Orders that are \'Etale-Locally Isomorphic

Abstract

Let R be a semilocal Dedekind domain with fraction field F. We show that two hereditary R-orders in central simple F-algebras which become isomorphic after tensoring with F and with some faithfully flat \'etale R-algebra are isomorphic. On the other hand, this fails for hereditary orders with involution. The latter stands in contrast to a result of the first two authors, who proved this statement for hermitian forms over hereditary R-orders with involution. The results can be restated by means of \'etale cohomology and can be seen as variations of the Grothendieck--Serre conjecture on principal homogeneous bundles of reductive group schemes. Connections with Bruhat--Tits theory are also discussed.