Lagrangian classes in K-theory

Abstract

For a (-1)-shifted Lagrangian in a critical locus, we construct a homomorphism from the K-group of matrix factorisations of the critical locus to the K-group of the Lagrangian, partially answering the Joyce-Safronov conjecture. The key step is the construction of a specialisation functor for categories of matrix factorisations along the deformation to the normal cone. Any (-2)-shifted symplectic space is a (-1)-shifted Lagrangian of a point, whose K-group is Z. The image of 1∈ Z under the above homomorphism is the virtual structure sheaf. We prove that two equivalent critical models of a given critical locus induce homomorphisms that commute via Kn\"orrer periodicity. When a torus acts on the Lagrangian, we further prove a localisation formula, namely the commutativity of the homomorphisms associated with the Lagrangian and its fixed locus.

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