Some generalizations of numerical radius on off-diagonal part of 2× 2 operator matrices
Abstract
We generalize several inequalities involving powers of the numerical radius for off-diagonal part of 2×2 operator matrices of the form T=[arraycc 0&B, C&0 array], where B, C are two operators. In particular, if T=[arraycc 0&B, C&0 array], then we get align* 1 232(r-1)\ \| μ \|, \| η \| \ ≤ wr(T)≤ 12r+1 \ \| μ \|, \| η \| \, align* where r≥ 2 and μ=|(C-B*)+i(C+B*)|r+|(B*-C)+i(C+B*)|r, η=|(B-C*)+i(B+C*)|r+|(C*-B)+i(B+C*)|r.
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