Optimized Gr\"obner basis algorithms for maximal determinantal ideals and critical point computations

Abstract

Given polynomials g and f1,…,fp, all in [x1,…,xn] for some field , we consider the problem of computing the critical points of the restriction of g to the variety defined by f1=·s=fp=0. These are defined by the simultaneous vanishing of the fi's and all maximal minors of the Jacobian matrix associated to (g,f1, …, fp). We use the Eagon-Northcott complex associated to the ideal generated by these maximal minors to gain insight into the syzygy module of the system defining these critical points. We devise new F5-type criteria to predict and avoid more reductions to zero when computing a Gr\"obner basis for the defining system of this critical locus. We give a bound for the arithmetic complexity of this enhanced F5 algorithm and compare it to the best previously known bound for computing critical points using Gr\"obner bases.