Rank one operators and norm of elementary operators

Let A be a standard operator algebra acting on a (real or complex) normed space E. For two n-tuples A = (A₁, … , A_n) and B = (B₁, … , B_n) of elements in A, we define the elementary operator R_A,B on A by the relation for all X in A. For a single operator A∈A, we define the two particular elementary operators L_A and R_A on A by L_A(X) = AX and R_A(X) = XA, for every X in A. We denote by d(R_A,B) the supremum of the norm of R_A,B(X) over all unit rank one operators on E. In this note, we shall characterize: (i) the supremun d(R_A,B), (ii) the relation , (iii) the relation d(L_A − R_B) = ∥A∥ + ∥B∥, (iv) the relation d(L_AR_B − L_BR_A) = 2∥A∥ + ∥B∥. Moreover, we shall show the lower estimate d(L_A − R_B) ? max{sup_λ∈V(B)∥A − λI∥, sup_λ∈V(A)∥B − λI∥} (where V(X) is the algebraic numerical range of X in A).