Bounds and positivity conditions for operator valued functions in a Hilbert lattice (Q369632)

Let \(H\) be a Hilbert space. The author studies regular functions of a bounded operator \(A\) acting in a Hilbert space and having the form \(A = D + T\), where \(T\) is a positive operator and \(D\) is a selfadjoint operator, whose resolution of the identity, \(P(t)\, (a\leq s\leq b)\) has the property \(P(s_2) -P(s_1)\), where \(s_1\leq s_2\) are non-negative in the sense of the order. The author obtains two sided norm estimates for the functions of the operator \(A = D + T\). They yield positivity conditions. Various applications are also discussed.