Rational and p-local Motivic Homotopy Theory

Abstract

Let F and k be perfect fields. The main goal of this paper is to investigate algebraic models for the Morel-Voevodsky unstable motivic homotopy category Ho(F) after HA1k localization. More specifically, we extend results of Goerss to the A1-algebraic topology setting: we study the homotopy theory of the category scoCAlgk(SmF) of presheaves of simplicial coalgebras over a field k and their τ and A1-localizations. For k algebraically closed, we show that the unit of the adjunction kδ[-](-)gp determines the HA1k homotopy type, where kδ[-] is the canonical coalgebra functor induced by the diagonal map :X→ X× X. We extend this result for the category of presheaves of coalgebras over a non-algebraically closed field k and the category of discrete G-motivic spaces, for G=Gal(k/k). On the other hand, we show that the category of coalgebra objects in PST(SmF,k) is locally presentable, where PST(SmF,k) is the category of presheaves with Voevodsky transfers and the monoidal structure is given by a Day convolution product.