Cokernels of restriction maps and subgroups of norm one, with applications to quadratic Galois coverings

Abstract

Let f: S' --> S be a finite and faithfully flat morphism of locally noetherian schemes of constant rank n and let G be a smooth, commutative and quasi-projective S-group scheme with connected fibers. For every r>0, let ResG(r): Hr(Set,G)---> Hr(S'et,G) and CoresG(r): Hr(S'et,G)---> Hr(Set,G) be, respectively, the restriction and corestriction maps in etale cohomology induced by f. For certain pairs (f, G), we construct maps αr: Ker CoresG(r)---> Coker ResG(r) and βr: Coker ResG(r)---> Ker CoresG(r) such that αroβr=βroαr=n. In the simplest nontrivial case, namely when f is a quadratic Galois covering, we identify the kernel and cokernel of βr with the kernel and cokernel of another map Coker CoresG(r-1)---> KerResG(r+1). We then discuss several applications, for example to the problem of comparing the (cohomological) Brauer group of a scheme S to that of a quadratic Galois cover S' of S.