The special fiber of the motivic deformation of the stable homotopy category is algebraic

Abstract

For each prime p, we define a t-structure on the category S0,0/τ-Modharmb of harmonic C-motivic left module spectra over S0,0/τ, whose MGL-homology has bounded Chow-Novikov degree, such that its heart is equivalent to the abelian category of p-completed BP*BP-comodules that are concentrated in even degrees. We prove that S0,0/τ-Modharmb is equivalent to Db(BP*BP-Comodev) as stable ∞-categories equipped with t-structures. As an application, for each prime p, we prove that the motivic Adams spectral sequence for S0,0/τ, which converges to the motivic homotopy groups of S0,0/τ, is isomorphic to the algebraic Novikov spectral sequence, which converges to the classical Adams-Novikov E2-page for the sphere spectrum S0. This isomorphism of spectral sequences allows Isaksen and the second and third authors to compute the stable homotopy groups of spheres at least to the 90-stem, with ongoing computations into even higher dimensions.