incrementalLearner

Convert binary classification support vector machine (SVM) model to incremental learner

Since R2020b

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Syntax

IncrementalMdl = incrementalLearner(Mdl)
IncrementalMdl = incrementalLearner(Mdl,Name,Value)

Description

IncrementalMdl = incrementalLearner(Mdl) returns a binary classification linear model for incremental learning, IncrementalMdl, using the traditionally trained linear SVM model object or SVM model template object in Mdl.

If you specify a traditionally trained model, then its property values reflect the knowledge gained from Mdl (parameters and hyperparameters of the model). Therefore, IncrementalMdl can predict labels given new observations, and it is warm, meaning that its predictive performance is tracked.

example

IncrementalMdl = incrementalLearner(Mdl,Name,Value) uses additional options specified by one or more name-value arguments. Some options require you to train IncrementalMdl before its predictive performance is tracked. For example, 'MetricsWarmupPeriod',50,'MetricsWindowSize',100 specifies a preliminary incremental training period of 50 observations before performance metrics are tracked, and specifies processing 100 observations before updating the window performance metrics.

example

Examples

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Open Live Script

Train an SVM model by using fitcsvm, and then convert it to an incremental learner.

Load and Preprocess Data

Load the human activity data set.

load humanactivity

For details on the data set, enter Description at the command line.

Responses can be one of five classes: Sitting, Standing, Walking, Running, or Dancing. Dichotomize the response by identifying whether the subject is moving (actid > 2). 

Y = actid > 2;

Train SVM Model

Fit an SVM model to the entire data set. Discard the support vectors (Alpha) from the model so that the software uses the linear coefficients (Beta) for prediction.

TTMdl = fitcsvm(feat,Y);
TTMdl = discardSupportVectors(TTMdl)
TTMdl = 
  ClassificationSVM
             ResponseName: 'Y'
    CategoricalPredictors: []
               ClassNames: [0 1]
           ScoreTransform: 'none'
          NumObservations: 24075
                     Beta: [60×1 double]
                     Bias: -6.4280
         KernelParameters: [1×1 struct]
           BoxConstraints: [24075×1 double]
          ConvergenceInfo: [1×1 struct]
          IsSupportVector: [24075×1 logical]
                   Solver: 'SMO'


  Properties, Methods

TTMdl is a ClassificationSVM model object representing a traditionally trained SVM model.

Convert Trained Model

Convert the traditionally trained SVM model to a binary classification linear model for incremental learning.

IncrementalMdl = incrementalLearner(TTMdl) 
IncrementalMdl = 
  incrementalClassificationLinear

            IsWarm: 1
           Metrics: [1×2 table]
        ClassNames: [0 1]
    ScoreTransform: 'none'
              Beta: [60×1 double]
              Bias: -6.4280
           Learner: 'svm'


  Properties, Methods

IncrementalMdl is an incrementalClassificationLinear model object prepared for incremental learning using SVM.

  • The incrementalLearner function Initializes the incremental learner by passing learned coefficients to it, along with other information TTMdl extracted from the training data.

  • IncrementalMdl is warm (IsWarm is 1), which means that incremental learning functions can start tracking performance metrics.

  • The incrementalLearner function specifies to train the model using the adaptive scale-invariant solver, whereas fitcsvm trained TTMdl using the SMO solver.

Predict Responses

An incremental learner created from converting a traditionally trained model can generate predictions without further processing.

Predict classification scores for all observations using both models.

[~,ttscores] = predict(TTMdl,feat);
[~,ilcores] = predict(IncrementalMdl,feat);
compareScores = norm(ttscores(:,1) - ilcores(:,1))
compareScores = 
0

The difference between the scores generated by the models is 0.

Open Live Script

The default solver is the adaptive scale-invariant solver. If you specify this solver, you do not need to tune any parameters for training. However, if you specify either the standard SGD or ASGD solver instead, you can also specify an estimation period, during which the incremental fitting functions tune the learning rate.

Load the human activity data set.

load humanactivity

For details on the data set, enter Description at the command line.

Responses can be one of five classes: Sitting, Standing, Walking, Running, and Dancing. Dichotomize the response by identifying whether the subject is moving (actid > 2).

Y = actid > 2;

Randomly split the data in half: the first half for training a model traditionally, and the second half for incremental learning.

n = numel(Y);

rng(1) % For reproducibility
cvp = cvpartition(n,'Holdout',0.5);
idxtt = training(cvp);
idxil = test(cvp);

% First half of data 
Xtt = feat(idxtt,:);
Ytt = Y(idxtt);

% Second half of data
Xil = feat(idxil,:);
Yil = Y(idxil);

Fit an SVM model to the first half of the data. Standardize the predictor data by setting 'Standardize',true.

