Receives a sequence of data bits, performs FSK modulation, and returns the modulated complex baseband waveform in the output complex waveform parameter.
If you use the finite impulse response pulse-shaping filters in modulation nodes, it may lead to the apparent loss of bits caused by filter delay. Refer to Filter Delay in the Details for more information about this effect. Set the flush buffers? parameter to TRUE to offset the effects of filter delay in single-shot operations or in the last iteration of continuous operations.
Parameter values defining the FSK system. Wire the FSK system parameters cluster returned from MT Generate FSK System Parameters (M) or MT Generate FSK System Parameters (map) to this cluster. Do not alter the values.
An ordered array that maps each Boolean symbol to its desired deviation frequency. The number of FSK levels in the array is 2^{ N }, where N is the number of bits per symbol.
Continuity of phase transitions between symbols.
Name | Description |
---|---|
continuous | Continuous phase transitions between symbols. |
discontinuous | Discontinuous phase transitions between symbols, that is, discontinuous phase FSK (DPFSK). With discontinuous phase-FSK (DPFSK), modulation consists of selecting the appropriate sinusoid based on the input data. Thus, when switching between symbols, there is a discontinuity in the FSK signal phase. To emulate a hardware-based DPFSK source, this node maintains the phase of each independent sinusoid versus time. Thus, the DPFSK modulator acts like a hardware-based (multiple switched tone generator) FSK modulator. |
Default: continuous
The desired symbol rate, in hertz (Hz).
Default: 1.0
An ordered array containing the desired pulse-shaping coefficients. Wire the pulse shaping filter coefficients parameter of MT Generate Filter Coefficients to this parameter. When generating the filter coefficients, ensure that the value of the pulse shaping samples per symbol parameter of MT Generate Filter Coefficients is equal to the value of the samples per symbol element of the FSK system parameters cluster which is passed to this node.
When you configure reset? to TRUE, there is a transient response of half the filter length at the start of the modulated signal, and the returned output data is shortened by approximately half the filter length. When you configure reset? to FALSE, the node uses data from the previous iteration to eliminate the transient.
Error conditions that occur before this node runs. The node responds to this input according to standard error behavior.
Default: no error
A Boolean that determines whether the node continues modulating using the previous iteration states. The node resets on the first call and when you configure reset? to TRUE. You must configure reset? to TRUE the first time this node is called and whenever you want to restart the modulator.
Default: TRUE
A Boolean that determines whether samples are forced out from the modulated waveform that are affected by the FIR pulse-shaping filter delay. Set this parameter to TRUE during single-shot operations and during the last iteration of continuous operations.
TRUE | Destroys the internal states of the algorithms such that you cannot perform continuous processing on the signal during subsequent iterations. If flush buffers? is set to TRUE, you must set reset? to TRUE on the subsequent iteration. |
FALSE | Stores the internal states of the algorithms so that you can perform continuous processing on the signal during subsequent iterations. |
Default: FALSE
The modulated complex baseband waveform data.
Time of the first value in the Y array.
Time interval between data values in the Y array.
Default: 1.0
The complex-valued signal-only baseband modulated waveform. The real and imaginary parts of this complex data array correspond to the in-phase (I) and quadrature-phase (Q) data, respectively.
The array of mapped symbols before pulse shaping is applied. The real portion corresponds to the carrier frequency offset of the mapped symbol, and the imaginary portion is zero.
The signal bandwidth, using Carson’s Rule, is calculated using the following formula:
BW = 2(Fm + Fd)
where,
Fm is symbol bandwidth and is given by $(1+\alpha )\times R$, where R is the symbol rate and $\alpha $is the filter parameter.
Fd is the maximum frequency deviation and is given by $\frac{\mathrm{max}\left({h}_{i}\right)\times M\times R}{2}$, where h _{ i } is the modulation index for the ith baud.
The sample rate of the signal is given by fs = samples per symbol * R.
A value of fs that is less than BW causes aliasing. The signal can be checked for aliasing by observing its spectrum and noting whether the observed bandwidth of the signal is higher than the calculated bandwidth.
You can prevent your signal from aliasing by using one of the following strategies:
where
P is the filter order
x[n] is the input signal
y[n] is the output signal
b_{i} are the filter coefficients
The initial state for all samples in an FIR filter is 0. The filter output until the first input sample reaches the middle tap (the first causal sample) is called the transient response, or filter delay. For an FIR filter that has N taps, the delay is (N-1)/2 samples. This relationship is illustrated in the following figure, where a sine wave is filtered by an FIR filter with 50 taps.
In single-shot operations for modulators and demodulators, the filter delay is truncated before the signal is generated because these samples are not valid. Some samples at the end of the block do not appear at the modulator or demodulator output, and hence appear to have been lost.
Where This Node Can Run:
Desktop OS: Windows
FPGA: Not supported