A coordinate-free condition number for convex programming

Abstract

We introduce and analyze a natural geometric version of Renegar's condition number R for the homogeneous convex feasibility problem associated with a regular cone C subseteq Rn. Let Grn,m denote the Grassmann manifold of m-dimensional linear subspaces of Rn and consider the projection distance dp(W1,W2) := ||PiW1 - PiW2|| (spectral norm) between W1 and W2 in Grn,m, where PiWi denotes the orthogonal projection onto Wi. We call CG(W) := max dp(W,W')-1 | W' ∈ Sigmam the Grassmann condition number of W in Grn,m, where the set of ill-posed instances Sigmam subset Grn,m is defined as the set of linear subspaces touching C. We show that if W = im(AT) for a matrix A in Rm× n, then CG(W) R(A) CG(W) kappa(A), where kappa(A) =||A|| ||A|| denotes the matrix condition number. This extends work by Belloni and Freund in Math. Program. 119:95-107 (2009). Furthermore, we show that CG(W) can as well be characterized in terms of the Riemannian distance metric on Grn,m. This differential geometric characterization of CG(W) is the starting point of the sequel [arXiv:1112.2603] to this paper, where the first probabilistic analysis of Renegar's condition number for an arbitrary regular cone C is achieved.