Advertisement

Two-dimensional nonrecursive filters

  • J. G. Fiasconaro
Chapter
Part of the Topics in Applied Physics book series (TAP, volume 6)

Keywords

Frequency Response Discrete Fourier Transform Dual Problem Linear Programming Problem Window Function 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

Preview

Unable to display preview. Download preview PDF.

Unable to display preview. Download preview PDF.

References

  1. 3.1.
    H. D. Helms: IEEE Trans. Audio Electroacoust. AU-16, 336 (1968).Google Scholar
  2. 3.2.
    L. R. Rabiner: IEEE Trans. Commun. Technol. COM-19, 188 (1971).Google Scholar
  3. 3.3.
    J. F. Kaiser: “Digital Filters”. In System Analysis by Digital Computer, ed. by F. F. Kuo and J. F. Kaiser (J. Wiley, New York, 1966).Google Scholar
  4. 3.4.
    L. R. Rabiner, B. Gold, C. A. McGonegal: IEEE Trans. Audio Electroacoust. AU-18, 83 (1970).Google Scholar
  5. 3.5.
    L. R. Rabiner: IEEE Trans. Audio Electroacoust. AU-20, 280 (1972).Google Scholar
  6. 3.6.
    E. W. Cheney: Introduction to Approximation Theory (McGraw-Hill, New York, 1966).Google Scholar
  7. 3.7.
    O. Herrmann: Electron. Letters 6 (1970).Google Scholar
  8. 3.8.
    E. M. Hofstetter, A. V. Oppenheim, J. Siegal: “A New Technique for the Design of Nonrecursive Digital Filters”, Proc. Fifth Annual Princeton Conference on Information Sciences and Systems (1971).Google Scholar
  9. 3.9.
    T. W. Parks, J. H. McClellan: IEEE Trans. Circuit Theory CT-19, 189 (1972).Google Scholar
  10. 3.10.
    T. S. Huang: IEEE Trans. Audio Electroacoust. AU-20, 159 (1972).Google Scholar
  11. 3.11.
    J. L. Shanks, S. Treitel, J. H. Justice: IEEE Trans. Audio Electroacoust. AU-20, 115 (1972).Google Scholar
  12. 3.12.
    E.I. Jury: Theory and Application of the Z-Transform Method (John Wiley, New York, 1964).Google Scholar
  13. 3.13.
    B. Gold, C. M. Rader: Digital Processing of Signals (McGraw-Hill, New York, 1969).Google Scholar
  14. 3.14.
    D. C. Hanscomb: “Functions of Many Variables”. In Methods of Numerical Approximation, ed. by D. C. Hanscomb (Pergamon Press, New York, 1966).Google Scholar
  15. 3.15.
    J. R. Rice: The Approximation of Functions, Vol, II (Addison-Wesley, Reading, Mass., 1969).Google Scholar
  16. 3.16.
    J. R. Rice: The Approximation of Functions, Vol. I (Addison-Wesley, Reading, Mass., 1964).Google Scholar
  17. 3.17.
    E. Ya. Remes: General Computational Methods of Tchebycheff Approximation (Kiev, 1967) (Atomic Energy Commission Translation 4491).Google Scholar
  18. 3.18.
    E. L. Stiefel: “Numerical Methods of Tchebycheff Approximation”. In On Numerical Approximation, ed. by R. E. Langer (The University of Wisconsin Press, 1959).Google Scholar
  19. 3.19.
    W. W. Garvin: Introduction to Linear Programming (McGraw-Hill, New York, 1960).Google Scholar
  20. 3.20.
    W.A. Spivey, R.M. Thrall: Linear Optimization (Holt, Rinehart and Winston, New York, 1970).Google Scholar
  21. 3.21.
    T. S. Huang: IEEE Trans. Audio Electroacoust. AU-20, 88 (1972).Google Scholar
  22. 3.22.
    A. Papoulis: Systems and Transforms with Applications in Optics (McGraw-Hill, New York, 1968).Google Scholar
  23. 3.23.
    L. R. Rabiner: “Processing of Two-Dimensional Signals”. In Digital Signal Processing by L. R. Rabiner and B. Gold (unpublished).Google Scholar
  24. 3.24.
    J. V. Hu, L. R. Rabiner: IEEE Trans. Audio Electroacoust. AU-20, 249 (1972).Google Scholar
  25. 3.25.
    J. V. Hu: “Frequency Sampling Design of Two-Dimensional Finite Impulse Response Digital Filters”, M.I.T. S.M. Thesis, E.E. Dept. (1972).Google Scholar
  26. 3.26.
    IBM System/360 Scientific Subroutine Package (360A-CM-03X), Version III, Programmer's Manual.Google Scholar
  27. 3.27.
    W. E. Milne, W. Arntzen, N. Reynolds, J. Wheelock: “Mathematics for Digital Computers, Vol. 1: Multivariate Interpolation”, WADC Technical Report 57-556 (1958) ASTIA Document No. AD 131033.Google Scholar
  28. 3.28.
    H. C. Thacher, Jr., W. E. Milne: J. Soc. Indust. Appl. Math. 8, 33 (1960).Google Scholar
  29. 3.29.
    R. B. Guenther, E. L. Roetman: Math. of Computation 24, 517 (1970).Google Scholar
  30. 3.30.
    N. M. Brenner: “Three Fortran Programs that Perform the Cooley-Tukey Fourier Transform”, Technical Note 1967-2, Lincoln Laboratory, M.I.T. (July, 1967).Google Scholar
  31. 3.31.
    L. R. Rabiner, R. W. Schafer, C. M. Rader: IEEE Trans. Audio Electroacoust. AU-17, 86 (1969).Google Scholar
  32. 3.32.
    R. W. Hamming: Numerical Methods for Scientists and Engineers (McGraw-Hill, New York, 1962).Google Scholar
  33. 3.33.
    T. J. Rivlin, H. S. Shapiro: Comm. Pure Appl. Math. 13, 35 (1960).Google Scholar

Further References with Titles

  1. 1.34.
    Y. Kamp, J. P. Thiran: Maximally flat nonrecursive two-dimensional digital filters. IEEE Trans. Circuits and Systems CAS-21, No. 3, 437–449 (1974).Google Scholar
  2. 1.35.
    Y. Kamp, J. P. Thiran: Chebyshev approximation for two-dimensional nonrecursive digital filters. IEEE Trans. Circuits and Systems CAS-22, No. 3, 208–218 (1975).Google Scholar

Copyright information

© Springer-Verlag 1979

Authors and Affiliations

  • J. G. Fiasconaro

There are no affiliations available

Personalised recommendations