The weighted Hilbert--Schmidt numerical radius

Abstract

Let B(H) be the algebra of all bounded linear operators on a Hilbert space H and let N(·) be a norm on B(H). For every 0≤ ≤ 1, we introduce the w_(N,)(A) as an extension of the classical numerical radius by align* w_(N,)(A):= θ ∈ R N( eiθA + (1-)e-iθA*) align* and investigate basic properties of this notion and prove inequalities involving it. In particular, when N(·) is the Hilbert--Schmidt norm \|\!·\!\|2, we present several the weighted Hilbert--Schmidt numerical radius inequalities for operator matrices. Furthermore, we give a refinement of the triangle inequality for the Hilbert--Schmidt norm as follows: align* \|A+B\|2 ≤ 2w_(\|\!·\!\|2,)2(bmatrix 0 & A \\ B* & 0 bmatrix) - (1-2)2\|A-B\|22 ≤ \|A\|2 + \|B\|2. align* Our results extend some theorems due to F.~Kittaneh et al. (2019).