Landau and Gruss type inequalities for inner product type integral transformers in norm ideals

Abstract

For a probability measure μ and for square integrable fields (At) and (Bt) (t∈) of commuting normal operators we prove Landau type inequality ∫AtXBtdμ(t)- ∫At\,dμ(t)X ∫Bt\,dμ(t) \,∫|At|2-|∫At|2X \,∫|Bt|2 -|∫Bt|2 for all X∈B(H) and for all unitarily invariant norms ·. For Schatten p-norms similar inequalities are given for arbitrary double square integrable fields. Also, for all bounded self-adjoint fields satisfying CAt D and EBt F for all t∈ and some bounded self-adjoint operators C,D,E and F, then for all X∈ we prove Gr\"uss type inequality ∫AtXBt - ∫ At\,dμ(t)X ∫Bt\,dμ(t) ≤ \|D-C\|·\|F-E\|4· X. More general results for arbitrary bounded fields are also given.