# Power Amplifier Modeling using Neural Networks

*Since R2024a*

This example shows how to model a power amplifier (PA) using several different neural network (NN) architectures. In this example, you will

Design and train different PA neural models.

Test the all the PA networks using an an actual PA.

Compare the results of all the PA networks to that of actual PA.

### Introduction

Power amplifiers lie at the front end of most radio frequency systems, including wireless communications and radar systems, and are critical in ensuring the appropriate range of wireless systems. Power amplifier behavior is affected by nonlinear behavior and memory effects, and hence depends on input signal characteristics such as bandwidth, frequency, PAPR, modulation, and loading conditions. Some popular behavior models include memory polynomial (MP), envelope memory polynomial (EMP), generalized memory polynomial (GMP), and Volterra series (VS).

Recent studies show that neural networks have the potential to more accurately model wideband PAs. This example models, trains, and tests the following neural network architectures:

Augmented real-valued time-delay neural network power amplifier (ARVTDNNPA)

Long short-term memory neural network power amplifier (LSTMNNPA)

Bidirectional LSTM neural network power amplifier (BiLSTMNNPA)

Gated recurrent unit neural network power amplifier (GRUNNPA)

Following diagram shows the training workflow. During training, measure the input to the PA, $$u$$, used as the input signal and the output of the PA, $$x$$, used as the target signal.

### NN-based PA Structure

Design of following types of neural network power amplifier (NN-PA):

**ARVTDNNPA**$-\text{\hspace{0.17em}}$Has multiple fully connected layers with leakyRelu activation and an augmented input.**LSTMNNPA**$-\text{\hspace{0.17em}}$Has lstm and fully connected layers with tanh activation and an augmented input.**BiLSTMNNPA**$-\text{\hspace{0.17em}}$Has bilstm and fully connected layers with tanh activation and an augmented input.**GRUNNPA**$-\text{\hspace{0.17em}}$Has gru and fully connected layers with tanh activation and an augmented input.

The memory polynomial model has been commonly applied in the behavioral modeling and predistortion of PAs with memory effects. This equation shows the PA memory polynomial.

$\mathit{x}\left(\mathit{n}\right)=\mathit{f}\left(\mathit{u}\left(\mathit{n}\right)\right)=\sum _{\mathit{m}=0}^{\mathit{M}-1}\sum _{\mathit{k}=0}^{\mathit{K}-1}{\mathit{c}}_{\mathit{m}}\mathit{u}\left(\mathit{n}-\mathit{m}\right){\left|\mathit{u}\left(\mathit{n}-\mathit{m}\right)\right|}^{\mathit{k}}$

The output is a function of the delayed versions of the input signal, $$u(n)$$, and also powers of the amplitudes of $$u(n)$$ and its delayed versions. Since a neural network can approximate any function provided that it has enough layers and neurons per layer, you can input $$u(n)$$ to the neural network and approximate $$f(u(n))$$. The neural network can input $$u(n-m)$$ and $$|u(n-m){|}^{k}$$ to decrease the required complexity.

The input layer inputs the in-phase and quadrature components (${\mathit{I}}_{\mathrm{in}}$/${\mathit{Q}}_{\mathrm{in}}$) of the complex baseband samples. The ${\mathit{I}}_{\mathrm{in}}$/${\mathit{Q}}_{\mathrm{in}}$ samples and $$m$$ delayed versions are used as part of the input to account for the memory in the PA model. Also, the amplitudes of the ${\mathit{I}}_{\mathrm{in}}$/${\mathit{Q}}_{\mathrm{in}}$ samples up to the $${k}^{th}$$ power are fed as input to account for the nonlinearity of the PA.

Where,

$$\begin{array}{l}{I}_{in}(n)=\mathrm{\Re}(x(n))\\ {Q}_{in}(n)=\mathrm{\Im}(x(n))\\ {I}_{out}(n)=\mathrm{\Re}(u(n))\\ {Q}_{out}(n)=\mathrm{\Im}(u(n)),\end{array}$$

$$\mathrm{\Re}$$ and $$\mathrm{\Im}$$ are the real and imaginary part operators, respectively.

