English

Toward a salmon conjecture

Algebraic Geometry 2025-10-16 v2

Abstract

By using a result from the numerical algebraic geometry package Bertini we show that (up to high numerical accuracy) a specific set of degree 6 and degree 9 polynomials cut out the secant variety σ4(P2×P2×P3)\sigma_{4}(\mathbb{P}^{2}\times \mathbb{P} ^{2} \times \mathbb{P} ^{3}). This, combined with an argument provided by Landsberg and Manivel (whose proof was corrected by Friedland), implies set-theoretic defining equations in degrees 5, 6 and 9 for a much larger set of secant varieties, including σ4(P3×P3×P3)\sigma_{4}(\mathbb{P}^{3}\times \mathbb{P} ^{3} \times \mathbb{P} ^{3}) which is of particular interest in light of the salmon prize offered by E. Allman for the ideal-theoretic defining equations.

Keywords

Cite

@article{arxiv.1009.6181,
  title  = {Toward a salmon conjecture},
  author = {Daniel J. Bates and Luke Oeding},
  journal= {arXiv preprint arXiv:1009.6181},
  year   = {2025}
}

Comments

15 pages. Updated to reflect the referees' suggestions. Also added ancillary files to the arXiv in this version

R2 v1 2026-06-21T16:21:46.758Z