Some properties of the group of birational maps generated by the automorphisms of PnC and the standard involution

Abstract

We give some properties of the subgroup Gn(C) of the group of birational self-maps of PnC generated by the standard involution and the group of automorphisms of PnC. We prove that there is no nontrivial finite-dimensional linear representation of Gn(C). We also establish that Gn(C) is perfect, and that Gn(C) equipped with the Zariski topology is simple. Furthermore if is an automorphism of Bir(PnC), then up to birational conjugacy, and up to the action of a field automorphism Gn(C) is trivial.