TTMdl = fitcsvm(Xtt,Ytt,'Standardize',true);

The Mu and Sigma properties of TTMdl contain the predictor data sample means and standard deviations, respectively.

Suppose that the distribution of the predictors is not expected to change in the future. Convert the traditionally trained SVM model to a binary classification linear model for incremental learning. Specify the standard SGD solver and an estimation period of 2000 observations (the default is 1000 when a learning rate is required).

IncrementalMdl = incrementalLearner(TTMdl,'Solver','sgd','EstimationPeriod',2000);

IncrementalMdl is an incrementalClassificationLinear model object. Because the predictor data of TTMdl is standardized (TTMdl.Mu and TTMdl.Sigma are nonempty), incrementalLearner prepares incremental learning functions to standardize supplied predictor data by using the previously learned moments (stored in IncrementalMdl.Mu and IncrementalMdl.Sigma).

Fit the incremental model to the second half of the data by using the fit function. At each iteration:

  • Simulate a data stream by processing 10 observations at a time.

  • Overwrite the previous incremental model with a new one fitted to the incoming observations.

  • Store the initial learning rate and β1 to see how the coefficients and rate evolve during training.

% Preallocation
nil = numel(Yil);
numObsPerChunk = 10;
nchunk = floor(nil/numObsPerChunk);
learnrate = [IncrementalMdl.LearnRate; zeros(nchunk,1)];
beta1 = [IncrementalMdl.Beta(1); zeros(nchunk,1)];

% Incremental fitting
for j = 1:nchunk
    ibegin = min(nil,numObsPerChunk*(j-1) + 1);
    iend   = min(nil,numObsPerChunk*j);
    idx = ibegin:iend;
    IncrementalMdl = fit(IncrementalMdl,Xil(idx,:),Yil(idx));
    beta1(j + 1) = IncrementalMdl.Beta(1);
    learnrate(j + 1) = IncrementalMdl.LearnRate;
end

IncrementalMdl is an incrementalClassificationLinear model object trained on all the data in the stream.

To see how the initial learning rate and β1 evolve during training, plot them on separate tiles. 

t = tiledlayout(2,1);
nexttile
plot(beta1)
ylabel('\beta_1')
xline(IncrementalMdl.EstimationPeriod/numObsPerChunk,'r-.')
nexttile
plot(learnrate)
ylabel('Initial Learning Rate')
xline(IncrementalMdl.EstimationPeriod/numObsPerChunk,'r-.')
xlabel(t,'Iteration')

Figure contains 2 axes objects. Axes object 1 with ylabel \beta_1 contains 2 objects of type line, constantline. Axes object 2 with ylabel Initial Learning Rate contains 2 objects of type line, constantline.

The initial learning rate jumps from 0.7 to its autotuned value after the estimation period. During training, the software uses a learning rate that gradually decays from the initial value specified in the LearnRateSchedule property of IncrementalMdl.

Because fit does not fit the model to the streaming data during the estimation period, β1 is constant for the first 200 iterations (2000 observations). Then, β1 changes during incremental fitting.

Open Live Script

Use a trained SVM model to initialize an incremental learner. Prepare the incremental learner by specifying a metrics warm-up period, during which the updateMetricsAndFit function only fits the model. Specify a metrics window size of 500 observations.

Load the human activity data set.

load humanactivity

For details on the data set, enter Description at the command line

Responses can be one of five classes: Sitting, Standing, Walking, Running, and Dancing. Dichotomize the response by identifying whether the subject is moving (actid > 2).

Y = actid > 2;

Because the data set is grouped by activity, shuffle it to reduce bias. Then, randomly split the data in half: the first half for training a model traditionally, and the second half for incremental learning.

n = numel(Y);

rng(1) % For reproducibility
cvp = cvpartition(n,'Holdout',0.5);
idxtt = training(cvp);
idxil = test(cvp);
shuffidx = randperm(n);
X = feat(shuffidx,:);
Y = Y(shuffidx);

% First half of data
Xtt = X(idxtt,:);
Ytt = Y(idxtt);

% Second half of data
Xil = X(idxil,:);
Yil = Y(idxil);

Fit an SVM model to the first half of the data.

TTMdl = fitcsvm(Xtt,Ytt);

Convert the traditionally trained SVM model to a binary classification linear model for incremental learning. Specify the following:

  • A performance metrics warm-up period of 2000 observations

  • A metrics window size of 500 observations

  • Use of classification error and hinge loss to measure the performance of the model

IncrementalMdl = incrementalLearner(TTMdl,'MetricsWarmupPeriod',2000,'MetricsWindowSize',500,...
    'Metrics',["classiferror" "hinge"]);

Fit the incremental model to the second half of the data by using the updateMetricsAndFit function. At each iteration:

  • Simulate a data stream by processing 20 observations at a time.

