Solving determinantal systems using homotopy techniques

Abstract

Let be a field of characteristic zero and be an algebraic closure of . Consider a sequence of polynomialsG=(g\1,…,g\s) in [X\1,…,X\n], a polynomial matrix =[f\i,j] ∈ [X\1,…,X\n]p × q, with p ≤ q,and the algebraic set V\p(F, G) of points in at which all polynomials in and all p-minors of . Such polynomial systems appear naturally in e.g. polynomial optimization, computational geometry.We provide bounds on the number of isolated points in V\p(F, G) depending on the maxima of the degrees in rows (resp. columns) of . Next, we design homotopy algorithms for computing those points. These algorithms take advantage of the determinantal structure of the system defining V\p(F, G). In particular, the algorithms run in time that is polynomial in the bound on the number of isolated points.