loss

Classification loss for naive Bayes classifier

Syntax

L = loss(Mdl,tbl,ResponseVarName)

L = loss(Mdl,tbl,Y)

L = loss(Mdl,X,Y)

L = loss(___,Name,Value)

Description

L = loss(Mdl,tbl,ResponseVarName) returns the Classification Loss, a scalar representing how well the trained naive Bayes classifier Mdl classifies the predictor data in table tbl compared to the true class labels in tbl.ResponseVarName.

loss normalizes the class probabilities in tbl.ResponseVarName to the prior class probabilities used by fitcnb for training, which are stored in the Prior property of Mdl.

L = loss(Mdl,tbl,Y) returns the classification loss for the predictor data in table tbl and the true class labels in Y.

example

L = loss(Mdl,X,Y) returns the classification loss based on the predictor data in matrix X compared to the true class labels in Y.

example

L = loss(___,Name,Value) specifies options using one or more name-value pair arguments in addition to any of the input argument combinations in previous syntaxes. For example, you can specify the loss function and the classification weights.

Examples

collapse all

Determine Test Sample Classification Loss of Naive Bayes Classifier

Open Live Script

Determine the test sample classification error (loss) of a naive Bayes classifier. When you compare the same type of loss among many models, a lower loss indicates a better predictive model.

Load the fisheriris data set. Create X as a numeric matrix that contains four petal measurements for 150 irises. Create Y as a cell array of character vectors that contains the corresponding iris species.

load fisheriris
X = meas;
Y = species;
rng('default')  % for reproducibility

Randomly partition observations into a training set and a test set with stratification, using the class information in Y. Specify a 30% holdout sample for testing.

cv = cvpartition(Y,'HoldOut',0.30);

Extract the training and test indices.

trainInds = training(cv);
testInds = test(cv);

Specify the training and test data sets.

XTrain = X(trainInds,:);
YTrain = Y(trainInds);
XTest = X(testInds,:);
YTest = Y(testInds);

Train a naive Bayes classifier using the predictors XTrain and class labels YTrain. A recommended practice is to specify the class names. fitcnb assumes that each predictor is conditionally and normally distributed.

Mdl = fitcnb(XTrain,YTrain,'ClassNames',{'setosa','versicolor','virginica'})

Mdl = 
  ClassificationNaiveBayes
              ResponseName: 'Y'
     CategoricalPredictors: []
                ClassNames: {'setosa'  'versicolor'  'virginica'}
            ScoreTransform: 'none'
           NumObservations: 105
         DistributionNames: {'normal'  'normal'  'normal'  'normal'}
    DistributionParameters: {3x4 cell}


  Properties, Methods

Mdl is a trained ClassificationNaiveBayes classifier.

Determine how well the algorithm generalizes by estimating the test sample classification error.

L = loss(Mdl,XTest,YTest)

L = 0.0444

The naive Bayes classifier misclassifies approximately 4% of the test sample.

You might decrease the classification error by specifying better predictor distributions when you train the classifier with fitcnb.

Determine Test Sample Logit Loss of Naive Bayes Classifier

Open Live Script

load fisheriris
X = meas;
Y = species;
rng('default')  % for reproducibility

Randomly partition observations into a training set and a test set with stratification, using the class information in Y. Specify a 30% holdout sample for testing.

cv = cvpartition(Y,'HoldOut',0.30);

Extract the training and test indices.

trainInds = training(cv);
testInds = test(cv);

Specify the training and test data sets.

XTrain = X(trainInds,:);
YTrain = Y(trainInds);
XTest = X(testInds,:);
YTest = Y(testInds);

Mdl = fitcnb(XTrain,YTrain,'ClassNames',{'setosa','versicolor','virginica'});

Mdl is a trained ClassificationNaiveBayes classifier.

Determine how well the algorithm generalizes by estimating the test sample logit loss.

L = loss(Mdl,XTest,YTest,'LossFun','logit')

L = 0.3359

The logit loss is approximately 0.34.

Input Arguments

collapse all

`Mdl` — Naive Bayes classification model
`ClassificationNaiveBayes` model object | `CompactClassificationNaiveBayes` model object

Naive Bayes classification model, specified as a ClassificationNaiveBayes model object or CompactClassificationNaiveBayes model object returned by fitcnb or compact, respectively.

`tbl` — Sample data
table

Sample data used to train the model, specified as a table. Each row of tbl corresponds to one observation, and each column corresponds to one predictor variable. tbl must contain all the predictors used to train Mdl. Multicolumn variables and cell arrays other than cell arrays of character vectors are not allowed. Optionally, tbl can contain additional columns for the response variable and observation weights.

