English

Computing the Singularities of Rational Surfaces

Algebraic Geometry 2014-10-28 v2

Abstract

Given a rational projective parametrization \cP(\ttt,\sss,\vvv)\cP(\ttt,\sss,\vvv) of a rational projective surface \cS\cS we present an algorithm such that, with the exception of a finite set (maybe empty) \cB\cB of projective base points of \cP\cP, decomposes the projective parameter plane as \projdos\cB=k=1\cSmk\projdos\setminus \cB=\cup_{k=1}^{\ell} \cSm_k such that if (\ttt0:\sss0:\vvv0)\cSmk(\ttt_0:\sss_0:\vvv_0)\in \cSm_k then \cP(\ttt0,\sss0,\vvv0)\cP(\ttt_0,\sss_0,\vvv_0) is a point of \cS\cS of multiplicity kk.

Keywords

Cite

@article{arxiv.1107.5262,
  title  = {Computing the Singularities of Rational Surfaces},
  author = {S. Perez-Diaz and J. R. Sendra and C. Villarino},
  journal= {arXiv preprint arXiv:1107.5262},
  year   = {2014}
}

Comments

In this new version, we only have changed the thanks. In particular, we have written: This work was developed, and partially supported, under the research project MTM2008-04699-C03-01 "Variedades param\'etricas: algoritmos y aplicaciones", Ministerio de Ciencia e Innovaci\'on, Spain and by "Fondos Europeos de Desarrollo Regional" of the European Union

R2 v1 2026-06-21T18:42:30.919Z