Computing critical points for invariant algebraic systems
Abstract
Let be a field and , in be multivariate polynomials (with ) invariant under the action of , the group of permutations of . We consider the problem of computing the points at which vanish and the Jacobian matrix associated to 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 . This allows us to design an algorithm which gives a triangular description of the solution space and which runs in time polynomial in , and where is the maximum degree of the input polynomials. When are fixed, this is polynomial in while when is fixed and this yields an exponential speed-up with respect to the usual polynomial system solving algorithms.
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}
}