Higher categories of push-pull spans, I: Construction and applications

Abstract

This is the first part of a project aimed at formalizing Rozansky-Witten models in the functorial field theory framework. Motivated by work of Calaque-Haugseng-Scheimbauer, we construct a family of symmetric monoidal (∞,3)-categories parametrized by an ∞-category with finite limits and a functor into symmetric monoidal ∞-categories, such that the functor admits pushforwards. This (∞,3)-category contains correspondences in the base ∞-category equipped with local systems, which compose via a push-pull formula. We apply this general construction to provide an approximation to the 3-category of Rozansky-Witten models whose existence was conjectured by Kapustin-Rozansky-Saulina; this approximation behaves like a "commutative" version of the conjectured 3-category and is related to work of Stefanich on higher quasicoherent sheaves.

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