witten invariants. In this setting, the evaluation morphisms are not of finite type; the definition of the K-theoretic invariants proceeds by constructing a stability stratification of the moduli stack. In the absence of markings, the semistable locus of the stratification recovers moduli spaces of bundles on nodal curves considered by Gieseker, Nagaraj-Seshadri, Schmitt and Kausz. We also define versions of stable maps into quotient stacks of the form Z/GLN, where Z is a projective GLN-scheme. We construct corresponding stability stratifications, whose semistable loci provide new proper moduli spaces of gauged maps from a varying nodal curve into Z/GLN.

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