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Universal polynomials for singular curves on surfaces

Jun Li Stanford University Yu-jong Tzeng Harvard University

mathscidoc:1703.01005

Composito Mathematica, 150, (07), 1169-1182, 2014
Let S be a complex smooth projective surface and L be a line bundle on S. For any given collection of isolated topological or analytic singularity types, we show the number of curves in the linear system |L| with prescribed singularities is a universal polynomial of Chern numbers of L and S, assuming L is sufficiently ample. More generally, we show for vector bundles of any rank and smooth varieties of any dimension, similar universal polynomials also exist and equal the number of singular subvarieties cutting out by sections of the vector bundle. This work is a generalization of Gottsche’s conjecture.
curve counting, universal polynomial, Gottsche’s conjecture
[ Download ] [ 2017-03-13 12:49:04 uploaded by yujong ] [ 743 downloads ] [ 0 comments ] 
@inproceedings{jun2014universal,
  title={Universal polynomials for singular curves on surfaces},
  author={Jun Li, and Yu-jong Tzeng},
  url={http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20170313124904987985670},
  booktitle={Composito Mathematica},
  volume={150},
  number={07},
  pages={1169-1182},
  year={2014},
}
Jun Li, and Yu-jong Tzeng. Universal polynomials for singular curves on surfaces. 2014. Vol. 150. In Composito Mathematica. pp.1169-1182. http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20170313124904987985670.
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