Improved inequalities for the numerical radius via Cartesian decomposition
Abstract
We develop various lower bounds for the numerical radius w(A) of a bounded linear operator A defined on a complex Hilbert space, which improve the existing inequality w2(A)≥ 14\|A*A+AA*\|. In particular, for r≥ 1, we show that eqnarray*14\|A*A+AA*\| ≤12 ( 12\|(A)+(A)\|2r+12\|(A)-(A)\|2r)1r ≤ w2(A),eqnarray* where (A) and (A) are the real and imaginary parts of A, respectively. Furthermore, we obtain upper bounds for w2(A) refining the well-known upper bound w2(A)≤ 12 (w(A2)+\|A\|2). Separate complete characterizations for w(A)=\|A\|2 and w(A)=12\|A*A+AA*\| are also given.
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