### Power Amplifier Dataset Creation

Data Preparation for Neural Network Digital Predistortion Design example shows how to prepare training, validation, and testing data`. `

Use the training and validation data to train the NN-PA. Use the test data to evaluate the NN-PA performance.

#### Choose Data Source

Choose the data source for the system. This example uses an NXP Airfast LDMOS Doherty PA, which is connected to a local NI VST, as described in the Power Amplifier Characterization example. If you do not have access to a PA, run the example with saved data. If you choose saved data, the example downloads the data files.

`dataSource = "Saved data";`

#### Generate Training, Validation and Testing Data

#### Generate Over-sampled OFDM Signals

Generate OFDM-based signals to excite the PA. This example uses a 5G-like OFDM waveform. Set the bandwidth of the signal to 100 MHz. Choosing a larger bandwidth signal causes the PA to introduce more nonlinear distortion and yields greater benefit from the addition of the DPD. Generate six OFDM symbols, where each subcarrier carries a 16-QAM symbol, by using the `helperNNDPDGenerateOFDM`

function. Save the 16-QAM symbols as a reference to calculate the EVM performance. To capture the effects of higher order nonlinearities, the example oversamples the PA input by a factor of 5.

bw = 100e6; % Hz symPerFrame = 6; % OFDM symbols per frame M = 16; % Each OFDM subcarrier contains a 16-QAM symbol osf = 5; % oversampling factor for PA input [txWaveTrain, txWaveVal, txWaveTest, ... qamRefSymTrain, qamRefSymVal, qamRefSymTest, ... ofdmParams] = helperOversampledOFDMSignals(bw, symPerFrame, M, osf); Fs = ofdmParams.SampleRate;

Pass signals through the PA using the helperVSTDriver and helperNNDPDPAMeasure functions.

switch dataSource case "Data acquisition - NI VST" resourceName = 'VST_01'; VST = helperVSTDriver(resourceName); cleanup = onCleanup(@()release(VST)); VST.DUTExpectedGain = 29; % dB VST.ExternalAttenuation = 30; % dB VST.DUTTargetInputPower = 5; % dBm VST.CenterFrequency = 3700000000; % Hz

Send the signals to the PA and collect the outputs

[paOutputTrain, measInfo] = helperNNDPDPAMeasure(txWaveTrain, Fs, VST); linearGainPA = measInfo.LinearGain; paOutputVal = helperNNDPDPAMeasure(txWaveVal, Fs, VST); paOutputTest = helperNNDPDPAMeasure(txWaveTest, Fs, VST); otherwise helperNNDPDDownloadData("dataprep") load("nndpdTrainingDataOct23.mat", ... "txWaveTrain", "qamRefSymTrain", "paOutputTrain", ... "txWaveVal", "qamRefSymVal", "paOutputVal", ... "txWaveTest", "qamRefSymTest", "paOutputTest", ... "linearGainPA"); end

Starting download of data files from: https://www.mathworks.com/supportfiles/spc/NNDPD/NNDPD_training_data_Oct23.zip Download complete. Extracting files. Extract complete.

helperPANNPlotSpecAnAMAM(txWaveTrain, paOutputTrain);

helperPANNPlotSpecAnGain(txWaveTrain, paOutputTrain, linearGainPA);

#### Preprocess Data

Enter the memory depth and non-linear degree of power amplifier.

memDepth = 5;% Memory depth of the PA model nonlinearDegree = 5; % Nonlinear polynomial degree

Preprocess data to generate input vectors containing features.

