An optimal linear filter for estimation of random functions in Hilbert space

Abstract

Let f be a square-integrable, zero-mean, random vector with observable realizations in a Hilbert space H, and let g be an associated square-integrable, zero-mean, random vector with realizations, which are not observable, in a Hilbert space K. We seek an optimal filter in the form of a closed linear operator X acting on the observable realizations of a proximate vector fε ≈ f that provides the best estimate gε = X fε of the vector f. We assume the required covariance operators are known. The results are illustrated with a typical example.