Generalizing the Markov and covariance interpolation problem using input-to-state filters

Abstract

In the Markov and covariance interpolation problem a transfer function W is sought that match the first coefficients in the expansion of W around zero and the first coefficients of the Laurent expansion of the corresponding spectral density WW. Here we solve an interpolation problem where the matched parameters are the coefficients of expansions of W and WW around various points in the disc. The solution is derived using input-to-state filters and is determined by simple calculations such as solving Lyapunov equations and generalized eigenvalue problems.