Figure 5-1 (p. 321) Decimation by a factor of M .

1. Figure 5-1 (p. 321)Decimation by a factor of M.

2. Figure 5-2 (p. 321)Interpolation by a factor of M.

3. Figure 5-3 (p. 322)First Noble Identity.

4. Figure 5-4 (p. 322)Second Noble Identity,

5. Figure 5-5 (p. 323)Polyphase structure of a FIR filter with two modifiers.

6. Figure 5-6 (p. 324)Polyphase structure of a FIR filter with three subfilters.

7. Figure 5-7 (p. 325)Polyphase structure of a length-M FIR filter into I parallel subfilters, where K = M/I is an integer.

8. Figure 5-8 (p. 325)Schemes for sampling rate alteration by a rational factor of I/D.

9. Figure 5-9 (p. 326)Direct Form structure of a decimator.

10. Figure 5-10 (p. 327)Decimator realization using a polyphase structure.

11. Figure 5-11 (p. 328)(a) Efficient decimator using a polyphase filter. (b) Noble Identity.

12. Figure 5-12 (p. 329)Efficient realization of a decimator with linear phase filter in a polyphase structure; D = 3, M = 9.

13. Figure 5-13 (p. 329)Interpolation scheme.

14. Figure 5-14 (p. 329)Upsampler followed by a standard polyphase filter.

15. Figure 5-15 (p. 330)Upsampler followed by a transposed polyphase filter.

16. Figure 5-16 (p. 330)Efficient structure for interpolation using a transposed polyphase filter.

17. Figure 5-17 (p. 331)Interpolation using a polyphase filter and a commutator.

18. Figure 5-18 (p. 332)Interpolator realization using a PTV filter.

19. Figure 5-19 (p. 334)Narrow band filter design using an interpolated FIR filter.

20. Figure 5-20 (p. 335) IFIR filter with a factor-of-M interpolation.

21. Figure 5-21 (p. 325)(a) Standard decimation. (b) IFIR filter with stretch factor M1 followed by ( M2). (c) Two-stage implementation of decimator.

22. Figure 5-22 (p. 336)IFIT-based decimator design for a factor-of-50 decimator example.

23. Figure 5-23 (p. 336)(a) Standard interpolator with M = M1M2. (b) Upsampler followed by IFIR filter. (c) Two-stage design of interpolator based on IFIR approach.

24. Figure 5-24 (p. 337) Analysis filter bank.

25. Figure 5-25 (p. 337)Decomposition of the spectrum by an analysis filter bank.

26. Figure 5-26 (p. 338)Synthesis filter bank.

27. Figure 5-27 (p. 338)A uniform subband coding and decoding scheme using filter banks.

28. Figure 5-28 (p. 339) (a) A three-level multiresolution subband coder. (b) Decomposition of the frequency spectrum.

29. Figure 5-29 (p. 339)A three-level multiresolution subband decoder.

30. Figure 5-30 (p. 341)A uniform DFT filter bank; inefficient realization.

31. Figure 5-31 (p. 343)A uniform DFT filter bank implemented using a polyphase structure and IDFT.

32. Figure 5-32 (p. 343) Efficient realization of a uniform DFT filter bank.

33. Figure 5-33 (p. 344)2-channel QMF bank with channel degradations.

34. Figure 5-34 (p. 345)2-channel QMF bank with no channel distortion.

35. Figure 5-35 (p. 345)Magnitude responses for the analysis filters; (a) nonoverlapping and (b) overlapping.

36. Figure 5-36 (p. 349)Polyphase QMF bank; (a) analysis bank and (b) synthesis bank.

37. Figure 5-37 (p. 350)Complete QMF bank in polyphase form; efficient realization.

38. Figure 5-38a (p. 351)(a) Impulse response of the 48D Johnston filter.

39. Figure 5-38b (p.352) (b) Magnitude responses of filters H0(z).

40. Figure 5-38c (p. 352)(c) 10 log10 (|H0()|2 + |H1()|2) for the design example using the Croisier-Esteban-Galand filter bank and the Johnston 48D filter.

41. Figure 5-39 (p. 355)Relationship among filters in a Smith-Barnwell QMF bank.

42. Figure 5-40 (p. 356)Magnitude response of half-band filter showing symmetry about /2.

43. Figure 5-41 (p. 357)Zero locations of (z) and H0(z) for the design example of a Smith-Barnwell filter bank.

44. Figure 5-42 (p. 358)Magnitude responses of all filters for the design example of a Smith-Barnwell filter bank.

45. Figure P5-1 (p. 359)a

46. Figure P5-2 (p. 359)a

47. Figure P5-3 (p. 359)a

48. Figure P5-4 (p. 359)a

49. Figure P5-5 (p. 360)a

50. Figure P5-6 (p. 360)a