Moduli stack of oriented formal groups and cellular motivic spectra over C

Abstract

We exhibit a relationship between motivic homotopy theory and spectral algebraic geometry, based on the motivic τ-deformation picture of Gheorghe, Isaksen, Wang, Xu. More precisely, we identify cellular motivic spectra over C with ind-coherent sheaves (in a slightly non-standard sense) on a certain spectral stack τ 0( MFGor). The latter is the connective cover of the non-connective spectral stack MFGor, the moduli stack of oriented formal groups, which we have introduced previously and studied in connection with chromatic homotopy theory. We also provide a geometric origin on the level of stacks for the observed τ-deformation behavior on the level of sheaves, based on a notion of extended effective Cartier divisors in spectral algebraic geometry.