Numerical radius of certain two-by-two block matrices

Abstract

We investigate the numerical range W(T) and numerical radius w(T) of operators of the form T = pmatrix A & B \\ 0 & 0 pmatrix. We show that W(T) is the union of the numerical ranges of a family of 2× 2 matrices, Tx, leading to several consequences, including improved inequalities for w(T). For cases where A is a self-adjoint involution, we characterize the conditions under which W(T) is an elliptical disk and determine the minimum numerical radius of TU = pmatrix U*AU & B \\ 0 & 0 pmatrix over all unitary operators U. Finally, we study matrices T ∈ Mn satisfying \|Tm x\| = \|Tm\| = \|T\| for a unit vector x and all positive integers m. This analysis connects these matrices to the aforementioned block form and provides a counterexample to the conjecture that if \|Tk\| = \|T\| for all k 1, then some power of the matrix has a direct summand that is a scalar multiple of an idempotent.