论文信息 - The biorthonormal filter bank convolver, and application in low sensitivity FIR filter structures

The biorthonormal filter bank convolver, and application in low sensitivity FIR filter structures

It was shown by P.P. Vaidyanathan (1993) that in the case of orthonormal and biorthonormal filter banks one can convolve two signals x(n) and g(n) by directly convolving the subband signals and combining the results. In the present work, this result is further generalized. The coding gain for a biorthonormal convolver is also derived. As an application, a novel low-sensitivity FIR (finite impulse response) filter structure is derived from the convolution theorem. This FIR filter structure is shown to be attractive when the filter coefficients are quantized to low bit rate. For a fixed word length implementation, the deterministic coding gain over direct convolution for the cases of quantizing the input signal and filter coefficients is considered.<<ETX>>

P. P. Vaidyanathan | See-May Phoong

[1] Richard E. Blahut,et al. Fast Algorithms for Digital Signal Processing , 1985 .

[2] P. P. Vaidyanathan,et al. Multirate digital filters, filter banks, polyphase networks, and applications: a tutorial , 1990, Proc. IEEE.

[3] Martin Vetterli. Running FIR and IIR filtering using multirate filter banks , 1988, IEEE Trans. Acoust. Speech Signal Process..

[4] J. Tukey,et al. Analysis of Quantization Errors in the Direct Form for Finite Impulse Response Digital Filters , 1973 .

[5] Andreas Steffen. Digital pulse compression using multirate filter banks , 1991 .

[6] P. P. Vaidyanathan,et al. Lattice structures for optimal design and robust implementation of two-channel perfect-reconstruction QMF banks , 1988, IEEE Trans. Acoust. Speech Signal Process..

[7] Ali N. Akansu,et al. On-signal decomposition techniques , 1991 .

[8] Peter No,et al. Digital Coding of Waveforms , 1986 .

[9] Martin Vetterli,et al. Wavelets and filter banks: theory and design , 1992, IEEE Trans. Signal Process..

[11] P. P. Vaidyanathan,et al. Orthonormal and biorthonormal filter banks as convolvers, and convolutional coding gain , 1993, IEEE Trans. Signal Process..

[12] Mark J. T. Smith,et al. A new filter bank theory for time-frequency representation , 1987, IEEE Trans. Acoust. Speech Signal Process..