English

Double covers and extensions

Algebraic Geometry 2022-05-17 v4

Abstract

In this paper we consider double covers of the projective space in relation with the problem of extensions of varieties, specifically of extensions of canonical curves to K3K3 surfaces and Fano 3-folds. In particular we consider K3K3 surfaces which are double covers of the plane branched over a general sextic: we prove that the general curve in the linear system pull back of plane curves of degree k7k\geq 7 lies on a unique K3K3 surface. If k6k\leq 6 the general such curve is instead extendable to a higher dimensional variety. In the cases k=4,5,6k=4,5,6, this gives the existence of singular index kk Fano varieties of dimensions 8, 5, 3, and genera 17, 26, 37 respectively. For k=6k = 6 we recover the Fano variety P(3,1,1,1)\mathbf{P}(3, 1, 1, 1), one of only two Fano threefolds with canonical Gorenstein singularities with the maximal genus 37, found by Prokhorov. We show that the latter variety is no further extendable. For k=4k=4 and 55 these Fano varieties have been identified by Totaro. We also study the extensions of smooth degree 2 sections of K3K3 surfaces of genus 3. In all these cases, we compute the co-rank of the Gauss--Wahl maps of the curves under consideration. Finally we observe that linear systems on double covers of the projective plane provide superabundant logarithmic Severi varieties.

Keywords

Cite

@article{arxiv.2008.03109,
  title  = {Double covers and extensions},
  author = {Ciro Ciliberto and Thomas Dedieu},
  journal= {arXiv preprint arXiv:2008.03109},
  year   = {2022}
}

Comments

final version (some corrections in the proof of Prop.6.4), to appear in Kyoto Journal of Mathematics

R2 v1 2026-06-23T17:42:11.503Z