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Computational Algebra Group
Computational Algebra Seminar
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  • James Hirschfeld
  • (University of Sussex, UK)
  • Curves over a finite field: how many points?
  • 3pm–4pm, Tuesday 20th December, 2005
  • Carlaw 535

  • Let X be an irreducible algebraic curve defined over the finite field Fq. The number Mq of rational points on X satisfied the Hasse-Weil upper bound,

    Mq ≤ q + 1 + 2g√q,
    where g is the genus of X.

    This works well when q is large compared to g but not otherwise. In the latter case, the Stöhr–Voloch bound works better. A special case of this is the following, for a plane curve of degree n with not all points as inflexions and q odd:

    Mq ≤ 1⁄2n(n – 1 + q).
    Various aspects of these results will be discussed.

The Computational Algebra Group is a research group within the School of Mathematics and Statistics, University of Sydney.
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