paInputTrain = txWaveTrain; paInputVal = txWaveVal; paInputTest = txWaveTest; scalingFactorPA = 1/std(paInputTrain); inputProcPA = helperNNDPDInputPreprocessor(memDepth, nonlinearDegree); inputFeaturesTrain = inputProcPA(paInputTrain*scalingFactorPA); inputFeaturesVal = inputProcPA(paInputVal*scalingFactorPA); paOutputTrainNorm = paOutputTrain*scalingFactorPA; paOutputTrainR = [real(paOutputTrainNorm) imag(paOutputTrainNorm)]; paOutputValNorm = paOutputVal*scalingFactorPA; paOutputValR = [real(paOutputValNorm) imag(paOutputValNorm)];

### Design and Train

Before training the neural network based PA, select the memory depth and degree of nonlinearity in the Pre-processing Data section. For purposes of comparison, specify a memory depth of 5 and a nonlinear polynomial degree of 5, as in the Power Amplifier Characterization example.

#### Define NN-PA

select one of the NN-PA network architectures

networkArch = "ARVTDNNPA"; % Select the power amplifier neural network enableAnalyzeNetwork = false; % Enable to analyze the NN-PA model using analyzeNetwork inputLayerDim = 2*memDepth+(nonlinearDegree-1)*memDepth; switch networkArch case "ARVTDNNPA" NNPANet = arvtdnnpaModel(inputLayerDim); case "LSTMNNPA" NNPANet = lstmnnpaModel(inputLayerDim); case "BiLSTMNNPA" NNPANet = bilstmnnpaModel(inputLayerDim); case "GRUNNPA" NNPANet = grunnpaModel(inputLayerDim); end NNPANet.plot()

% Analyze the selected NN-PA architecture if enableAnalyzeNetwork NNPANetInfo = analyzeNetwork(NNPANet); end

#### Load Network Parameters

Create MatFile object for PANNModels.mat file which contains pre-trained network models and training parameters.

powerAmpModels = helperManagePAModels(true);

#### Training NN-PA

Set the memory depth and degree of non-linearity to 5 for the power amplifier in the Pre-processing Data section. See the Power Amplifier Characterization example for more details.

trainNow = false; % Enable to train the selected network saveToMAT = true; % Enable to save the trained model or computed performance metrics or both to MAT file if trainNow solverName = "adam"; % Select the solver for training miniBatchSize = 4096; % Mini-batch size for training numEpochs = 1000; % Number of epochs for training exeEnvironment = "auto"; % Select the execution environment lossFcn = "mse"; % MSE loss function enableVerbose = true; % Enable verbose to see the training progress printed trainingPlot = "none"; % Select "training-progress" to see dynamic plot of training numSamples = size(inputFeaturesVal, 1); iterationsPerEpoch = floor(numSamples/miniBatchSize); options = trainingOptions(solverName, ... MaxEpochs=numEpochs, ... MiniBatchSize=miniBatchSize, ... InitialLearnRate=2e-2, ... LearnRateDropFactor=0.5, ... LearnRateDropPeriod=50, ... LearnRateSchedule="piecewise", ... ValidationData={inputFeaturesVal,paOutputValR}, ... ValidationFrequency=10*iterationsPerEpoch, ... ValidationPatience=5, ... Shuffle="every-epoch", ... ExecutionEnvironment=exeEnvironment, ... Plots=trainingPlot, ... Verbose=enableVerbose, ... VerboseFrequency=5*iterationsPerEpoch);

Create layers for the selected network and train it.

% model training [NNPANet, trainInfo] = trainnet(inputFeaturesTrain, paOutputTrainR, NNPANet, lossFcn, options); if saveToMAT helperManagePAModels(... false, "SaveModel", powerAmpModels, ... networkArch, NNPANet, memDepth,... linearGainPA, nonlinearDegree, scalingFactorPA,... ofdmParams); end else NNPANet = powerAmpModels.(networkArch); end

### Test NN-PA

To test the NN-PA, pass the test signal through the NN-PA, memory polynomial PA, and the real PA . Examine the following:

Measure the normalized mean square error (NMSE) between outputs of the NN-PA and real PA.

