Inequalities for operator space numerical radius of 2× 2 block matrices

Abstract

In this paper, we study the relationship between operator space norm and operator space numerical radius on the matrix space Mn(X), when X is a numerical radius operator space. Moreover, we establish several inequalities for operator space numerical radius and the maximal numerical radius norm of 2× 2 operator matrices and their off-diagonal parts. One of our main results states that if (X, (On)) is an operator space, then align* 12(W(x1+x2)&, W(x1-x2) )\\ & W(bmatrix 0 & x1 \\ x2 & 0 bmatrix)\\ &1.5cm 12(W(x1+x2)+ W(x1-x2) ) align* for all x1, x2∈ Mn(X).