Some equality conditions with respect to the dual norm of the numerical radius*†

Abstract

There are several inequalities comparing the numerical radius w(·)(or it's dual norm w ^*(⋅)) with other norms on M_n , the space of all n×n complex matrices. We give conditions for the case of equality in these inequalities. In particular, we show that w ^*(A) =∥A∥₁ (the trace norm of A) if and only if A is normal and 1=w ^*(A)/n=∥A∥_∞ (the spectral norm of A) if and only if A is unitarily similar to a block matrix on where A ₁₃ A ₂₂ are unitary and ∥A ₃₁∥_∞≤1. Moreover we characterize matrices A that satisfy the equality w ^*(A) =2∥A∥₁.