Further norm and numerical radius inequalities for sum of Hilbert space operators

Abstract

Let B( H) denote the set of all bounded linear operators on a complex Hilbert space H. In this paper, we present some norm inequalities for sums of operators which are a generalization of some recent results. Among other inequalities, it is shown that if S, T∈ B( H) are normal operators, then eqnarray* S+T ≤ 12( S+ T)+12t>0 ( S - T)2+ 1t f1( S )g1( T)+tf2( S )g2( T) 2, eqnarray* where f1,f2,g1,g2 are non-negative continuous functions on [0,∞ ), in which f1(x)f2(x)=x and g1(x)g2(x)=x\,\,(x≥ 0). Moreover, it is shown several inequalities for the numerical radius.