The stable Galois correspondence for real closed fields

Abstract

In previous work, the authors constructed and studied a lift of the Galois correspondence to stable homotopy categories. In particular, if L/k is a finite Galois extension of fields with Galois group G, there is a functor cL/k* from the G-equivariant stable homotopy category to the stable motivic homotopy category over k such that cL/k*(G/H+) = Spec(LH)+. We proved that when k is a real closed field and L=k[i], the restriction of cL/k* to the η-complete subcategory is full and faithful. Here we "uncomplete" this theorem so that it applies to cL/k* itself. Our main tools are Bachmann's theorem on the (2,η)-periodic stable motivic homotopy category and an isomorphism range for the map on bigraded stable stems induced by C2-equivariant Betti realization.