Quadrature amplitude modulation

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Topics in Modulation techniques

Analog modulation

AM | FM | PM | QAM

Digital modulation

QAM redirects here; for other uses of that abbreviation, see QAM (disambiguation).

Quadrature amplitude modulation (QAM) is a modulation scheme which conveys data by changing (modulating) the amplitude of two carrier waves. These two waves, usually sinusoids, are out of phase with each other by 90° and are thus called quadrature carriers — hence the name of the scheme.

1 Overview
2 Analogue QAM
3 Digital QAM
4 See also
5 External links
6 References

[edit] Overview

As with all modulation schemes, QAM conveys data by changing some aspect of a carrier signal, or the carrier wave, (usually a sinusoid) in response to a data signal. In the case of QAM, the amplitude of two waves, 90 degrees out-of-phase with each other (in quadrature) are changed (modulated or keyed) to represent the data signal.

Phase modulation (analogue PM) and phase-shift keying (digital PSK) can be regarded as a special case of QAM, where the amplitude of the modulating signal is constant, with only the phase varying. This can also be extended to frequency modulation (FM) and frequency-shift keying (FSK), as these can be regarded as a special case of phase modulation.

[edit] Analogue QAM

This section is a stub. You can help by expanding it.

Analogue QAM is used in NTSC, PAL and SECAM television systems, where the I- and Q-signals carry the components of chroma (colour) information. "Compatible QAM" or C-QUAM is used in AM stereo radio to carry the stereo difference information.

[edit] Digital QAM

As for many digital modulation schemes, the constellation diagram is a useful representation and is relied upon in this article.

In QAM, the constellation points are usually arranged in a square grid with equal vertical and horizontal spacing, although other configurations are possible (see e.g. Cross-QAM). Since in digital telecommunications the data is usually binary, the number of points in the grid is usually a power of 2 (2,4,8...). Since QAM is usually square, some of these are rare — the most common forms are 16-QAM, 64-QAM, 128-QAM and 256-QAM. By moving to a higher-order constellation, it is possible to transmit more bits per symbol. However, if the mean energy of the constellation is to remain the same (by way of making a fair comparison), the points must be closer together and are thus more susceptible to noise and other corruption; this results in a higher bit error rate and so higher-order QAM can deliver more data less reliably than lower-order QAM.

If data-rates beyond those offered by 8-PSK are required, it is more usual to move to QAM since it achieves a greater distance between adjacent points in the I-Q plane by distributing the points more evenly. The complicating factor is that the points are no longer all the same amplitude and so the demodulator must now correctly detect both phase and amplitude, rather than just phase.

64-QAM and 256-QAM are often used in digital cable television and cable modem applications. In the US, 64-QAM and 256-QAM are the mandated modulation schemes for digital cable (see QAM tuner) as standardised by the SCTE in the standard ANSI/SCTE 07 2000. Note that many marketing people will refer to these as QAM-64 and QAM-256. In the UK, 16-QAM and 64-QAM are currently used for digital terrestrial television (Freeview and Top Up TV).

[edit] Ideal structure

[edit] Transmitter

The following picture shows the ideal structure of a QAM transmitter, with a carrier frequency $f 0$ and $H t$ the frequency response of the transmitter's filter:

First the flow of bits to be transmitted is split into two equal parts: this process generates two independent signals to be transmitted. They are encoded separately just like they were in an amplitude-shift keying (ASK) modulator. Then one channel (the one "in phase") is multiplied by a cosine, while the other channel ("in quadrature") is multiplied by a sine. This way there is a phase of 90° between them. They are simply added one to the other and sent through the real channel.

The sent signal can be expressed in the form:

$s(t) = \sum_{n=-\infty}^{\infty} \left[ v_c [n] \cdot h_t (t - n T_s) \cos (2 \pi f_0 t) - v_s [n] \cdot h_t (t - n T_s) \sin (2 \pi f_0 t) \right],$

where $v c [n]$ and $v s [n]$ are the voltages applied in response to the $n$ ^th symbol to the cosine and sine waves respectively.

[edit] Receiver

The receiver simply performs the inverse process of the transmitter. Its ideal structure is shown in the picture below with $H r$ the receive filter's frequency response:

Multiplying by a cosine (or a sine) and by a low-pass filter it is possible to extract the component in phase (or in quadrature). Then there is only an ASK demodulator and the two flows of data are merged back.

In any application, the low-pass filter will be within h_r (t): here it was shown just to be clearer.

[edit] Definitions

The following definitions are needed in determining error rates:

$M$ = Number of symbols in modulation constellation
$E b$ = Energy-per-bit
$E s$ = Energy-per-symbol = $k E b$ with k bits per symbol
$N 0$ = Noise power spectral density (W/Hz)
$P b$ = Probability of bit-error
$P b c$ = Probability of bit-error per carrier
$P s$ = Probability of symbol-error
$P s c$ = Probability of symbol-error per carrier
$Q(x) = \frac{1}{\sqrt{2\pi}}\int_{x}^{\infty}e^{-t^{2}/2}dt,\ x\geq{}0$ .

$Q (x)$ is related to the complementary Gaussian error function by: $Q(x) = \frac{1}{2}\operatorname{erfc}\left(\frac{x}{\sqrt{2}}\right)$ , which is the probability that x will be under the tail of the Gaussian PDF towards positive infinity.

The error-rates quoted here are those in additive white Gaussian noise (AWGN).

Where coordinates for constellation points are given in this article, note that they represent a non-normalised constellation. That is, if a particular mean average energy were required (e.g. unit average energy), the constellation would need to be linearly scaled.

