English

On birational maps from cubic threefolds

Algebraic Geometry 2016-10-19 v2

Abstract

We characterise smooth curves in a smooth cubic threefold whose blow-ups produce a weak-Fano threefold. These are curves CC of genus gg and degree dd, such that (i) 2(d5)g2(d-5) \le g and d6d\le 6; (ii) CC does not admit a 3-secant line in the cubic threefold. Among the list of ten possible such types (g,d)(g,d), two were previously left as open numerical possibilities, namely (g,d)=(0,5)(g,d) = (0,5) and (2,6)(2,6). Using the Sarkisov link associated with a curve of type (2,6)(2,6), we are able to produce the first example of a pseudo-automorphism with dynamical degree greater than 11 on a smooth threefold with Picard number 33. We also prove that the group of birational selfmaps of any smooth cubic threefold contains elements contracting surfaces birational to any given ruled surface.

Keywords

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

R2 v1 2026-06-22T06:07:22.044Z