RadiusNeighbors / Classifier Layer

Radius for neighborhood definition:

Effect: $$N(x)=\{x_i:d(x,x_i)\le r\}$$

Selection guide:

• Small radius: High precision, risk of empty neighborhoods
• Large radius: Better coverage, higher computation cost
• Consider local density variations

Typical ranges:

• Dense regions: 0.1 - 1.0
• Sparse regions: 1.0 - 5.0
• Scale with feature normalization

Neighbor weighting scheme within the fixed radius:

Mathematical form: For a point x and neighbors within radius r: $$f(x)=\sum _{i:d(x,x_i)\le r}{w}_i{y}_i$$

Comparison with k-NN weights:

• k-NN: Weights applied to fixed k points
• Radius: Weights applied to variable number of points

Impact on density:

• Affects contribution of points at different distances
• Particularly important for varying density regions
• Helps manage boundary effects near radius limit

Algorithm for computing nearest neighbors:

Selection criteria:

1. Data dimensionality
2. Sample size
3. Distance metric
4. Memory constraints

Tree algorithm leaf size parameter:

Impact on performance:

• Construction time: $O(DN\log N/\text{leaf\_size})$
• Query time: Varies with leaf_size
• Memory: Increases with smaller leaf_size

Trade-offs:

• Small values: Faster queries, more memory
• Large values: Slower queries, less memory
• Optimal range: 10-50 for most cases

Note: Only affects tree-based algorithms

Minkowski distance power parameter:

Distance formula: $$d(x,y)=(\sum _i|x_i-y_i{|}^p{)}^{1/p}$$

Common values:

• p=1: Manhattan distance
• p=2: Euclidean distance (default)
• p→∞: Chebyshev distance

Selection criteria:

• Feature space geometry
• Data distribution
• Domain knowledge
• Computational needs

Note: Affects radius interpretation

Radius values to evaluate:

Common grids:

• Conservative: [0.5, 1.0, 1.5]
• Wide range: [0.1, 1.0, 10.0]
• Log-scale: [0.1, 0.3, 1.0, 3.0]

Selection strategy:

• Start with log-spaced values
• Monitor empty neighborhoods
• Consider feature scaling
• Check density distribution

Note: Most critical parameter for optimization

Neighbor weighting scheme within the fixed radius:

Mathematical form: For a point x and neighbors within radius r: $$f(x)=\sum _{i:d(x,x_i)\le r}{w}_i{y}_i$$

Comparison with k-NN weights:

• k-NN: Weights applied to fixed k points
• Radius: Weights applied to variable number of points

Impact on density:

• Affects contribution of points at different distances
• Particularly important for varying density regions
• Helps manage boundary effects near radius limit

Algorithm for computing nearest neighbors:

Selection criteria:

1. Data dimensionality
2. Sample size
3. Distance metric
4. Memory constraints

Leaf size values for tree algorithms:

Common ranges:

• Small data: [10, 20, 30]
• Medium data: [30, 50, 70]
• Large data: [50, 100, 150]

Trade-offs:

• Build time vs query time
• Memory usage vs speed
• Tree balance vs efficiency

Note: Only relevant for tree-based algorithms

Minkowski distance powers to evaluate:

Common combinations:

• Standard: [2.0] (Euclidean)
• Extended: [1.0, 2.0, 3.0]
• Complete: [1.0, 1.5, 2.0, 3.0]

Impact:

• Affects radius interpretation
• Changes neighborhood shape
• Influences distance weighting
• Computational complexity

Performance metric for model evaluation:

Selection criteria:

• Default: Model's built-in scoring
• Accuracy: Overall correctness
• BalancedAccuracy: For imbalanced data
• LogLoss: Probability quality
• RocAuc: Threshold-independent

Choose based on:

• Class distribution
• Problem requirements
• Prediction type needed

Random seed for reproducible splits. Ensures:

• Consistent train/test sets
• Reproducible experiments
• Comparable model evaluations

Same seed guarantees identical splits across runs.

