General continued fraction expansions in the z domain

A recent paper (J. Number Theory 42 (1992), 61 87) announced various arithmetical properties of the Mahler function f (%, ,; x, y)= k=1 1 m k%+, x k y m . Unfortunately the arguments of that paper are marred by an error whereby the arguments hold only for ,=0 (or when b n =1 for all positive integer

A ,full computer-oriented procedure is presented for sirnplijying the rational ztransfer function of a stable and minimum-phase discrete-time system. The simpltjication is based on truncating the u-domain (where u = z + z -') squared magnitude continued-jraction expansion and using the factorization

The order reduction problem of z-transfer functions is solved by usinq the multipoint Jordan continued-fraction expansion (MJCFE) technique. An eficient algorithm thut does not require the use of' complex a(qebra is presented for obtaining an MJCFE from (I stable z-transfer .finction with expansion