An operator equality involving a continuous field of operators and its norm inequalities

Abstract

Let A be a C*-algebra, T be a locally compact Hausdorff space equipped with a probability measure P and let (At)t∈ T be a continuous field of operators in A such that the function t At is norm continuous on T and the function t \|At\| is integrable. Then the following equality including Bouchner integrals holds eqnarrayoi ∫T|At - ∫TAs dP|2 dP=∫T|At|2 dP - |∫TAt dP|2 . eqnarray This equality is related both to the notion of variance in statistics and to a characterization of inner product spaces. With this operator equality, we present some uniform norm and Schatten p-norm inequalities.