The action of the Cremona group on rational curves of P3

Abstract

A Cremona transformation is a birational self-map of the projective space Pn . Cremona transformations of Pn form a group and this group has a rational action on subvarieties of Pn and hence on its Hilbert scheme. We study this action on the family of rational curves of P3 and we prove the rectifiability of any one dimensional family. This shows that any uniruled surface is Cremona equivalent to a scroll and it answers a question of Bogomolov-B\"ohning related to the study of uniformly rational varieties. We provide examples of infinitely many scrolls in the same Cremona orbit and we show that a "general" scroll is not in the Cremona orbit of a "general" rational surface.