Motivic classifying ∞-topoi and spectral stacks

Abstract

In this paper, we develop motivic derived algebraic geometry, an enhancement of derived algebraic geometry adapted to the A1-homotopy theory of Morel and Voevodsky. We construct motivic model categories by imposing descent for a Grothendieck topology and invariance with respect to an interval object, and use them to formulate motivic versions of ∞-categories, ∞-topoi, and classifying ∞-topoi. We then define motivic spectral schemes and motivic spectral Deligne--Mumford stacks in terms of structured motivic ∞-topoi. The main result establishes the existence of a motivic stackification functor: a geometric morphism between compatible motivic classifying \(∞\)-topoi induces a pullback functor on structured motivic topoi, and this functor admits a left adjoint relative to the underlying motivic ∞-topos.