Syzygies of the secant variety of a curve

@article{Sidman2009SyzygiesOT,
  title={Syzygies of the secant variety of a curve},
  author={J. Sidman and P. Vermeire},
  journal={Algebra & Number Theory},
  year={2009},
  volume={3},
  pages={445-465}
}
  • J. Sidman, P. Vermeire
  • Published 2009
  • Mathematics
  • Algebra & Number Theory
  • We show that the secant variety of a linearly normal smooth curve of degree at least 2g+3 is arithmetically Cohen-Macaulay, and we use this information to study the graded Betti numbers of the secant variety. 
    Equations and syzygies of the first secant variety to a smooth curve
    • 4
    • PDF
    On the normality of secant varieties
    • 5
    • PDF
    Arithmetic properties of the first secant variety to a projective variety
    Singularities and syzygies of secant varieties of nonsingular projective curves
    Singularities of secant varieties
    • 3
    • Highly Influenced
    • PDF

    References

    Publications referenced by this paper.