If you train Mdl using sample data contained in a table, then the input data for loss must also be in a table.

`ResponseVarName` — Response variable name
name of a variable in `tbl`

Response variable name, specified as the name of a variable in tbl.

You must specify ResponseVarName as a character vector or string scalar. For example, if the response variable y is stored as tbl.y, then specify it as 'y'. Otherwise, the software treats all columns of tbl, including y, as predictors.

If tbl contains the response variable used to train Mdl, then you do not need to specify ResponseVarName.

The response variable must be a categorical, character, or string array, logical or numeric vector, or cell array of character vectors. If the response variable is a character array, then each element must correspond to one row of the array.

Data Types: char | string

`X` — Predictor data
numeric matrix

Predictor data, specified as a numeric matrix.

Each row of X corresponds to one observation (also known as an instance or example), and each column corresponds to one variable (also known as a feature). The variables in the columns of X must be the same as the variables that trained the Mdl classifier.

The length of Y and the number of rows of X must be equal.

Data Types: double | single

`Y` — Class labels
categorical array | character array | string array | logical vector | numeric vector | cell array of character vectors

Class labels, specified as a categorical, character, or string array, logical or numeric vector, or cell array of character vectors. Y must have the same data type as Mdl.ClassNames. (The software treats string arrays as cell arrays of character vectors.)

The length of Y must be equal to the number of rows of tbl or X.

Name-Value Pair Arguments

Specify optional comma-separated pairs of Name,Value arguments. Name is the argument name and Value is the corresponding value. Name must appear inside quotes. You can specify several name and value pair arguments in any order as Name1,Value1,...,NameN,ValueN.

Example: loss(Mdl,tbl,Y,'Weights',W) weighs the observations in each row of tbl using the corresponding weight in each row of the variable W.

`'LossFun'` — Loss function
`'classiferror'` (default) | `'binodeviance'` | `'exponential'` | `'hinge'` | `'logit'` | `'mincost'` | `'quadratic'` | function handle

Loss function, specified as the comma-separated pair consisting of 'LossFun' and a built-in loss function name or function handle.

The following table lists the available loss functions. Specify one using its corresponding character vector or string scalar.

Value	Description
`'binodeviance'`	Binomial deviance
`'classiferror'`	Classification error
`'exponential'`	Exponential
`'hinge'`	Hinge
`'logit'`	Logistic
`'mincost'`	Minimal expected misclassification cost (for classification scores that are posterior probabilities)
`'quadratic'`	Quadratic

'mincost' is appropriate for classification scores that are posterior probabilities. Naive Bayes models return posterior probabilities as classification scores by default (see predict).

Specify your own function using function handle notation.
Suppose that n is the number of observations in X and K is the number of distinct classes (numel(Mdl.ClassNames), where Mdl is the input model). Your function must have this signature
```
lossvalue = lossfun(C,S,W,Cost)
```
where:
- The output argument lossvalue is a scalar.
- You specify the function name (lossfun).
- C is an n-by-K logical matrix with rows indicating the class to which the corresponding observation belongs. The column order corresponds to the class order in Mdl.ClassNames.
  Create C by setting C(p,q) = 1 if observation p is in class q, for each row. Set all other elements of row p to 0.
- S is an n-by-K numeric matrix of classification scores. The column order corresponds to the class order in Mdl.ClassNames. S is a matrix of classification scores, similar to the output of predict.
- W is an n-by-1 numeric vector of observation weights. If you pass W, the software normalizes the weights to sum to 1.
- Cost is a K-by-K numeric matrix of misclassification costs. For example, Cost = ones(K) - eye(K) specifies a cost of 0 for correct classification and 1 for misclassification.
Specify your function using 'LossFun',@lossfun.

For more details on loss functions, see Classification Loss.

Data Types: char | string | function_handle

`'Weights'` — Observation weights
`ones(size(X,1),1)` (default) | numeric vector | name of a variable in `tbl`

Observation weights, specified as a numeric vector or the name of a variable in tbl. The software weighs the observations in each row of X or tbl with the corresponding weights in Weights.

If you specify Weights as a numeric vector, then the size of Weights must be equal to the number of rows of X or tbl.

If you specify Weights as the name of a variable in tbl, then the name must be a character vector or string scalar. For example, if the weights are stored as tbl.w, then specify Weights as 'w'. Otherwise, the software treats all columns of tbl, including tbl.w, as predictors.

If you do not specify a loss function, then the software normalizes Weights to add up to 1.

