On birational maps from cubic threefolds
Abstract
We characterise smooth curves in a smooth cubic threefold whose blow-ups produce a weak-Fano threefold. These are curves of genus and degree , such that (i) and ; (ii) does not admit a 3-secant line in the cubic threefold. Among the list of ten possible such types , two were previously left as open numerical possibilities, namely and . Using the Sarkisov link associated with a curve of type , we are able to produce the first example of a pseudo-automorphism with dynamical degree greater than on a smooth threefold with Picard number . We also prove that the group of birational selfmaps of any smooth cubic threefold contains elements contracting surfaces birational to any given ruled surface.
Cite
@article{arxiv.1409.7778,
title = {On birational maps from cubic threefolds},
author = {Jérémy Blanc and Stéphane Lamy},
journal= {arXiv preprint arXiv:1409.7778},
year = {2016}
}
Comments
In the last version, the relation with the work of [CM13] has been developed and the fact that the open subset in the moduli space of curve is dense has been added