[edit] Rectangular QAM

Constellation diagram for rectangular 16-QAM.

Rectangular QAM constellations are, in general, sub-optimal in the sense that they do not maximally space the constellation points for a given energy. However, they have the considerable advantage that they may be easily transmitted as two pulse amplitude modulation (PAM) signals on quadrature carriers, and can be easily demodulated. The non-square constellations, dealt with below, achieve marginally better bit-error rate (BER) but are harder to modulate and demodulate.

The first rectangular QAM constellation usually encountered is 16-QAM, the constellation diagram for which is shown here. A Gray coded bit-assignment is also given. The reason that 16-QAM is usually the first is that a brief consideration reveals that 2-QAM and 4-QAM are in fact binary phase-shift keying (BPSK) and quadrature phase-shift keying (QPSK), respectively. 8-QAM presents problems in dividing an odd number of bits between the two carriers, and is rarely used since 8-PSK is considerably simpler.

Expressions for the symbol error-rate of rectangular QAM are not hard to derive but yield rather unpleasant expressions. For an even number of bits per symbol, $k$ , exact expressions are available. They are most easily expressed in a per carrier sense:

$P_{sc} = 2\left(1 - \frac{1}{\sqrt M}\right)Q\left(\sqrt{\frac{3}{M-1}\frac{E_s}{N_0}}\right)$ ,

$\,P_s = 1 - \left(1 - P_{sc}\right)^2$ .

The bit-error rate will depend on the exact assignment of bits to symbols, but for a Gray-coded assignment with equal bits per carrier:

$P_{bc} = \frac{4}{k}\left(1 - \frac{1}{\sqrt M}\right)Q\left(\sqrt{\frac{3k}{M-1}\frac{E_b}{N_0}}\right)$ ,

$\,P_b = 1 - \left(1 - P_{bc}\right)^2$ .

[edit] Odd- $k$ QAM

For odd $k$ , such as 8-QAM ( $k = 3$ ) it is harder to obtain symbol-error rates, but a tight upper bound is:

$P_s \leq{} 4Q\left(\sqrt{\frac{3kE_b}{(M-1)N_0}}\right)$ .

Two rectangular 8-QAM constellations are shown below without bit assignments. These both have the same minimum distance between symbol points, and thus the same symbol-error rate (to a a first approximation).

The exact bit-error rate, $P b$ will depend on the bit-assignment.

Note that neither of these constellations are used in practice, as the non-rectangular version of 8-QAM is optimal.

Constellation diagram for rectangular 8-QAM.

Alternative constellation diagram for rectangular 8-QAM.

[edit] Non-rectangular QAM

Constellation diagram for circular 8-QAM.

Constellation diagram for circular 16-QAM.

It is the nature of QAM that most orders of constellations can be constructed in many different ways and it is neither possible nor instructive to cover them all here. This article instead presents two, lower-order constellations.

Two diagrams of circular QAM constellation are shown, for 8-QAM and 16-QAM. The circular 8-QAM constellation is known to be the optimal 8-QAM constellation in the sense of requiring the least mean power for a given minimum Euclidean distance. The 16-QAM constellation is suboptimal although the optimal one may be constructed along the same lines as the 8-QAM constellation. The circular constellation highlights the relationship between QAM and PSK. Other orders of constellation may be constructed along similar (or very different!) lines. It is consequently hard to establish expressions for the error-rates of non-rectangular QAM since it necessarily depends on the constellation. Nevertheless, an obvious upper bound to the rate is related to the minimum Euclidean distance of the constellation (the shortest straight-line distance between two points):

$P_s < (M-1)Q\left(\sqrt{d_{min}^{2}/2N_0}\right)$ .

Again, the bit-error rate will depend on the assignment of bits to symbols.

Although, in general, there is a non-rectangular constellation that is optimal for a particular $M$ , they are not often used since the rectangular QAMs are much easier to modulate and demodulate.

[edit] See also

Modulation for other examples of modulation techniques
Phase-shift keying
Carrierless Amplitude Phase Modulation (CAP)
QAM tuner for HDTV

[edit] External links

[edit] References

These results can be found in any good communications textbook, but the notation used here has mainly (but not exclusively) been taken from:

John G. Proakis, "Digital Communications, 3rd Edition", McGraw-Hill Book Co., 1995. ISBN 0-07-113814-5
Leon W. Couch III, "Digital and Analog Communication Systems, 6th Edition", Prentice-Hall, Inc., 2001. ISBN 0-13-081223-4

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Categories: Articles with sections needing expansion | Radio modulation modes | Data transmission

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Quadrature amplitude modulation

From Wikipedia, the free encyclopedia

Contents

[edit] Overview

[edit] Analogue QAM

[edit] Digital QAM

[edit] Ideal structure

[edit] Transmitter

[edit] Receiver

[edit] Definitions

[edit] Rectangular QAM

[edit] Odd- $k$ QAM

[edit] Non-rectangular QAM

[edit] See also

[edit] External links

[edit] References

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We provide Linux to the World

Quadrature amplitude modulation

From Wikipedia, the free encyclopedia

Contents

[edit] Overview

[edit] Analogue QAM

[edit] Digital QAM

[edit] Ideal structure

[edit] Transmitter

[edit] Receiver

[edit] Definitions

[edit] Rectangular QAM

[edit] Odd-k QAM

[edit] Non-rectangular QAM

[edit] See also

[edit] External links

[edit] References

Views

Navigation

Search

In other languages

[edit] Odd- $k$ QAM