Further improvements of generalized numerical radius inequalities for Hilbert space operators
Abstract
Several new improvements of the A-numerical radius inequalities for operators acting on a semi-Hilbert space, i.e., a space generated by a positive operator A, are proved. In particular, among other inequalities, we show that align* 14\|TA T+TTA\|A ≤14(2ωA2(T)+γ(T)) ≤ ωA2(T), align* where γ(T)=(\|A(T)\|A2-\|A(T)\|A2)2+4\|A(T)A(T)\|A2. Here ωA(X) and \|X\|A denote respectively the A-numerical radius and the A-seminorm of an operator X. Also, A(T):=T+TA2 and A(T):=T-TA2i, where TA is a distinguished A-adjoint operator of T. Further, some new refinements of the triangle inequality related to \|·\|A are established.
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