Amplitude-shift keying
Encyclopedia : A : AM : AMP : Amplitude-shift keying
| Topics in Modulation techniques |
| Analog modulation |
| Amplitude modulation | Frequency modulation | Phase modulation |
| Digital modulation |
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ASK | PSK | FSK | QAM | Delta modulation | MSK
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The amplitude of an analog carrier signal varies in accordance with the bit stream (modulating signal), keeping frequency and phase constant. The level of amplitude can be used to represent binary logic 0s and 1s. We can think of a carrier signal as an ON or OFF switch. In the modulated signal, logic 0 is represented by the absence of a carrier, thus giving OFF/ON keying operation and hence the name given.
Like AM, ASK is also linear and sensitive to atmospheric noise, distortions, propagation conditions on different routes in PSTN, etc. It requires excessive bandwidth and is therefore a waste of power. Both ASK modulation and demodulation processes are relatively inexpensive. This type of modulation can be used to transmit digital data over fiber.
Encoding
The simplest and most common form of ASK operates as a switch, using the presence of a carrier wave to indicate a binary one and its absence to indicate a binary zero. This type of modulation is called on-off keying, and is used at radio frequencies to transmit Morse code (referred to as continuous wave operation).
More sophisticated encoding schemes have been developed which represent data in groups using additional amplitude levels. For instance, a four-level encoding scheme can represent two bits with each shift in amplitude; an eight-level scheme can represent three bits; and so on. These forms of amplitude-shift keying require a high signal-to-noise ratio for their recovery, as by their nature much of the signal is transmitted at reduced power.
Here is a diagram showing the ideal model for a transmission system using an ASK modulation:
It can be divided into three blocks. The first one represents the transmitter, the second one is a linear model of the effects of the channel, the third one shows the structure of the receiver. The following notation is used:
- ht(t) is the carrier signal for the transmission
- hc(t) is the impulse response of the channel
- n(t) is the noise introduced by the channel
- hr(t) is the filter at the receiver
- L is the number of levels that are used for transmission
- Ts is the time between the generation of two symbols
- [v_i = \frac i - A; \quad i = 0,1,\dots, L-1]
- [ \Delta = \frac ]
Out of the transmitter, the signal s(t) can be expressed in the form:
- [s (t) = \sum_^ v[n] \cdot h_t (t - n T_s)]
- [z(t) = n_r (t) + \sum_^ v[n] \cdot g (t - n T_s)]
- [n_r (t) = n(t) * h_r (t)]
- [g(t) = h_t (t) * h_c (t) * h_r (t)]
- [z[k] = n_r [k] + v[k] g[0] + \sum_ v[n] g[k-n]]
If the filters are chosen so that g(t) will satisfy the Nyquist ISI criterion, then there will be no intersymbol interference and the value of the sum will be zero, so:
- [z[k] = n_r [k] + v[k] g[0]]
Probability of error
The probability density function to make an error after a certain symbol has been sent can be modelled by a Gaussian function; the mean value will be the relative sent value, and its variance will be given by:
- [\sigma_N = \int_^ \Phi_N (f) \cdot |H_r (f)|^2 df]
The possibility to make an error is given by:
- [P_e = P_ \cdot P_ + P_ \cdot P_ + \dots + P_} \cdot P_}]
If the probability of sending any symbol is the same, then:
- [P_ = \frac]
The possibility of making an error after a single symbol has been sent is the area of the Gaussian function falling under the other ones. It is shown in cyan just for one of them. If we call P+ the area under one side of the Gaussian, the sum of all the areas will be: [2 L P^+ - 2 P^+]. The total probability of making an error can be expressed in the form:
- [P_e = 2 \left( 1 - \frac \right) P^+]
it does not matter which Gaussian function we are considering, the area we want to calculate will be the same. The value we are looking for will be given by the following integral:
- [P^+ = \int_}^ \frac \sigma_N} e^} d x = \frac \operatorname \left( \frac (L-1) \sigma_N} \right) ]
- [P_e = \left( 1 - \frac \right) \operatorname \left( \frac (L-1) \sigma_N} \right) ]
This relationship is valid when there is no intersymbol interference, i.e. g(t) is a Nyquist function.
Considerations
ASK is the simplest kind of modulation that can be used to send data through a channel. It has several bad points:
- it can be used only when the signal-to-noise ratio is very high, because most of the signal is transmitted at reduced power, so it would be hard to recover.
- it needs A/D converters working at a frequency that could be higher than necessary: for example, if the bandwidth between 100 and 101 MHz is used for the transmission, the spectrum of the signal will be only 1 MHz wide, but the A/D converter will need to work at 101*2 = 202 MHz. In QAM modulation, an A/D converter working at 2 MHz would be enough.
See also
External links
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