Data Types: double | char | string

Output Arguments

collapse all

`L` — Classification loss
scalar

Classification loss, returned as a scalar. L is a generalization or resubstitution quality measure. Its interpretation depends on the loss function and weighting scheme; in general, better classifiers yield smaller loss values.

More About

collapse all

Classification Loss

Classification loss functions measure the predictive inaccuracy of classification models. When you compare the same type of loss among many models, a lower loss indicates a better predictive model.

Consider the following scenario.

L is the weighted average classification loss.
n is the sample size.
For binary classification:
- y_j is the observed class label. The software codes it as –1 or 1, indicating the negative or positive class, respectively.
- f(X_j) is the raw classification score for observation (row) j of the predictor data X.
- m_j = y_jf(X_j) is the classification score for classifying observation j into the class corresponding to y_j. Positive values of m_j indicate correct classification and do not contribute much to the average loss. Negative values of m_j indicate incorrect classification and contribute significantly to the average loss.
For algorithms that support multiclass classification (that is, K ≥ 3):
- y_j^* is a vector of K – 1 zeros, with 1 in the position corresponding to the true, observed class y_j. For example, if the true class of the second observation is the third class and K = 4, then y₂^* = [0 0 1 0]′. The order of the classes corresponds to the order in the ClassNames property of the input model.
- f(X_j) is the length K vector of class scores for observation j of the predictor data X. The order of the scores corresponds to the order of the classes in the ClassNames property of the input model.
- m_j = y_j^*′f(X_j). Therefore, m_j is the scalar classification score that the model predicts for the true, observed class.
The weight for observation j is w_j. The software normalizes the observation weights so that they sum to the corresponding prior class probability. The software also normalizes the prior probabilities so they sum to 1. Therefore,

$\sum_{j = 1}^{n} w_{j} = 1.$

Given this scenario, the following table describes the supported loss functions that you can specify by using the 'LossFun' name-value pair argument.

Loss Function	Value of `LossFun`	Equation
Binomial deviance	`'binodeviance'`	$L = \sum_{j = 1}^{n} w_{j} \log {1 + \exp [- 2 m_{j}]} .$
Exponential loss	`'exponential'`	$L = \sum_{j = 1}^{n} w_{j} \exp (- m_{j}) .$
Classification error	`'classiferror'`	$L = \sum_{j = 1}^{n} w_{j} I {{\hat{y}}_{j} \neq y_{j}} .$ The classification error is the weighted fraction of misclassified observations where ${\hat{y}}_{j}$ is the class label corresponding to the class with the maximal posterior probability. I{x} is the indicator function.
Hinge loss	`'hinge'`	$L = \sum_{j = 1}^{n} w_{j} \max {0, 1 - m_{j}} .$
Logit loss	`'logit'`	$L = \sum_{j = 1}^{n} w_{j} \log (1 + \exp (- m_{j})) .$
Minimal cost	`'mincost'`	The software computes the weighted minimal cost using this procedure for observations j = 1,...,n. Estimate the 1-by-K vector of expected classification costs for observation j: $γ_{j} = f {(X_{j})}^{'} C .$ f(X_j) is the column vector of class posterior probabilities for binary and multiclass classification. C is the cost matrix stored by the input model in the `Cost` property. For observation j, predict the class label corresponding to the minimum expected classification cost: ${\hat{y}}_{j} = \min_{j = 1, ..., K} (γ_{j}) .$ Using C, identify the cost incurred (c_j) for making the prediction. The weighted, average, minimum cost loss is $L = \sum_{j = 1}^{n} w_{j} c_{j} .$
Quadratic loss	`'quadratic'`	$L = \sum_{j = 1}^{n} w_{j} {(1 - m_{j})}^{2} .$

This figure compares the loss functions (except 'mincost') for one observation over m. Some functions are normalized to pass through [0,1].

Misclassification Cost

A misclassification cost is the relative severity of a classifier labeling an observation into the wrong class.

There are two types of misclassification costs: true and expected. Let K be the number of classes.

True misclassification cost — A K-by-K matrix, where element (i,j) indicates the misclassification cost of predicting an observation into class j if its true class is i. The software stores the misclassification cost in the property Mdl.Cost, and uses it in computations. By default, Mdl.Cost(i,j) = 1 if i ≠ j, and Mdl.Cost(i,j) = 0 if i = j. In other words, the cost is 0 for correct classification and 1 for any incorrect classification.
Expected misclassification cost — A K-dimensional vector, where element k is the weighted average misclassification cost of classifying an observation into class k, weighted by the class posterior probabilities.

