Sharp inequalities for the numerical radius of block operator matrices

Abstract

In this paper, we present several sharp upper bounds for the numerical radii of the diagonal and off-diagonal parts of the 2×2 block operator matrix bmatrixA&B\\ C&Dbmatrix. Among extensions of some results of Kittaneh et al., it is shown that if T=bmatrixA&0\\ 0&Dbmatrix, and f and g are non-negative continuous functions on [0,∞) such that f(t)g(t)=t\,\,(t≥ 0), then for all nonnegative nondecreasing convex functions h on [0,∞) , we obtain that align*h(wr(T))≤ (\|1ph(fpr(|A|))+ 1qh(gqr(|A*|))\|, \|1ph(fpr(|D|))+ 1qh(gqr(|D*|))\|), align* where p, q>1 with 1p+1q=1 and r(p,q)≥ 2.