Design of fixed point state space digital filters with low round-off noise.

*(English)*Zbl 0791.94016Summary: A simple method is described for the design of fixed-point recursive digital filters with low round-off noise. The method is based on reducing to zero as many as possible of the coefficients of the filter state matrices. An optimization procedure is used to get the optimum value of linear transformation that minimizes the total output round-off noise power. Compared with the existing approaches, this method is characterized by its computational simplicity, very low output round-off noise (if not the lowest possible) and low coefficient sensitivity. The structure of the proposed technique is modular, which makes it suitable for VLSI implementation. The technique is then employed to obtain a reduced-order low-round-off-noise filter with characteristics equivalent to some desired FIR specifications. Illustrative examples are given to verify these advantages.

##### MSC:

94C05 | Analytic circuit theory |

##### Keywords:

design of fixed-point recursive digital filters; low round-off noise; low coefficient sensitivity; VLSI implementation
PDF
BibTeX
Cite

\textit{M. F. Fahmy} et al., Int. J. Circuit Theory Appl. 22, No. 1, 3--13 (1994; Zbl 0791.94016)

Full Text:
DOI

##### References:

[1] | Mullis, IEEE Trans. Circuits and Systems CAS-23 pp 551– (1976) |

[2] | Chen, Proc. IEE 138 pp 474– (1991) |

[3] | Bomar, IEEE Trans. Circuits and Systems CAS-31 pp 833– (1984) |

[4] | Amit, IEEE Trans. Acoust., Speech, Signal Process. ASSP-36 pp 880– (1988) |

[5] | Mills, IEEE Trans. Acoust., Speech, Signal Process. ASSP-29 pp 893– (1981) |

[6] | Tavsanoglu, IEEE Trans. Circuits and Systems CAS-31 pp 884– (1984) |

[7] | Thiele, Int. j. cir. theor. appl. 12 pp 39– (1984) |

[8] | Beliczynski, IEEE Trans. Signal Process. SP-40 pp 532– (1992) |

[9] | Sreeram, IEEE Trans. Signal Process. SP-40 pp 389– (1992) |

[10] | Fahmy, IEEE Trans. Signal Process. SP-42 (1994) |

[11] | McClellan, IEEE Trans. Audio Electroacoust. AU-21 pp 506– (1973) |

This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.