$c_{k} = \sum_{j = 1}^{K} \hat{P} (Y = j | x_{1}, ..., x_{P}) C o s t_{j k} .$
In other words, the software classifies observations to the class corresponding with the lowest expected misclassification cost.

Posterior Probability

The posterior probability is the probability that an observation belongs in a particular class, given the data.

For naive Bayes, the posterior probability that a classification is k for a given observation (x₁,...,x_P) is

$\hat{P} (Y = k | x_{1}, .., x_{P}) = \frac{P (X_{1}, ..., X_{P} | y = k) π (Y = k)}{P (X_{1}, ..., X_{P})},$

where:

$P (X_{1}, ..., X_{P} | y = k)$ is the conditional joint density of the predictors given they are in class k. Mdl.DistributionNames stores the distribution names of the predictors.
π(Y = k) is the class prior probability distribution. Mdl.Prior stores the prior distribution.
$P (X_{1}, .., X_{P})$ is the joint density of the predictors. The classes are discrete, so $P (X_{1}, ..., X_{P}) = \sum_{k = 1}^{K} P (X_{1}, ..., X_{P} | y = k) π (Y = k) .$

Prior Probability

The prior probability of a class is the assumed relative frequency with which observations from that class occur in a population.

Extended Capabilities

Tall Arrays
Calculate with arrays that have more rows than fit in memory.

This function fully supports tall arrays. You can use models trained on either in-memory or tall data with this function.

For more information, see Tall Arrays.

Documentation

loss

Syntax

Description

Examples

Determine Test Sample Classification Loss of Naive Bayes Classifier

Determine Test Sample Logit Loss of Naive Bayes Classifier

Input Arguments

`Mdl` — Naive Bayes classification model
`ClassificationNaiveBayes` model object | `CompactClassificationNaiveBayes` model object

`tbl` — Sample data
table

`ResponseVarName` — Response variable name
name of a variable in `tbl`

`X` — Predictor data
numeric matrix

`Y` — Class labels
categorical array | character array | string array | logical vector | numeric vector | cell array of character vectors

Name-Value Pair Arguments

`'LossFun'` — Loss function
`'classiferror'` (default) | `'binodeviance'` | `'exponential'` | `'hinge'` | `'logit'` | `'mincost'` | `'quadratic'` | function handle

`'Weights'` — Observation weights
`ones(size(X,1),1)` (default) | numeric vector | name of a variable in `tbl`

Output Arguments

`L` — Classification loss
scalar

More About

Classification Loss

Misclassification Cost

Posterior Probability

Prior Probability

Extended Capabilities

Tall Arrays
Calculate with arrays that have more rows than fit in memory.

See Also

Topics

Statistics and Machine Learning Toolbox Documentation

Support

Documentation

loss

Syntax

Description

Examples

Determine Test Sample Classification Loss of Naive Bayes Classifier

Determine Test Sample Logit Loss of Naive Bayes Classifier

Input Arguments

Mdl — Naive Bayes classification model ClassificationNaiveBayes model object | CompactClassificationNaiveBayes model object

tbl — Sample data table

ResponseVarName — Response variable name name of a variable in tbl

X — Predictor data numeric matrix

Y — Class labels categorical array | character array | string array | logical vector | numeric vector | cell array of character vectors

Name-Value Pair Arguments

'LossFun' — Loss function 'classiferror' (default) | 'binodeviance' | 'exponential' | 'hinge' | 'logit' | 'mincost' | 'quadratic' | function handle

'Weights' — Observation weights ones(size(X,1),1) (default) | numeric vector | name of a variable in tbl

Output Arguments

L — Classification loss scalar

More About

Classification Loss

Misclassification Cost

Posterior Probability

Prior Probability

Extended Capabilities

Tall Arrays Calculate with arrays that have more rows than fit in memory.

See Also

Topics

Statistics and Machine Learning Toolbox Documentation

Support

`Mdl` — Naive Bayes classification model
`ClassificationNaiveBayes` model object | `CompactClassificationNaiveBayes` model object

`tbl` — Sample data
table

`ResponseVarName` — Response variable name
name of a variable in `tbl`

`X` — Predictor data
numeric matrix

`Y` — Class labels
categorical array | character array | string array | logical vector | numeric vector | cell array of character vectors

`'LossFun'` — Loss function
`'classiferror'` (default) | `'binodeviance'` | `'exponential'` | `'hinge'` | `'logit'` | `'mincost'` | `'quadratic'` | function handle

`'Weights'` — Observation weights
`ones(size(X,1),1)` (default) | numeric vector | name of a variable in `tbl`

`L` — Classification loss
scalar

Tall Arrays
Calculate with arrays that have more rows than fit in memory.