Galois reconstruction of Artin-Tate R-motivic spectra

Abstract

We explain how to reconstruct the category of Artin-Tate R-motivic spectra as a deformation of the purely topological C2-equivariant stable category. The special fiber of this deformation is algebraic, and equivalent to an appropriate category of C2-equivariant sheaves on the moduli stack of formal groups. As such, our results directly generalize the cofiber of τ philosophy that has revolutionized classical stable homotopy theory. A key observation is that the Artin-Tate subcategory of R-motivic spectra is easier to understand than the previously studied cellular subcategory. In particular, the Artin-Tate category contains a variant of the τ map, which is a feature conspicuously absent from the cellular category.