K-theoretic pullbacks for Lagrangians on derived critical loci
Abstract
Given a regular function φ on a smooth stack, and a (-1)-shifted Lagrangian M on the derived critical locus of φ, under fairly general hypotheses, we construct a pullback map from the Grothendieck group of coherent matrix factorizations of φ to that of coherent sheaves on M. This map satisfies a functoriality property with respect to the composition of Lagrangian correspondences, as well as the usual bivariance and base-change properties. We provide three applications of the construction, one in the definition of quantum K-theory of critical loci (Landau-Ginzburg models), paving the way to generalize works of Okounkov school from Nakajima quiver varieties to quivers with potentials, one in establishing a degeneration formula for K-theoretic Donaldson-Thomas theory of local Calabi-Yau 4-folds, the other in confirming a K-theoretic version of Joyce-Safronov conjecture.
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