摘要: For two n-by-n matrices A and B, it was known before that their numerical radii satisfy the inequality w(AB)≤4w(A)w(B), and the equality is attained by the 2-by-2 matrices A=[0100] and B=[0010]. Moreover, the constant “4” here can be reduced to “2” if A and B commute, and the corresponding equality is attained by A=I2⊗[0100] and B=[0100]⊗I2. In this paper, we give a complete characterization of A and B for which the equality holds in each case. More precisely, it is shown that w(AB)=4w(A)w(B) (resp., w(AB)=2w(A)w(B) for commuting A and B) if and only if either A or B is the zero matrix, or A and B are simultaneously unitarily similar to matrices of the form [0a00]⊕A′ and [00b0]⊕B′ (resp., [Display omitted] with w(A′)≤|a|/2 and w(B′)≤|b|/2. An analogous characterization for the extremal equality for tensor products is also proven. For doubly commuting matrices, we use their unitary similarity model to obtain the corresponding result. For commuting 2-by-2 matrices A and B, we show that w(AB)=w(A)w(B) if and only if either A or B is a scalar matrix, or A and B are simultaneously unitarily similar to [a100a2] and [b100b2] with |a1|≥|a2| and |b1|≥|b2|. 出版者: Elsevier Inc 出版日期: 2016-07-15 出處: Linear algebra and its applications, 2016-07, Vol.501, p.17-36 資源來源: ScienceDirect (Elsevier) Journals 版權: 2016 Elsevier Inc. 識別號: ISSN: 0024-3795 識別號: EISSN: 1873-1856 識別號: DOI: 10.1016/j.laa.2016.03.021
