1 / 35

Signal and Systems Prof. H. Sameti

Signal and Systems Prof. H. Sameti. Chapter 8: Complex Exponential Amplitude Modulation Sinusoidal AM Demodulation of Sinusoidal AM Single-Sideband (SSB) AM Frequency-Division Multiplexing Superheterodyne Receivers AM with an Arbitrary Periodic Carrier

Mercy
Download Presentation

Signal and Systems Prof. H. Sameti

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Signal and SystemsProf. H. Sameti Chapter 8: Complex Exponential Amplitude Modulation Sinusoidal AM Demodulation of Sinusoidal AM Single-Sideband (SSB) AM Frequency-Division Multiplexing Superheterodyne Receivers AM with an Arbitrary Periodic Carrier Pulse Train Carrier and Time-Division Multiplexing Sinusoidal Frequency Modulation DT Sinusoidal AM DT Sampling, Decimation, and Interpolation

  2. Book Chapter8: Section1 The Concept of Modulation • Why? • More efficient to transmit E&M signals at higher frequencies • Transmitting multiple signals through the same medium using different carriers • Transmitting through “channels” with limited pass-bands • Others… • How? • Many methods • Focus here for the most part on Amplitude Modulation (AM)

  3. Book Chapter8: Section1 Amplitude Modulation (AM) of a Complex Exponential Carrier

  4. Book Chapter8: Section1 Demodulation of Complex Exponential AM Corresponds to two separate modulation channels (quadratures) with carriers 90˚ out of phase.

  5. Book Chapter8: Section1 Sinusoidal AM

  6. Book Chapter8: Section1 Synchronous Demodulation of Sinusoidal AM • Suppose θ= 0 for now, ⇒ Local oscillator is in phase with the carrier.

  7. Book Chapter8: Section1 Synchronous Demodulation in the Time Domain

  8. Book Chapter8: Section1 Synchronous Demodulation (with phase error) in the Frequency Domain

  9. Book Chapter8: Section1 Alternative: Asynchronous Demodulation

  10. Book Chapter8: Section1 Asynchronous Demodulation (continued)Envelope Detector In order for it to function properly, the envelope function must be positive for all time, i.e. A+ x(t) > 0 for all t. Demo: Envelope detection for asynchronous demodulation. Advantages of asynchronous demodulation: — Simpler in design and implementation. Disadvantages of asynchronous demodulation: — Requires extra transmitting power [Acosωct]2to make sure A+ x(t) > 0 ⇒Maximum power efficiency = 1/3 (P8.27)

  11. Book Chapter8: Section1 Double-Sideband (DSB) and Single-Sideband (SSB) AM Since x(t) and y(t) are real, from Conjugate symmetry both LSB and USB signals carry exactly the same information. DSB, occupies 2ωMbandwidth in ω> 0 Each sideband approach only occupies ωM bandwidth in ω> 0

  12. Book Chapter8: Section1 Single Sideband Modulation Can also get SSB/SC or SSB/WC

  13. Book Chapter8: Section1 Frequency-Division Multiplexing (FDM) • (Examples: Radio-station signals and analog cell phones) All the channels can share the same medium.

  14. Book Chapter8: Section1 FDM in the Frequency-Domain

  15. Book Chapter8: Section1 Demultiplexing and Demodulation ωaneeds to be tunable • Channels must not overlap ⇒Bandwidth Allocation • It is difficult (and expensive) to design a highly selective band-pass filter with a tunable center frequency • Solution –Superheterodyne Receivers

  16. Book Chapter8: Section1 The Superheterodyne Receiver • Operation principle: • Down convert from ωc to ωIF, and use a coarse tunable BPF for the front end. • Use a sharp-cutofffixed BPF at ωIF to get rid of other signals.

  17. Book Chapter8: Section2 AM with an Arbitrary PeriodicCarrier C(t) – periodic with period T, carrier frequency ωc = 2π/T Remember: periodic in t discrete in ω

  18. Book Chapter8: Section2 Modulating a (Periodic) Rectangular Pulse Train

  19. Book Chapter8: Section2 Modulating a Rectangular Pulse Train Carrier, cont’d For rectangular pulse Drawn assuming: Nyquist rate is met

  20. Book Chapter8: Section2 Observations 1) We get a similar picture with any c(t) that is periodic with period T 2) As long as ωc= 2π/T > 2ωM, there is no overlap in the shifted and scaled replicas of X(jω). Consequently, assuming a0≠0: x(t) can be recovered by passing y(t) through a LPF 3) Pulse Train Modulation is the basis for Time-Division Multiplexing Assign timeslots instead of frequencyslots to different channels, e.g. AT&T wireless phones 4) Really only need samples{x(nT)} when ωc> 2ωM⇒Pulse Amplitude Modulation

  21. Book Chapter8: Section2 Sinusoidal Frequency Modulation (FM) Amplitude fixed Phase modulation: Frequency modulation: X(t) is signal To be transmitted Instantaneous ω

  22. Book Chapter8: Section2 Sinusoidal FM (continued) • Transmitted power does not depend on x(t): average power = A2/2 • Bandwidth of y(t) can depend on amplitude of x(t) • Demodulation • Demodulation a) Direct tracking of the phase θ(t) (by using phase-locked loop) b) Use of an LTI system that acts like a differentiator H(jω) —Tunable band-limited differentiator, over the bandwidth of y(t) …looks like AM envelope detection

  23. Book Chapter8: Section2 DT Sinusoidal AM Multiplication ↔Periodic convolution Example#1:

  24. Book Chapter8: Section2 Example#2: Sinusoidal AM Drawn assuming: i.e., No overlap of shifted spectra

  25. Book Chapter8: Section2 Example #2 (continued):Demodulation Possible as long as there is no overlap of shifted replicas of X(ejω):

  26. Book Chapter8: Section2 Example #3: An arbitrary periodic DT carrier - Periodic convolution - Regular convolution

  27. Book Chapter8: Section2 Example #3 (continued):

  28. Book Chapter8: Section2 DT Sampling Motivation: Reducing the number of data points to be stored or transmitted, e.g. in CD music recording.

  29. Book Chapter8: Section2 DT Sampling (continued) Note: Pick one out of N - periodic with period

  30. Book Chapter8: Section2 DT Sampling Theorem We can reconstruct x[n] if ωs= 2π/N > 2ωM Drawn assuming ωs > 2ωM Nyquist rate is met ⇒ ωM< π/N Drawn assuming ωs < 2ωM Aliasing!

  31. Book Chapter8: Section2 Decimation — Downsampling xp[n] has (n-1) zero values between nonzero values: Why keep them around? Useful to think of this as sampling followed by discarding the zero values

  32. Book Chapter8: Section2 Illustration of Decimation in the Time-Domain (for N= 3)

  33. Book Chapter8: Section2 Decimation in the Frequency Domain Squeeze in time Expand in frequency - Still periodic with period 2π since Xp(ejω) is periodic with 2π/N

  34. Book Chapter8: Section2 Illustration of Decimation in the Frequency Domain

  35. Book Chapter8: Section2 The Reverse Operation: Upsampling(e.g.CD playback)

More Related