Wave digital filter structures for high-speed narrow-band and wide-band filtering

Wave digital filter (WDF) structures for high-speed narrow-band and wide-band filtering are introduced. The narrow-band filter is composed of a periodic model filter and one or several, possibly periodic, masking filters in cascade. Lattice and bireciprocal lattice WDF filters are used for the model and masking filters, respectively. The wide-band filter consists of a narrow-band filter in parallel with an all-pass filter. The overall filters can be designed by separately designing the model and masking filters. The filters obtained in this approach also serve as good initial filters for further optimization. Both nonlinear and approximately linear phase filters are considered. One major advantage of the new filters over the corresponding conventional filters is that they have a substantially higher maximal sample frequency. In the case of approximately linear phase, the computational complexity can also be reduced. Further, the use of bireciprocal lattice wave digital (WD) masking filters also makes it possible to reduce the complexity, compared with the case in which FIR masking filters are used. Several design examples and a discussion of finite wordlength effects are included for demonstrating the properties of the new filters.

[1]  Mark A. Richards Application of Deczky's program for recursive filter design to the design of recursive decimators , 1982 .

[2]  C. Sidney Burrus,et al.  Optimum FIR and IIR multistage multirate filter design , 1983 .

[3]  Keshab K. Parhi,et al.  Pipeline interleaving and parallelism in recursive digital filters. II. Pipelined incremental block filtering , 1989, IEEE Trans. Acoust. Speech Signal Process..

[4]  Keshab K. Parhi,et al.  Pipelined lattice WDF design for wideband filters , 1995 .

[5]  C. K. Yuen,et al.  Digital Filters , 1979, IEEE Transactions on Systems, Man, and Cybernetics.

[6]  Lars Wanhammar,et al.  A DIGITAL FILTER STRUCTURE COMPOSED OF ALLPASS FILTERS AND AN FIR FILTER FOR WIDEBAND FILTERING H , .

[7]  A. Fettweis Wave digital filters: Theory and practice , 1986, Proceedings of the IEEE.

[8]  Keshab K. Parhi,et al.  Pipelined Wave Digital Filter design for narrow-band sharp-transition digital filters , 1994, Proceedings of 1994 IEEE Workshop on VLSI Signal Processing.

[9]  A. Fettweis,et al.  Wave digital lattice filters , 1974 .

[10]  S. Summerfield,et al.  Realisation of lattice wave digital filters using three-port adaptors , 1995 .

[11]  Miodrag Potkonjak,et al.  Multiple constant multiplications: efficient and versatile framework and algorithms for exploring common subexpression elimination , 1996, IEEE Trans. Comput. Aided Des. Integr. Circuits Syst..

[12]  A. Dempster,et al.  Use of minimum-adder multiplier blocks in FIR digital filters , 1995 .

[13]  Sanjit K. Mitra,et al.  Design of computationally efficient interpolated fir filters , 1988 .

[14]  Håkan Johansson,et al.  High-speed recursive filtering using the frequency-response masking approach , 1997, Proceedings of 1997 IEEE International Symposium on Circuits and Systems. Circuits and Systems in the Information Age ISCAS '97.

[15]  Håkan Johansson,et al.  Filter structures composed of allpass and FIR filters for interpolation and decimation with factors of two , 1998, ISCAS '98. Proceedings of the 1998 IEEE International Symposium on Circuits and Systems (Cat. No.98CH36187).

[16]  Tapio Saramäki,et al.  Linear phase IIR filters composed of two parallel allpass sections , 1994, Proceedings of IEEE International Symposium on Circuits and Systems - ISCAS '94.

[17]  Lars Wanhammar DESIGN OF LINEAR-PHASE LATTICE WAVE DIGITAL FILTERS , 1997 .

[18]  Lars Wanhammar,et al.  Filter structures composed of all-pass and FIR filters for interpolation and decimation by a factor of two , 1999 .

[19]  Lajos Gazsi,et al.  Explicit formulas for lattice wave digital filters , 1985 .

[20]  Anantha P. Chandrakasan,et al.  Low Power Digital CMOS Design , 1995 .

[21]  Alfred Fettweis,et al.  On adaptors for wave digital filters , 1975 .

[22]  Lars Wanhammar,et al.  FILTER STRUCTURES COMPOSED OF ALLPASS SUBFILTERS FOR HIGH-SPEED NARROW-BAND AND WIDEBAND FILTERING H , 2022 .

[23]  Keshab K. Parhi,et al.  Pipeline interleaving and parallelism in recursive digital filters. I. Pipelining using scattered look-ahead and decomposition , 1989, IEEE Trans. Acoust. Speech Signal Process..

[24]  T. Saramaki,et al.  Multistage, multirate FIR filter structures for narrow transition-band filters , 1990, IEEE International Symposium on Circuits and Systems.

[25]  Tapio Saramaki On the design of digital filters as a sum of two all-pass filters , 1985 .

[26]  Adly T. Fam,et al.  A new structure for narrow transition band, lowpass digital filter design , 1984 .

[27]  S. Mitra,et al.  Interpolated finite impulse response filters , 1984 .

[28]  T. Saramaki,et al.  Recursive Nth-band digital filters- Part I: Design and properties , 1987 .

[29]  Markku Renfors,et al.  The maximum sampling rate of digital filters under hardware speed constraints , 1981 .

[30]  Ingo Kunold Linear phase realization of wave digital lattice filters , 1988, ICASSP-88., International Conference on Acoustics, Speech, and Signal Processing.

[31]  Lars Wanhammar,et al.  DESIGN OF BIRECIPROCAL LINEAR-PHASE LATTICE WAVE DIGITAL FILTERS , 1998 .

[32]  T. Parks,et al.  A class of infinite-duration impulse response digital filters for sampling rate reduction , 1979 .

[33]  Lars Wanhammar,et al.  High-speed narrow-band lattice wave digital filters , 1996, Proceedings of Third International Conference on Electronics, Circuits, and Systems.

[34]  M. Renfors,et al.  Signal processor implementation of digital all-pass filters , 1988, IEEE Trans. Acoust. Speech Signal Process..

[35]  S. P. Kim,et al.  Block digital filter structures and their finite precision responses , 1996 .

[36]  K. S. Arun,et al.  High-speed digital filtering: Structures and finite wordlength effects , 1992, J. VLSI Signal Process..

[37]  W. Wegener,et al.  Wave digital directional filters with reduced number of multipliers and adders , 1979 .

[38]  Sanjit K. Mitra,et al.  N-path digital filters , 1984, ICASSP.