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Characterization of half-radial matrices

Publication at Faculty of Mathematics and Physics |
2018

Abstract

Numerical radius r(A) is the radius of the smallest ball with the center at zero containing the field of values of a given square matrix A. It is well known that r(A) <= parallel to A parallel to <= 2r(A), where parallel to.parallel to is the matrix 2-norm.

Matrices attaining the lower bound are called radial, and have been analyzed thoroughly. This is not the case for matrices attaining the upper bound where only partial results are available.

In this paper we consider matrices satisfying r(A) =parallel to A parallel to/2and call them half-radial. We summarize the existing results and formulate new ones.

In particular, we investigate their singular value decomposition and algebraic structure, and provide other necessary and sufficient conditions for a matrix to be half-radial. Based on that, we study the extreme case of the attainable constant 2 in Crouzeix's conjecture.

The presented results support the conjecture of Greenbaum and Overton, that the Crabb Choi Crouzeix matrix always plays an important role in this extreme case.