Injectivity and Surjectivity of the Dress Map

Abstract

For a nontrivial finite Galois extension L/k (where the characteristic of k is different from 2) with Galois group G, we prove that the Dress map hL/k: A(G) GW(k) is injective if and only if L=k(α) where α is not a sum of squares in k×. Furthermore, we prove that hL/k is surjective if and only if k is quadratically closed in L. As a consequence, we give strong necessary conditions for faithfulness of the Heller-Ormsby functor cL/k* : SHG SHk, as well as strong necessary conditions for fullness of cL/k*.