An 8-Periodic Exact Sequence of Witt Groups of Azumaya Algebras with Involution

Abstract

Given an Azumaya algebra with involution (A,σ) over a commutative ring R and some auxiliary data, we construct an 8-periodic chain complex involving the Witt groups of (A,σ) and other algebras with involution, and prove it is exact when R is semilocal. When R is a field, this recovers an 8-periodic exact sequence of Witt groups of Grenier-Boley and Mahmoudi, which in turn generalizes exact sequences of Parimala--Sridharan--Suresh and Lewis. We apply this result in several ways: We establish the Grothendieck--Serre conjecture on principal homogeneous bundles and the local purity conjecture for certain outer forms of GLn and Sp2n, provided some assumptions on R. We show that a 1-hermitian form over a quadratic \'etale or quaternion Azumaya algebra over a semilocal ring R is isotropic if and only if its trace (a quadratic form over R) is isotropic, generalizing a result of Jacobson. We also apply it to characterize the kernel of the restriction map W(R) W(S) when R is a (non-semilocal) 2-dimensional regular domain and S is a quadratic \'etale R-algebra, generalizing a theorem of Pfister. In the process, we establish many fundamental results concerning Azumaya algebras with involution and hermitian forms over them.