  • Overwrite the previous incremental model with a new one fitted to the incoming observations.

  • Store β1, the cumulative metrics, and the window metrics to see how they evolve during incremental learning.

% Preallocation
nil = numel(Yil);
numObsPerChunk = 20;
nchunk = ceil(nil/numObsPerChunk);
ce = array2table(zeros(nchunk,2),'VariableNames',["Cumulative" "Window"]);
hinge = array2table(zeros(nchunk,2),'VariableNames',["Cumulative" "Window"]);
beta1 = [IncrementalMdl.Beta(1); zeros(nchunk,1)];

% Incremental fitting
for j = 1:nchunk
    ibegin = min(nil,numObsPerChunk*(j-1) + 1);
    iend   = min(nil,numObsPerChunk*j);
    idx = ibegin:iend;    
    IncrementalMdl = updateMetricsAndFit(IncrementalMdl,Xil(idx,:),Yil(idx));
    ce{j,:} = IncrementalMdl.Metrics{"ClassificationError",:};
    hinge{j,:} = IncrementalMdl.Metrics{"HingeLoss",:};
    beta1(j + 1) = IncrementalMdl.Beta(1);
end

IncrementalMdl is an incrementalClassificationLinear model object trained on all the data in the stream. During incremental learning and after the model is warmed up, updateMetricsAndFit checks the performance of the model on the incoming observations, and then fits the model to those observations.

To see how the performance metrics and β1 evolve during training, plot them on separate tiles.

t = tiledlayout(3,1);
nexttile
plot(beta1)
ylabel('\beta_1')
xlim([0 nchunk]);
xline(IncrementalMdl.MetricsWarmupPeriod/numObsPerChunk,'r-.');
nexttile
h = plot(ce.Variables);
xlim([0 nchunk]);
ylabel('Classification Error')
xline(IncrementalMdl.MetricsWarmupPeriod/numObsPerChunk,'r-.');
legend(h,ce.Properties.VariableNames,'Location','northwest')
nexttile
h = plot(hinge.Variables);
xlim([0 nchunk]);
ylabel('Hinge Loss')
xline(IncrementalMdl.MetricsWarmupPeriod/numObsPerChunk,'r-.');
legend(h,hinge.Properties.VariableNames,'Location','northwest')
xlabel(t,'Iteration')

Figure contains 3 axes objects. Axes object 1 with ylabel \beta_1 contains 2 objects of type line, constantline. Axes object 2 with ylabel Classification Error contains 3 objects of type line, constantline. These objects represent Cumulative, Window. Axes object 3 with ylabel Hinge Loss contains 3 objects of type line, constantline. These objects represent Cumulative, Window.

The plot suggests that updateMetricsAndFit does the following:

  • Fit β1 during all incremental learning iterations.

  • Compute the performance metrics after the metrics warm-up period only.

  • Compute the cumulative metrics during each iteration.

  • Compute the window metrics after processing 500 observations (25 iterations).

Input Arguments

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Traditionally trained linear SVM model or SVM model template, specified as a model object returned by its training or processing function.

Model Object or Template ObjectTraining or Processing Function
ClassificationSVM model objectfitcsvm
CompactClassificationSVM model objectfitcsvm or compact
SVM model template objecttemplateSVM

Note

  • Incremental learning functions support only numeric input predictor data. If Mdl was trained on categorical data, you must prepare an encoded version of the categorical data to use incremental learning functions. Use dummyvar to convert each categorical variable to a numeric matrix of dummy variables. Then, concatenate all dummy variable matrices and any other numeric predictors, in the same way that the training function encodes categorical data. For more details, see Dummy Variables.

  • If Mdl is a SVM model template object, incrementalLearner determines whether to standardize the predictor variables based on the Standardize property of the model template object. For more information, see Standardize Data.

Name-Value Arguments

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Specify optional pairs of arguments as Name1=Value1,...,NameN=ValueN, where Name is the argument name and Value is the corresponding value. Name-value arguments must appear after other arguments, but the order of the pairs does not matter.

Before R2021a, use commas to separate each name and value, and enclose Name in quotes.

Example: 'Solver','scale-invariant','MetricsWindowSize',100 specifies the adaptive scale-invariant solver for objective optimization, and specifies processing 100 observations before updating the window performance metrics.

General Options

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Objective function minimization technique, specified as a value in this table.

