On the design of second-order state-space digital filter sections

Abstract

A simplified parametric representation is introduced for the exploration of all real-scaled state-space realizations of a second-order transfer function having complex-conjugate poles. It is found that all real-scaled realizations can be represented as a function of a limited range of two real angles. It is shown that this representation can be used to obtain computationally efficient realizations with low roundoff noise and realizations which are roundoff-noise-optimal subject to L/sub infinity /-norm scaling. This latter class of realizations, which has not previously been synthesized, is found to be very similar to the realizations obtained by simply rescaling an optimal L/sub 2/-norm-scaled realization for L/sub infinity / scaling. An algebraic technique is introduced for the synthesis of second-order state-space realizations. This technique provides realizations that are as computationally efficient as possible, subject to preserving low roundoff noise, low coefficient sensitivity, and freedom from limit cycles.< <ETX xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink">&gt;</ETX>