New characterizations of Hoffman constants for systems of linear constraints

Abstract

We give a characterization of the Hoffman constant of a system of linear constraints in n relative to a reference polyhedron R⊂eqn. The reference polyhedron R represents constraints that are easy to satisfy such as box constraints. In the special case R = n, we obtain a novel characterization of the classical Hoffman constant. More precisely, suppose R⊂eq Rn is a reference polyhedron, A∈ m× n, and A(R):=\Ax: x∈ R\. We characterize the sharpest constant H(A|R) such that for all b ∈ A(R) + m+ and u∈ R \[ (u, PA(b) R) H(A|R) · \|(Au-b)+\|, \] where PA(b) = \x∈ n:Ax b\. Our characterization is stated in terms of the largest of a canonical collection of easily computable Hoffman constants. Our characterization in turn suggests new algorithmic procedures to compute Hoffman constants.