Unipotent homotopy theory of schemes

Abstract

Building on To\"en's work on affine stacks, we develop a certain homotopy theory for schemes, which we call "unipotent homotopy theory." Over a field of characteristic p>0, we prove that the unipotent homotopy group schemes πiU(\,·\,) introduced in our paper recover the unipotent Nori fundamental group scheme, the p-adic \'etale homotopy groups, as well as certain formal groups introduced by Artin and Mazur. We prove a version of the classical Freudenthal suspension theorem as well as a profiniteness theorem for unipotent homotopy group schemes. We also introduce the notion of a formal sphere and use it to show that for Calabi-Yau varieties of dimension n, the group schemes πiU(\,·\,) are derived invariants for all i 0; the case i=n is related to recent work of Antieau and Bragg involving topological Hochschild homology. Using the unipotent homotopy group schemes, we establish a correspondence between formal Lie groups and certain higher algebraic structures.