ValueDescriptionNotes
'scale-invariant'

Adaptive scale-invariant solver for incremental learning [1]

  • This algorithm is parameter free and can adapt to differences in predictor scales. Try this algorithm before using SGD or ASGD.

  • To shuffle an incoming chunk of data before the fit function fits the model, set Shuffle to true.

'sgd'Stochastic gradient descent (SGD) [3][2]

  • To train effectively with SGD, standardize the data and specify adequate values for hyperparameters using options listed in SGD and ASGD Solver Options.

  • The fit function always shuffles an incoming chunk of data before fitting the model.

'asgd'Average stochastic gradient descent (ASGD) [4]

  • To train effectively with ASGD, standardize the data and specify adequate values for hyperparameters using options listed in SGD and ASGD Solver Options.

  • The fit function always shuffles an incoming chunk of data before fitting the model.

The linear model for incremental learning (IncrementalMdl) does not support the solver used to train the traditionally trained linear SVM model Mdl or the solver specified in the SVM model template object Mdl. By default, the incrementalLearner function sets IncrementalMdl to use the adaptive scale-invariant solver ('scale-invariant').

Example: 'Solver','sgd'

Data Types: char | string

Number of observations processed by the incremental model to estimate hyperparameters before training or tracking performance metrics, specified as the comma-separated pair consisting of 'EstimationPeriod' and a nonnegative integer.

Note

  • If Mdl is prepared for incremental learning (all hyperparameters required for training are specified), incrementalLearner forces EstimationPeriod to 0.

  • If Mdl is not prepared for incremental learning, incrementalLearner sets EstimationPeriod to 1000.

For more details, see Estimation Period.

Example: 'EstimationPeriod',100

Data Types: single | double

SGD and ASGD Solver Options

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Mini-batch size, specified as the comma-separated pair consisting of 'BatchSize' and a positive integer. At each learning cycle during training, incrementalLearner uses BatchSize observations to compute the subgradient.

The number of observations for the last mini-batch (last learning cycle in each function call of fit or updateMetricsAndFit) can be smaller than BatchSize. For example, if you supply 25 observations to fit or updateMetricsAndFit, the function uses 10 observations for the first two learning cycles and uses 5 observations for the last learning cycle.

Example: 'BatchSize',1

Data Types: single | double

Ridge (L2) regularization term strength, specified as the comma-separated pair consisting of 'Lambda' and a nonnegative scalar.

Example: 'Lambda',0.01

Data Types: single | double

Initial learning rate, specified as the comma-separated pair consisting of 'LearnRate' and 'auto' or a positive scalar. LearnRate controls the optimization step size by scaling the objective subgradient.

The learning rate controls the optimization step size by scaling the objective subgradient. LearnRate specifies an initial value for the learning rate, and LearnRateSchedule determines the learning rate for subsequent learning cycles.

When you specify 'auto':

  • The initial learning rate is 0.7.

  • If EstimationPeriod > 0, fit and updateMetricsAndFit change the rate to 1/sqrt(1+max(sum(X.^2,obsDim))) at the end of EstimationPeriod. When the observations are the columns of the predictor data X collected during the estimation period, the obsDim value is 1; otherwise, the value is 2.

Example: 'LearnRate',0.001

Data Types: single | double | char | string

Learning rate schedule, specified as the comma-separated pair consisting of 'LearnRateSchedule' and a value in this table, where LearnRate specifies the initial learning rate ɣ0.

ValueDescription
'constant'The learning rate is ɣ0 for all learning cycles.
'decaying'

The learning rate at learning cycle t is

γt=γ0(1+λγ0t)c.

  • λ is the value of Lambda.

  • If Solver is 'sgd', then c = 1.

  • If Solver is 'asgd', then c is 0.75 [4].

Example: 'LearnRateSchedule','constant'

Data Types: char | string

Adaptive Scale-Invariant Solver Options

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Flag for shuffling the observations in the batch at each iteration, specified as the comma-separated pair consisting of 'Shuffle' and a value in this table.

ValueDescription
trueThe software shuffles an incoming chunk of data before the fit function fits the model. This action reduces bias induced by the sampling scheme.
falseThe software processes the data in the order received.

Example: 'Shuffle',false

Data Types: logical

Performance Metrics Options

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Model performance metrics to track during incremental learning with the updateMetrics or updateMetricsAndFit function, specified as a built-in loss function name, string vector of names, function handle (@metricName), structure array of function handles, or cell vector of names, function handles, or structure arrays.

The following table lists the built-in loss function names. You can specify more than one by using a string vector.

