English

Computing critical points for invariant algebraic systems

Symbolic Computation 2020-09-03 v1

Abstract

Let K\mathbf{K} be a field and ϕ\phi, f=(f1,,fs)\mathbf{f} = (f_1, \ldots, f_s) in K[x1,,xn]\mathbf{K}[x_1, \dots, x_n] be multivariate polynomials (with s<ns < n) invariant under the action of Sn\mathcal{S}_n, the group of permutations of {1,,n}\{1, \dots, n\}. We consider the problem of computing the points at which f\mathbf{f} vanish and the Jacobian matrix associated to f,ϕ\mathbf{f}, \phi is rank deficient provided that this set is finite. We exploit the invariance properties of the input to split the solution space according to the orbits of Sn\mathcal{S}_n. This allows us to design an algorithm which gives a triangular description of the solution space and which runs in time polynomial in dsd^s, (n+dd){{n+d}\choose{d}} and (ns+1)\binom{n}{s+1} where dd is the maximum degree of the input polynomials. When d,sd,s are fixed, this is polynomial in nn while when ss is fixed and dnd \simeq n this yields an exponential speed-up with respect to the usual polynomial system solving algorithms.

Keywords

Cite

@article{arxiv.2009.00847,
  title  = {Computing critical points for invariant algebraic systems},
  author = {Jean-Charles Faugère and George Labahn and Mohab Safey El Din and Éric Schost and Thi Xuan Vu},
  journal= {arXiv preprint arXiv:2009.00847},
  year   = {2020}
}
R2 v1 2026-06-23T18:15:32.589Z