Laguerre series approximation of infinite dimensional systems

Error estimates are given for the approximation of stable recorded delay systems in the L 2 and H® norms, using two recently advocated techniques based on Laguerre series. In addition, some theoretical results on L~(0, oo) approximation are derived.

As in the ÿnite-dimensional case, a state-space based controller for the inÿnite-dimensional H ∞ disturbance-attenuation problem may be calculated by solving two Riccati equations. These operator Riccati equations can rarely be solved exactly. We approximate the original inÿnite-dimensional system b

Laguerre methods provide concrete techniques for approximating infinite dimensional systems by finite dimensional systems. Laguerre shifts and shifted Hankel operators are instrumental in the explicit computation of achievable Hankel error norms and Hankel optimal Laguerre filters.