Generalized Euclidean operator radius inequalities of a pair of bounded linear operators
Abstract
Let B(H) represent the C*-algebra, which consists of all bounded linear operators on H, and let N ( .) be a norm on B(H). We define a norm w(N,e) (. , . ) on B2(H) by w(N,e)(B,C)=|λ1|2+λ2|2≤1 θ∈R N( (eiθ(λ1B+λ2C))), for every B,C∈B(H) and λ1,λ2∈C. We investigate basic properties of this norm and prove some bounds involving it. In particular, when N( .) is the Hilbert-Schmidt norm, we prove some Hilbert-Schmidt Euclidean operator radius inequalities for a pair of bounded linear operators.
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