Numerical Radii for Tensor Products of Matrices

Abstract

For n-by-n and m-by-m complex matrices A and B, it is known that the inequality w(A B)\|A\|w(B) holds, where w(·) and \|·\| denote, respectively, the numerical radius and the operator norm of a matrix. In this paper, we consider when this becomes an equality. We show that (1) if \|A\|=1 and w(A B)=w(B), then either A has a unitary part or A is completely nonunitary and the numerical range W(B) of B is a circular disc centered at the origin, (2) if \|A\|=\|Ak\|=1 for some k, 1 k<∞, then w(A)(π/(k+2)), and, moreover, the equality holds if and only if A is unitarily similar to the direct sum of the (k+1)-by-(k+1) Jordan block Jk+1 and a matrix B with w(B)(π/(k+2)), and (3) if B is a nonnegative matrix with its real part (permutationally) irreducible, then w(A B)=\|A\|w(B) if and only if either pA=∞ or nB pA<∞ and B is permutationally similar to a block-shift matrix \[[ arraycccc 0 & B1 & & & 0 & & & & & Bk & & & 0 array ]\] with k=nB, where pA=\ 1: \|A\|=\|A\|\ and nB=\ 1 : B≠ 0\.