Measure the adjacent channel power ratio (ACPR) at the output of the PA by using the

`comm.ACPR`

System object™.Measure the percent RMS error vector magnitude (EVM) by comparing the OFDM demodulation output to the 16-QAM modulated symbols by using the

`comm.EVM`

System object.Analyze the power spectrum of all output signals from the NN-PA and real PA by using the

`spectrumAnalyzer`

.

#### Initialization

Create dictionary of all the PA models

modelPAIndicesDic = helperIndexPAModels();

Initialization for spectrum plot

spectrumIn = zeros(length(paOutputTest), 4);

Load ACPR, NMSE, and EVM for all the models from "PANNModels.mat" using "powerAmpModels" MatFile object

nmse = powerAmpModels.NMSE; acpr = powerAmpModels.ACPR; evm = powerAmpModels.EVM;

#### Neural Network PA

Create test feature input data

inputProcPA = helperNNDPDInputPreprocessor(memDepth, nonlinearDegree); inputFeaturesTest = inputProcPA(paInputTest*scalingFactorPA); paOutputTestNorm = paOutputTest*scalingFactorPA;

Apply selected NN-PA to pre-processed test data

paOutputNNR = predict(NNPANet, inputFeaturesTest); paOutputNN = complex(paOutputNNR(:,1), paOutputNNR(:,2))/scalingFactorPA; spectrumIn(:, end) = paOutputNN; networkArchIdx = modelPAIndicesDic(networkArch); acpr(networkArchIdx) = helperACPR(paOutputNN, Fs, bw); [evm(networkArchIdx), rxQAMSymNN] = helperEVM(paOutputNN, [], ofdmParams); nmse(networkArchIdx) = helperNMSE(paOutputNN, paOutputTest);

#### Memory Polynomial PA Models

compute ACPR, EVM, NMSE and spectrum signals for Original PA signal, Memory Polynomial PA and Cross-term Memory Polynomial PA

[acpr, evm, nmse, spectrumIn] = helperShowMemoryPolynomialPAMetrics(modelPAIndicesDic, ... paOutputTest, paInputTest, ... nonlinearDegree, memDepth, ... Fs, bw, ofdmParams, ... acpr, evm, nmse, spectrumIn);

#### Power spectrum

Plot the power spectrum of selected NN-PA model along with actual PA and memory polynomial PAs output

spectrumPlotter = helperPASpectrumPlotter(networkArch, spectrumIn, ofdmParams.SampleRate);

Following image shows the spectrum of all NN-PAs along with non-learnable PA models.

#### Compare NMSE, ACPR and EVM

compute NMSE, ACPR and EVM for both non-learnable and learnable PA models

learnablePAs = ["ARVTDNNPA", "LSTMNNPA", "BiLSTMNNPA", "GRUNNPA"]; nonLearnablePAs = ["OriginalPA", "MemoryPolynomialPA", "CrosstermMemoryPolynomialPA"]; modelPANames = [nonLearnablePAs, learnablePAs]; varNames = {'ACPR(dB)','NMSE(dB)','EVM(%)'}; disp(table(acpr, nmse, evm, ... VariableNames=varNames, ... RowNames=modelPANames))

ACPR(dB) NMSE(dB) EVM(%) ________ ________ ______ OriginalPA -28.543 -Inf 7.0557 MemoryPolynomialPA -29.912 -27.306 6.3699 CrosstermMemoryPolynomialPA -29.864 -27.354 6.3579 ARVTDNNPA -28.663 -34.721 6.876 LSTMNNPA -28.677 -34.953 6.8663 BiLSTMNNPA -28.656 -34.952 6.8521 GRUNNPA -28.678 -34.95 6.8678

### Save Metrics

Save latest computed ACPR, NMSE, and EVM to "PANNModels.mat" using "powerAmpModels" MatFile object

if saveToMAT helperManagePAModels(... false, "SaveMetrics", powerAmpModels, ... acpr, evm, nmse); end

### Conclusion and Further Exploration

In this example, you design and train an NN-PA using ARVTDNN, LSTMNN, BiLSTMNN or GRUNN network architectures. You use 100MHz OFDM signals to excite the PA. All NN architectures can closely model the PA and results in better EVM, ACPR and NMSE performance.

