On the Balmer spectrum of the Morel-Voevodsky category

Abstract

We introduce the Morava-isotropic stable homotopy category and, more generally, the stable homotopy category of an extension E/k. These "local" versions of the Morel-Voevodsky stable A1-homotopy category SH(k) are analogues of local motivic categories introduced in [22], but with a substantially more general notion of "isotropy". This permits to construct the, so-called, isotropic Morava points of the Balmer spectrum Spc(SHc(k)) of (the compact part of) the Morel-Voevodsky category. These analogues of topological Morava points are parametrized by the choice of Morava K-theory and a K(p,m)-equivalence class of extensions E/k. This provides a large supply of new points, and substantially improves our understanding of the spectrum. An interesting new feature is that the specialization among isotropic points behaves differently than in topology.