English

Hyperelliptic surfaces with $K^2 < 4\chi - 6$

Algebraic Geometry 2011-12-30 v1

Abstract

Let SS be a smooth minimal surface of general type with a (rational) pencil of hyperelliptic curves of minimal genus gg. We prove that if KS2<4χ(OS)6,K_S^2<4\chi(\mathcal O_S)-6, then gg is bounded. The surface SS is determined by the branch locus of the covering SS/i,S\rightarrow S/i, where ii is the hyperelliptic involution of S.S. For KS2<3χ(OS)6,K_S^2<3\chi(\mathcal O_S)-6, we show how to determine the possibilities for this branch curve. As an application, given g>4g>4 and KS23χ(OS)<6,K_S^2-3\chi(\mathcal O_S)<-6, we compute the maximum value for χ(OS).\chi(\mathcal O_S). This list of possibilities is sharp.

Keywords

Cite

@article{arxiv.1112.6359,
  title  = {Hyperelliptic surfaces with $K^2 < 4\chi - 6$},
  author = {Carlos Rito and María Martí Sánchez},
  journal= {arXiv preprint arXiv:1112.6359},
  year   = {2011}
}

Comments

17 pages

R2 v1 2026-06-21T19:58:08.678Z