Change the excitation signal BW or other characteristics and optimize hyperparameters for your own use case.

You can use the NN-PA model to design and test DPD algorithms. For more information on this use case, see the following examples:

### Appendix: NN-PA Models

#### ARVTDNNPA

An augmented real-valued time-delay neural network power amplifier (ARVTDNNPA)[1,2,3]. ARVTDNNPA has three fully connected layers with 0.01 scale leakyRelu activation and an augmented input.

function NNPANet = arvtdnnpaModel(inputLayerDim) %arvtdnnpaModel ARVTDNN PA model % LAYERS = arvtdnnpaModel(inputLayerDim) returns the layer structure for % ARVTDNN PA neural network % Copyright 2023-2024 The MathWorks, Inc. % Fully Connected linear1NumNeurons = 30; linear2NumNeurons = 30; linear3NumNeurons = 30; % LeakyRelu leakyRelu1Scale = 0.01; leakyRelu2Scale = 0.01; leakyRelu3Scale = 0.01; layers = [... featureInputLayer(inputLayerDim, Name='input') fullyConnectedLayer(linear1NumNeurons, Name='linear1') leakyReluLayer(leakyRelu1Scale, Name='leakyRelu1') fullyConnectedLayer(linear2NumNeurons, Name='linear2') leakyReluLayer(leakyRelu2Scale, Name='leakyRelu2') fullyConnectedLayer(linear3NumNeurons, Name='linear3') leakyReluLayer(leakyRelu3Scale, Name='leakyRelu3') fullyConnectedLayer(2, Name='linearOutput') ]; NNPANet = dlnetwork(layers); end

#### LSTMNNPA

A long short-term memory neural network power amplifier (LSTMNNPA)[1,4]. LSTMNNPA has, two lstm layers with each having 64 hidden units, two fully connected layers with each having tanh activation and an augmented input.

function NNPANet = lstmnnpaModel(inputLayerDim) %lstmnnpaModel LSTMNN PA model % LAYERS = lstmnnpaModel(inputLayerDim) returns the layer structure for % LSTMNN PA neural network % Copyright 2023-2024 The MathWorks, Inc. lstm1NumHiddenUnits = 64; lstm2NumHiddenUnits = 64; linear1NumNeurons = 30; linear2NumNeurons = 20; layers = [... featureInputLayer(inputLayerDim,Name='input') lstmLayer(lstm1NumHiddenUnits, Name='lstm1') lstmLayer(lstm2NumHiddenUnits, Name='lstm2') fullyConnectedLayer(linear1NumNeurons, Name='linear1') tanhLayer(Name='tanh1') fullyConnectedLayer(linear2NumNeurons, Name='linear2') tanhLayer(Name='tanh2') fullyConnectedLayer(2, Name='linearOutput') ]; NNPANet = dlnetwork(layers); end

#### BiLSTMNNPA

A bidirectional LSTM neural network power amplifier (BiLSTMNNPA)[1,5,6]. BiLSTMNNPA has two bilstm layers with each having 8 hidden units, two fully connected layers with each having tanh activation and an augmented input.

function NNPANet = bilstmnnpaModel(inputLayerDim) %bilstmnnpaModel BILSTMNN PA model % LAYERS = bilstmnnpaModel(inputLayerDim) returns the layer structure for % BILSTMNN PA neural network % Copyright 2023-2024 The MathWorks, Inc. bilstm1NumHiddenUnits = 8; bilstm2NumHiddenUnits = 8; linear1NumNeurons = 30; linear2NumNeurons = 20; layers = [... featureInputLayer(inputLayerDim,'Name','input') bilstmLayer(bilstm1NumHiddenUnits, Name='bilstm1') bilstmLayer(bilstm2NumHiddenUnits, Name='bilstm2') fullyConnectedLayer(linear1NumNeurons, Name='linear1') tanhLayer(Name='tanh1') fullyConnectedLayer(linear2NumNeurons, Name='linear2') tanhLayer(Name='tanh2') fullyConnectedLayer(2, Name='linearOutput') ]; NNPANet = dlnetwork(layers); end

