Extreme points of well-posed polytopes

Abstract: Given a real matrix, we study the problem of finding a minimal set of columns spanning the convex polytope generated by the columns of the matrix. By considering the matrix as a data instance subject to perturbations, we introduce the notion of ill-posedness of a polytope, in the sense that small perturbations of the matrix might yield matrices with different combinatorial structures. We relate this notion of the ill-posedness to the better-known notion of the ill-posedness of conic homogeneous systems and pro… Show more