A symmetric monoidal fracture square

Abstract

Given a symmetric monoidal stable ∞-category C which is rigidly-compactly generated and a set of compact objects K of C, one can form the subcategories of K-complete and K-local objects. The goal of this paper is to explain how to recover C from its K-local and K-complete subcategories while retaining the symmetric monoidal structure. Specializing to the case where C is the ∞-category of G-spectra for a finite group G, our result can be viewed as a symmetric monoidal variant of the isotropy separation decomposition, a version of which appeared previously in work of Krause.

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