Applies adaptive feedforward software equalization using the least-mean-squared (LMS) algorithm to the PSK-demodulated input complex waveform. Sets the length of the feedforward equalizer in symbols.
The modulated complex baseband waveform data.
Trigger (start) time of the Y array.
Default: 0.0
Time interval between data points 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.
Parameter values defining the PSK system. Wire the PSK system parameters cluster of MT Generate PSK System Parameters (M) or MT Generate PSK System Parameters (map) to this cluster. Do not alter the values.
An ordered array that maps each Boolean symbol to its desired coordinates in the complex plane. The number of states in the array must be 2^{ N }, where N is the number of bits per symbol.
A value that indicates how the PSK modulation represents symbols.
Differential operation is used to implement PSK formats such as differential quadrature PSK (DQPSK) and $\pi $/4-DQPSK.
disable | Symbols are represented as constellation points. |
enable | Symbols are represented as the transitions between constellation points. |
Default: disable
Type of PSK modulation.
normal | Sets the modulation type to regular PSK. |
shifted | Rotates the constellation by $\pi $/M each symbol. |
offset | Sets the modulation type to offset quadrature phase-shift keying (OQPSK). This modulation scheme is a form of phase-shift keying in which four different phase angles are used. This scheme is sometimes referred to as staggered quadrature phase-shift keying (SQPSK). For offset PSK, the ideal symbol timing for Q is offset by 1/2 of a symbol period from the ideal symbol timing for I. offset is currently only supported for M= 4. |
Default: normal
The duration of the feedforward equalizer filter in symbols.
The actual length of the feedforward equalizer is given by the following equation:
N = equalizer length (symbols) × samples per symbol + 1
When reset? is set to TRUE, use this parameter to create the N-tap feedforward equalizer with default initial conditions. The default feedforward equalizer coefficients are thereby specified by the Dirac delta impulse response:
$c\left(n\right)=\delta (n-\frac{N}{2})$, n = 0 .. N-1
when reset? is set to TRUE.
Default: 1
The binary-valued training bits that train the feedforward equalizer during the training phase when the reset? parameter is set to TRUE. This parameter is ignored when reset? is set to FALSE.
Error conditions that occur before this node runs. The node responds to this input according to standard error behavior.
Default: no error
The feedforward equalization parameters, which define the equalizer tap spacing (symbol spaced/fractionally spaced) and convergence rate during training and steady-state.
The tap-spacing of the equalizer coefficients array, relative to one symbol duration. For error-free operation, set this parameter value to be a factor of the samples per symbol passed from MT Generate System Parameters.
Modulation nodes use two types of equalizers that are distinguished by their tap spacing: symbol-spaced or fractionally-spaced. A symbol-spaced (T-spaced) equalizer has
taps per symbol = 1,
which means that every tap of the equalization filter spans the time duration of one symbol.
A fractionally-spaced (T/N-spaced) equalizer has
taps per symbol > 1.
For example, a T/2-spaced equalizer has taps per symbol = 2, meaning that every two taps of the equalization filter span the time duration of one symbol.
Default: 1
The convergence parameter for feedforward equalization during the training phase. This value adapts the feedforward equalizer coefficients for the duration of the training period when reset? is set to TRUE.
Default: 0.01
The steady-state convergence parameter for adapting the equalizer coefficients during the decision-directed phase. Use this value for adapting the feedforward equalizer coefficients when reset? is set to FALSE.
Default: 0.01
A Boolean that determines whether to continue feedforward equalization using the previous iteration states. This node always resets on first call.
TRUE | Resets the internal state, restarts, and trains the equalizer. |
FALSE | Continues feedforward equalization using the previous iteration states. This node assumes that the input complex waveform is phase-continuous with the previous iteration. |
Default: TRUE
The equalized oversampled waveform generated from the feedforward equalizer as a result of adaptation. This waveform consists of the oversampled data that are compensated for the channel impulse response with zero intersymbol interference. Wire this parameter to the corresponding instance of MT Measure Quadrature Impairments to make modulation measurements such as modulation error ratio (MER) and error vector magnitude (EVM).
Trigger (start) time of the Y array.
Default: 0
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 instantaneous per symbol error in the output of the adaptive feedforward equalizer filter.
The adaptive feedforward equalizer filter coefficients when equalization is complete for the current iteration.
The recovered bit stream generated from the adaptive feedforward equalizer. The recovered bit stream is phase-aligned with the output complex waveform at the equalizer output. Wire this parameter to MT Measure Quadrature Impairments for performing modulation measurements such as modulation error ratio (MER) and error vector magnitude (EVM), or to MT Calculate BER after Trigger for making bit error rate (BER) measurements.
Error information. The node produces this output according to standard error behavior.
The input complex waveform is assumed to have undergone matched filtering and carrier frequency offset correction during the demodulation process (the recovered complex waveform returned by a Demodulation node meets these criteria). The adaptive equalization process ensures that the convolution of the channel filter and the equalizer coefficient filter yields a delta function thereby removing any intersymbol interference in the equalized output complex waveform.
The following flow chart illustrates demodulator-to-equalizer data flow.
Because the feedforward equalizer is adaptive, the adaptation is carried out initially in a training mode and is later switched to a decision-directed mode. In the training mode, a user-supplied training bit sequence trains the equalizer to adapt to the channel conditions. In the decision-directed mode, the equalizer tap adaptation is self-directed, and the current equalizer output adapts the equalizer taps for the next iteration.
For best performance during software equalization, ensure that there is an initial training period for the equalization to adapt before switching to decision-directed mode. In the absence of training data, the equalization process may fail to converge, resulting in a residual error between the equalizer output and the desired output.
The duration of the training mode is set by the number of training bits when reset? is set to TRUE, or when the first instance of this node is called. Training mode equalization is applied to the initial N symbols of the input complex waveform, where N is the number of symbols that can be mapped from the input training bits. Decision-directed equalization is applied to the input complex waveform starting at symbol N+1.
The equalizer is continuable, that is, the same instance of an equalizer can be called multiple times, with each instance operating on an input complex waveform representing a subsequent frame of the same data stream. To operate in this manner, call the equalizer in a loop with the first iteration setting reset? to TRUE and subsequent iterations setting reset? to FALSE.
The equalizer can also be applied to a discontinuous data stream, in which the same instance of the equalizer operates on input complex waveforms that do not maintain phase continuity from one to the next. To operate in this manner, call the same instance of the equalizer in a loop with reset? set to TRUE for all iterations.
Installed By: LabVIEW Communications System Design Suite (introduced in 1.0)
Where This Node Can Run:
Desktop OS: Windows
FPGA: Not supported
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