#### GRUNNPA

A gated recurrent unit neural network power amplifier (GRUNNPA) [1,7]. GRUNNPA has two gru layers with each having 64 hidden units, two fully connected layers with tanh activation and an augmented input.

function NNPANet = grunnpaModel(inputLayerDim) %grunnpaModel GRUNN PA model % LAYERS = grunnpaModel(inputLayerDim) returns the layer structure for % GRUNN PA neural network % Copyright 2023-2024 The MathWorks, Inc. gru1NumHiddenUnits = 64; gru2NumHiddenUnits = 64; linear1NumNeurons = 20; linear2NumNeurons = 20; layers = [... featureInputLayer(inputLayerDim,'Name','input') gruLayer(gru1NumHiddenUnits, Name='gru1') gruLayer(gru2NumHiddenUnits, Name='gru2') fullyConnectedLayer(linear1NumNeurons, Name='linear1') tanhLayer(Name='tanh1') fullyConnectedLayer(linear2NumNeurons, Name='linear2') tanhLayer(Name='tanh2') fullyConnectedLayer(2, Name='linearOutput') ]; NNPANet = dlnetwork(layers); end

### References

[1] S. Yan, W. Shi and J. Wen, "Review of neural network technique for modeling PA memory effect," 2016 IEEE MTT-S International Conference on Numerical Electromagnetic and Multiphysics Modeling and Optimization (NEMO), Beijing, China, 2016, pp. 1-2, doi: 10.1109/NEMO.2016.7561675.

[2] C. Tarver, L. Jiang, A. Sefidi and J. R. Cavallaro, "Neural Network DPD via Backpropagation through a Neural Network Model of the PA," 2019 53rd Asilomar Conference on Signals, Systems, and Computers, Pacific Grove, CA, USA, 2019, pp. 358-362, doi: 10.1109/IEEECONF44664.2019.9048910.

[3] H. Yin, J. Cai and C. Yu, "Iteration Process Analysis of Real-Valued Time-Delay Neural Network with Different Activation Functions for Power Amplifier Behavioral Modeling," 2019 IEEE International Symposium on Radio-Frequency Integration Technology (RFIT), Nanjing, China, 2019, pp. 1-3, doi: 10.1109/RFIT.2019.8929142.

[4] P. Chen, S. Alsahali, A. Alt, J. Lees and P. J. Tasker, "Behavioral Modeling of GaN Power Amplifiers Using Long Short-Term Memory Networks," 2018 International Workshop on Integrated Nonlinear Microwave and Millimetre-wave Circuits (INMMIC), Brive La Gaillarde, France, 2018, pp. 1-3, doi: 10.1109/INMMIC.2018.8429984.

[5] Y. Khawam, O. Hammi, L. Albasha and H. Mir, "Behavioral Modeling of GaN Doherty Power Amplifiers Using Memoryless Polar Domain Functions and Deep Neural Networks," in IEEE Access, vol. 8, pp. 202707-202715, 2020, doi: 10.1109/ACCESS.2020.3036186.

[6] J. Sun, W. Shi, Z. Yang, J. Yang and G. Gui, "Behavioral Modeling and Linearization of Wideband RF Power Amplifiers Using BiLSTM Networks for 5G Wireless Systems," in IEEE Transactions on Vehicular Technology, vol. 68, no. 11, pp. 10348-10356, Nov. 2019, doi: 10.1109/TVT.2019.2925562.

[7] H. Wu, S. Huang, Y. Zeng, S. Ying and H. Lu, "A Lightweight Deep Neural Network for Wideband Power Amplifier Behavioral Modeling," 2021 7th International Conference on Computer and Communications (ICCC), Chengdu, China, 2021, pp. 1294-1298, doi: 10.1109/ICCC54389.2021.9674651.