neural network hyperparameter tuning
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Dimitri
am 6 Nov. 2018
Kommentiert: Shubham Baisthakur
am 8 Mär. 2023
Hello,
since there is no hyperparameter tuning function for neural network I wanted to try the bayesopt function. I tried to recreate the example here: https://de.mathworks.com/help/stats/bayesian-optimization-case-study.html. But this does not work. Is there a possibility to tune the number of hidden neurons? My code does not work...
[m,n] = size(Daten) ;
P = 0.7 ;
Training = Daten(1:round(P*m),:) ;
Testing = Daten(round(P*m)+1:end,:);
XTrain=Training(:,1:n-1);
YTrain=Training(:,n);
XTest=Testing(:,1:n-1);
YTest=Testing(:,n);
c = cvpartition(YTrain,'KFold',10);
hiddenLayerSize=optimizableVariable('hiddenLayerSize',[0,20]);
minfn = @(z)kfoldLoss(fitnet(XTrain,YTrain,'CVPartition',c,...
'hiddenLayerSize',z.hiddenLayerSize));
results = bayesopt(minfn,hiddenLayerSize,'IsObjectiveDeterministic',true,...
'AcquisitionFunctionName','expected-improvement-plus');
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Akzeptierte Antwort
Don Mathis
am 17 Nov. 2018
If you want a more complete workflow that also optimizes the learning rate, and tests the final model on your test set, you could try this:
% Make some data
Daten = rand(100, 3);
Daten(:,3) = Daten(:,1) + Daten(:,2) + .1*randn(100, 1); % Minimum asymptotic error is .1
[m,n] = size(Daten) ;
% Split into train and test
P = 0.7 ;
Training = Daten(1:round(P*m),:) ;
Testing = Daten(round(P*m)+1:end,:);
XTrain = Training(:,1:n-1);
YTrain = Training(:,n);
XTest = Testing(:,1:n-1);
YTest = Testing(:,n);
% Define a train/validation split to use inside the objective function
cv = cvpartition(numel(YTrain), 'Holdout', 1/3);
% Define hyperparameters to optimize
vars = [optimizableVariable('hiddenLayerSize', [1,20], 'Type', 'integer');
optimizableVariable('lr', [1e-3 1], 'Transform', 'log')];
% Optimize
minfn = @(T)kfoldLoss(XTrain', YTrain', cv, T.hiddenLayerSize, T.lr);
results = bayesopt(minfn, vars,'IsObjectiveDeterministic', false,...
'AcquisitionFunctionName', 'expected-improvement-plus');
T = bestPoint(results)
% Train final model on full training set using the best hyperparameters
net = feedforwardnet(T.hiddenLayerSize, 'traingd');
net.trainParam.lr = T.lr;
net = train(net, XTrain', YTrain');
% Evaluate on test set and compute final rmse
ypred = net(XTest');
finalrmse = sqrt(mean((ypred - YTest').^2))
function rmse = kfoldLoss(x, y, cv, numHid, lr)
% Train net.
net = feedforwardnet(numHid, 'traingd');
net.trainParam.lr = lr;
net = train(net, x(:,cv.training), y(:,cv.training));
% Evaluate on validation set and compute rmse
ypred = net(x(:, cv.test));
rmse = sqrt(mean((ypred - y(cv.test)).^2));
end
6 Kommentare
Saeed Magsi
am 27 Jan. 2022
Thank you @Don Mathisfor your solution. I tried this solution on my data but it has given me an error [" The Logical indices in position 2 contain a true value outside of the array bounds"]. I actually have two outputs. And this solution is not working on two outputs. It only works on single output. Can you help me in solving the problem. Thanks.
SAIF MEHDI
am 10 Aug. 2022
Most of these solvers are single objective functions. For your problem, you need a multi objective solver. I know two of them multiobjective GA and Pareto front. You would have to go through their help documents to understand the syntax.
Weitere Antworten (2)
Sean de Wolski
am 6 Nov. 2018
Bearbeitet: Sean de Wolski
am 6 Nov. 2018
This is nowhere near as easy as it should be. The shallow neural net infrastructure is old and uses row-major variables. This needs to be accounted for and you'll see it below with a ton of.' transposes. Second, you'll need to wrap around fitnet because it doesn't take in all of the options as name-value pairs like with the modern fit* functions in the statistics toolbox. Third, the training is non-deterministic unless you seed the rng yourself.
I don't understand the math behind using kfold cross validation with a neural net. Hence, I'll use holdout below which will reliably train and evaluate the network on an independent test sets.
Daten = rand(100, 3);
[m,n] = size(Daten) ;
P = 0.7 ;
Training = Daten(1:round(P*m),:) ;
Testing = Daten(round(P*m)+1:end,:);
XTrain=Training(:,1:n-1).'; % Note transposes
YTrain=Training(:,n).';
XTest=Testing(:,1:n-1).';
YTest=Testing(:,n).';
c = cvpartition(numel(YTrain),'Holdout', 0.25);
hiddenLayerSize=optimizableVariable('hiddenLayerSize',[1,20], 'Type', 'integer');
minfn = @(z)wrapFitNet(XTrain,YTrain, 'CVPartition', c, ...
'hiddenLayerSize',z.hiddenLayerSize);
results = bayesopt(minfn,hiddenLayerSize,'IsObjectiveDeterministic',false,...
'AcquisitionFunctionName','expected-improvement-plus');
Wrapper function
function cvrmse = wrapFitNet(x, y, varargin)
% Handle variable inputs
ip = inputParser;
ip.addParameter('hiddenLayerSize', 20);
ip.addParameter('CVPartition', cvpartition(numel(y),'Holdout', 0.10));
parse(ip, varargin{:});
cv = ip.Results.CVPartition;
hiddensz = ip.Results.hiddenLayerSize;
% Train net. You would adjust other hyper parameters here.
net = fitnet(hiddensz);
nets = train(net, x(:, cv.training.'), y(:, cv.training.'));
% Evaluate on test set and compute rmse
ypred = nets(x(:, cv.test.'));
cvrmse = sqrt(sum(ypred-y(cv.test.').^2)/numel(y(cv.test)));
end
Finally, if the only thing you want to optimize is hidden layer size, it may be easiest to just run a loop from 1:20 and try them all. Bayesian optimization really helps when you have many different parameters (trainfcn, etc.)
4 Kommentare
Raghu
am 29 Jun. 2021
I need a similar help with anfis can someone help me?
Shubham Baisthakur
am 8 Mär. 2023
Is it possible to extend this method to optimize the number of fully-connected layers as well?
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