NameDescription
"binodeviance"Binomial deviance
"classiferror"Classification error
"exponential"Exponential loss
"hinge"Hinge loss
"logit"Logistic loss
"quadratic"Quadratic loss

For more details on the built-in loss functions, see loss.

Example: 'Metrics',["classiferror" "hinge"]

To specify a custom function that returns a performance metric, use function handle notation. The function must have this form:

metric = customMetric(C,S)

  • The output argument metric is an n-by-1 numeric vector, where each element is the loss of the corresponding observation in the data processed by the incremental learning functions during a learning cycle.

  • You specify the function name (customMetric).

  • C is an n-by-2 logical matrix with rows indicating the class to which the corresponding observation belongs. The column order corresponds to the class order in the model for incremental learning. Create C by setting C(p,q) = 1, if observation p is in class q, for each observation in the specified data. Set the other element in row p to 0.

  • S is an n-by-2 numeric matrix of predicted classification scores. S is similar to the score output of predict, where rows correspond to observations in the data, and the column order corresponds to the class order in the model for incremental learning. S(p,q) is the classification score of observation p being classified in class q.

To specify multiple custom metrics and assign a custom name to each, use a structure array. To specify a combination of built-in and custom metrics, use a cell vector.

Example: 'Metrics',struct('Metric1',@customMetric1,'Metric2',@customMetric2)

Example: 'Metrics',{@customMetric1 @customMetric2 'logit' struct('Metric3',@customMetric3)}

updateMetrics and updateMetricsAndFit store specified metrics in a table in the property IncrementalMdl.Metrics. The data type of Metrics determines the row names of the table.

'Metrics' Value Data TypeDescription of Metrics Property Row NameExample
String or character vectorName of corresponding built-in metricRow name for "classiferror" is "ClassificationError"
Structure arrayField nameRow name for struct('Metric1',@customMetric1) is "Metric1"
Function handle to function stored in a program fileName of functionRow name for @customMetric is "customMetric"
Anonymous functionCustomMetric_j, where j is metric j in MetricsRow name for @(C,S)customMetric(C,S)... is CustomMetric_1

For more details on performance metrics options, see Performance Metrics.

Data Types: char | string | struct | cell | function_handle

Number of observations the incremental model must be fit to before it tracks performance metrics in its Metrics property, specified as a nonnegative integer. The incremental model is warm after incremental fitting functions fit (EstimationPeriod + MetricsWarmupPeriod) observations to the incremental model.

For more details on performance metrics options, see Performance Metrics.

Example: 'MetricsWarmupPeriod',50

Data Types: single | double

Number of observations to use to compute window performance metrics, specified as a positive integer.

For more details on performance metrics options, see Performance Metrics.

Example: 'MetricsWindowSize',100

Data Types: single | double

Output Arguments

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Binary classification linear model for incremental learning, returned as an incrementalClassificationLinear model object. IncrementalMdl is also configured to generate predictions given new data (see predict).

  • If you specify a traditionally trained model object in Mdl, incrementalLearner passes the values of the Mdl properties to corresponding properties of IncrementalMdl to initialize IncrementalMdl for incremental learning.

    PropertyDescription
    BetaScaled linear model coefficients, Mdl.Beta/Mdl.KernelParameters.Scale, a numeric vector
    BiasModel intercept, a numeric scalar
    ClassNamesClass labels for binary classification, two-element list
    MuPredictor variable means, a numeric vector
    NumPredictorsNumber of predictors, a positive integer
    PriorPrior class label distribution, a numeric vector
    SigmaPredictor variable standard deviations, a numeric vector
    ScoreTransformScore transformation function, a function name or function handle

    Note that incrementalLearner does not use the Cost property of the traditionally trained model in Mdl because incrementalClassificationLinear does not support this property.

More About

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Algorithms

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References

[1] Kempka, Michał, Wojciech Kotłowski, and Manfred K. Warmuth. "Adaptive Scale-Invariant Online Algorithms for Learning Linear Models." Preprint, submitted February 10, 2019. https://arxiv.org/abs/1902.07528.

[2] Langford, J., L. Li, and T. Zhang. “Sparse Online Learning Via Truncated Gradient.” J. Mach. Learn. Res., Vol. 10, 2009, pp. 777–801.

[3] Shalev-Shwartz, S., Y. Singer, and N. Srebro. “Pegasos: Primal Estimated Sub-Gradient Solver for SVM.” Proceedings of the 24th International Conference on Machine Learning, ICML ’07, 2007, pp. 807–814.

[4] Xu, Wei. “Towards Optimal One Pass Large Scale Learning with Averaged Stochastic Gradient Descent.” CoRR, abs/1107.2490, 2011.

Version History

Introduced in R2020b

See Also

Objects

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