On the Uniqueness of Functions that Maximize the Crouzeix Ratio

Abstract

Let A be an n by n matrix with numerical range W(A) := \ q*Aq : q ∈ Cn , ~\| q \|2 = 1 \. We are interested in functions f that maximize \| f(A) \|2 (the matrix norm induced by the vector 2-norm) over all functions f that are analytic in the interior of W(A) and continuous on the boundary and satisfy z ∈ W(A) | f(z) | ≤ 1. It is known that there are functions f that achieve this maximum and that such functions are of the form Bφ, where φ is any conformal mapping from the interior of W(A) to the unit disk D, extended to be continuous on the boundary of W(A), and B is a Blaschke product of degree at most n-1. It is not known if a function f that achieves this maximum is unique, up to multiplication by a scalar of modulus one. We show that this is the case when A is a 2× 2 nonnormal matrix or a Jordan block, but we give examples of some 3× 3 matrices with elliptic numerical range for which two different functions f, involving the same conformal mapping but Blaschke products of different degrees, achieve the same maximal value of ||f(A)||2.