Linearization of finite subgroups of Cremona groups over non-closed fields

Abstract

We study linearizability properties of finite subgroups of the Cremona group Crn(k) in the case where k is a global field, with the focus on the local-global principle. For every global field k of characteristic different from 2 and every n 3 we give an example of a birational involution of Pnk (=an element g of order 2 in Crn(k)) such that g is not k-linearizable but g is kv-linearizable in Crn(kv) for all places v of k. The main tool is a new birational invariant generalizing those introduced by Manin and Voskresenskiı in the arithmetic case and by Bogomolov--Prokhorov in the geometric case. We also apply it to the study of birational involutions in real plane.