ExtremelyFastDecisionTreeClassifier¶
Extremely Fast Decision Tree (EFDT) classifier.
Also referred to as the Hoeffding AnyTime Tree (HATT) classifier. In practice, despite the name, EFDTs are typically slower than a vanilla Hoeffding Tree to process data. The speed differences come from the mechanism of split re-evaluation present in EFDT. Nonetheless, EFDT has theoretical properties that ensure it converges faster than the vanilla Hoeffding Tree to the structure that would be created by a batch decision tree model (such as Classification and Regression Trees - CART). Keep in mind that such propositions hold when processing a stationary data stream. When dealing with non-stationary data, EFDT is somewhat robust to concept drifts as it continually revisits and updates its internal decision tree structure. Still, in such cases, the Hoeffind Adaptive Tree might be a better option, as it was specifically designed to handle non-stationarity.
Parameters¶
-
grace_period
Type → int
Default →
200
Number of instances a leaf should observe between split attempts.
-
max_depth
Type → int | None
Default →
None
The maximum depth a tree can reach. If
None
, the tree will grow indefinitely. -
min_samples_reevaluate
Type → int
Default →
20
Number of instances a node should observe before reevaluating the best split.
-
split_criterion
Type → str
Default →
info_gain
Split criterion to use. - 'gini' - Gini - 'info_gain' - Information Gain - 'hellinger' - Helinger Distance
-
delta
Type → float
Default →
1e-07
Significance level to calculate the Hoeffding bound. The significance level is given by
1 - delta
. Values closer to zero imply longer split decision delays. -
tau
Type → float
Default →
0.05
Threshold below which a split will be forced to break ties.
-
leaf_prediction
Type → str
Default →
nba
Prediction mechanism used at leafs. - 'mc' - Majority Class - 'nb' - Naive Bayes - 'nba' - Naive Bayes Adaptive
-
nb_threshold
Type → int
Default →
0
Number of instances a leaf should observe before allowing Naive Bayes.
-
nominal_attributes
Type → list | None
Default →
None
List of Nominal attributes identifiers. If empty, then assume that all numeric attributes should be treated as continuous.
-
splitter
Type → Splitter | None
Default →
None
The Splitter or Attribute Observer (AO) used to monitor the class statistics of numeric features and perform splits. Splitters are available in the
tree.splitter
module. Different splitters are available for classification and regression tasks. Classification and regression splitters can be distinguished by their propertyis_target_class
. This is an advanced option. Special care must be taken when choosing different splitters. By default,tree.splitter.GaussianSplitter
is used ifsplitter
isNone
. -
binary_split
Type → bool
Default →
False
If True, only allow binary splits.
-
min_branch_fraction
Type → float
Default →
0.01
The minimum percentage of observed data required for branches resulting from split candidates. To validate a split candidate, at least two resulting branches must have a percentage of samples greater than
min_branch_fraction
. This criterion prevents unnecessary splits when the majority of instances are concentrated in a single branch. -
max_share_to_split
Type → float
Default →
0.99
Only perform a split in a leaf if the proportion of elements in the majority class is smaller than this parameter value. This parameter avoids performing splits when most of the data belongs to a single class.
-
max_size
Type → float
Default →
100.0
The max size of the tree, in Megabytes (MB).
-
memory_estimate_period
Type → int
Default →
1000000
Interval (number of processed instances) between memory consumption checks.
-
stop_mem_management
Type → bool
Default →
False
If True, stop growing as soon as memory limit is hit.
-
remove_poor_attrs
Type → bool
Default →
False
If True, disable poor attributes to reduce memory usage.
-
merit_preprune
Type → bool
Default →
True
If True, enable merit-based tree pre-pruning.
Attributes¶
-
height
-
leaf_prediction
Return the prediction strategy used by the tree at its leaves.
-
max_size
Max allowed size tree can reach (in MB).
-
n_active_leaves
-
n_branches
-
n_inactive_leaves
-
n_leaves
-
n_nodes
-
split_criterion
Return a string with the name of the split criterion being used by the tree.
-
summary
Collect metrics corresponding to the current status of the tree in a string buffer.
Examples¶
from river.datasets import synth
from river import evaluate
from river import metrics
from river import tree
gen = synth.Agrawal(classification_function=0, seed=42)
dataset = iter(gen.take(1000))
model = tree.ExtremelyFastDecisionTreeClassifier(
grace_period=100,
delta=1e-5,
nominal_attributes=['elevel', 'car', 'zipcode'],
min_samples_reevaluate=100
)
metric = metrics.Accuracy()
evaluate.progressive_val_score(dataset, model, metric)
Accuracy: 87.29%
Methods¶
debug_one
Print an explanation of how x
is predicted.
Parameters
- x — 'dict'
Returns
str | None: A representation of the path followed by the tree to predict x
; None
if
draw
Draw the tree using the graphviz
library.
Since the tree is drawn without passing incoming samples, classification trees will show the majority class in their leaves, whereas regression trees will use the target mean.
Parameters
- max_depth — 'int | None' — defaults to
None
The maximum depth a tree can reach. IfNone
, the tree will grow indefinitely.
learn_one
Incrementally train the model
Parameters
- x
- y
- w — defaults to
1.0
predict_one
Predict the label of a set of features x
.
Parameters
- x — 'dict'
- kwargs
Returns
base.typing.ClfTarget | None: The predicted label.
predict_proba_one
Predict the probability of each label for a dictionary of features x
.
Parameters
- x
Returns
A dictionary that associates a probability which each label.
to_dataframe
Return a representation of the current tree structure organized in a pandas.DataFrame
object.
In case the tree is empty or it only contains a single node (a leaf), None
is returned.
Returns
df
Notes¶
The Extremely Fast Decision Tree (EFDT) 1 constructs a tree incrementally. The EFDT seeks to select and deploy a split as soon as it is confident the split is useful, and then revisits that decision, replacing the split if it subsequently becomes evident that a better split is available. The EFDT learns rapidly from a stationary distribution and eventually it learns the asymptotic batch tree if the distribution from which the data are drawn is stationary.
-
C. Manapragada, G. Webb, and M. Salehi. Extremely Fast Decision Tree. In Proceedings of the 24th ACM SIGKDD International Conference on Knowledge Discovery & Data Mining (KDD '18). ACM, New York, NY, USA, 1953-1962. DOI: https://doi.org/10.1145/3219819.3220005 ↩