Numerical radius inequalities of 2 × 2 operator matrices

Abstract

Several upper and lower bounds for the numerical radius of 2 × 2 operator matrices are developed which refine and generalize the earlier related bounds. In particular, we show that if B,C are bounded linear operators on a complex Hilbert space, then eqnarray* && 12 \ \|B\|, \|C\| \+14 | \|B+C*\|-\|B-C*\| | &&≤ w ([arraycc 0 & B C& 0 array])\\ &&≤ 12 \\|B\|,\|C\| \+12 \r12(|B||C*|),r12(|B*||C|)\, eqnarray* where w(.), r(.) and \|.\| are the numerical radius, spectral radius and operator norm of a bounded linear operator, respectively. We also obtain equality conditions for the numerical radius of the operator matrix [arraycc 0 & B C& 0 array]. As application of results obtained, we show that if B,C are self-adjoint operators then, \\|B+C\|2 , \|B-C\|2 \≤ \|B2+C2 \|+2w(|B||C|).