Toeplitz condition numbers as an H∞ interpolation problem

Abstract

The condition numbers CN(T)==||T|| .||T-1|| of Toeplitz and analytic n× n matrices T are studied. It is shown that the supremum of CN(T) over all such matrices with ||T|| ≤1 and the given minimum of eigenvalues r=mini=1..n|λi|>0 behaves as the corresponding supremum over all n× n matrices (i.e., as 1rn (Kronecker)), and this equivalence is uniform in n and r. The proof is based on a use of the Sarason-Sz.Nagy-Foias commutant lifting theorem.