Data shuffling before splitting. Effects:

• true: Randomizes order, better for i.i.d. data
• false: Maintains order, important for time series

When to disable:

• Time dependent data
• Sequential patterns
• Grouped observations

Proportion of data for training. Considerations:

• Larger (e.g., 0.8-0.9): Better model learning
• Smaller (e.g., 0.5-0.7): Better validation

Common splits:

• 0.8: Standard (80/20 split)
• 0.7: More validation emphasis
• 0.9: More training emphasis

Maintain class distribution in splits. Important when:

• Classes are imbalanced
• Small classes present
• Representative splits needed

Requirements:

• Classification tasks only
• Cannot use with shuffle=false
• Sufficient samples per class

Number of cross-validation folds. Guidelines:

• 3-5: Large datasets, faster training
• 5-10: Standard choice, good balance
• 10+: Small datasets, thorough evaluation

Trade-offs:

• More folds: Better evaluation, slower training
• Fewer folds: Faster training, higher variance

Must be at least 2.

Number of folds for cross-validation. Selection guide: Recommended values:

• 5: Standard choice (default)
• 3: Large datasets/quick evaluation
• 10: Thorough evaluation/smaller datasets

Trade-offs:

• Higher values: More thorough, computationally expensive
• Lower values: Faster, potentially higher variance

Must be at least 2 for valid cross-validation.

Random seed for fold generation when shuffling. Important for:

• Reproducible results
• Consistent fold assignments
• Benchmark comparisons
• Debugging and validation

Set specific value for reproducibility across runs.

Whether to shuffle data before splitting into folds. Effects:

• true: Randomized fold composition (recommended)
• false: Sequential splitting

Enable when:

• Data may have ordering
• Better fold independence needed

Disable for:

• Time series data
• Ordered observations

Number of stratified folds. Guidelines: Typical values:

• 5: Standard for most cases
• 3: Quick evaluation/large datasets
• 10: Detailed evaluation/smaller datasets

Considerations:

• Must allow sufficient samples per class per fold
• Balance between stability and computation time
• Consider smallest class size when choosing

Seed for reproducible stratified splits. Ensures:

• Consistent fold assignments
• Reproducible results
• Comparable experiments
• Systematic validation

Fixed seed guarantees identical stratified splits.

Data shuffling before stratified splitting. Impact:

• true: Randomizes while maintaining stratification
• false: Maintains data order within strata

Use cases:

• true: Independent observations
• false: Grouped or sequential data

Class proportions maintained regardless of setting.

Number of random splits to perform. Consider: Common values:

• 5: Standard evaluation
• 10: More thorough assessment
• 3: Quick estimates

Trade-offs:

• More splits: Better estimation, longer runtime
• Fewer splits: Faster, less stable estimates

Balance between computation and stability.

Random seed for reproducible shuffling. Controls:

• Split randomization
• Sample selection
• Result reproducibility

Important for:

• Debugging
• Comparative studies
• Result verification

Proportion of samples for test set. Guidelines: Common ratios:

• 0.2: Standard (80/20 split)
• 0.25: More validation emphasis
• 0.1: More training data

Considerations:

• Dataset size
• Model complexity
• Validation requirements

It must be between 0.0 and 1.0.

Number of stratified random splits. Guidelines: Recommended values:

• 5: Standard evaluation
• 10: Detailed analysis
• 3: Quick assessment

Consider:

• Sample size per class
• Computational resources
• Stability requirements

Seed for reproducible stratified sampling. Ensures:

• Consistent class proportions
• Reproducible splits
• Comparable experiments

Critical for:

• Benchmarking
• Research studies
• Quality assurance

Fraction of samples for stratified test set. Best practices: Common splits:

• 0.2: Balanced evaluation
• 0.3: More thorough testing
• 0.15: Preserve training size

Consider:

• Minority class size
• Overall dataset size
• Validation objectives

It must be between 0.0 and 1.0.

Number of temporal splits. Considerations: Typical values:

• 5: Standard forward chaining
• 3: Limited historical data
• 10: Long time series

Impact:

• Affects training window growth
• Determines validation points
• Influences computational load

Maximum size of training set. Should be strictly less than the number of samples. Applications:

• 0: Use all available past data
• >0: Rolling window of fixed size

Use cases:

• Limit historical relevance
• Control computational cost
• Handle concept drift
• Memory constraints

Number of samples in each test set. When 0:

• Auto-calculated as n_samples/(n_splits+1)
• Ensures equal-sized test sets

Considerations:

• Forecast horizon
• Validation requirements
• Available future data

Number of samples to exclude from the end of each train set before the test set.Gap between train and test sets. Uses:

• Avoid data leakage
• Model forecast lag
• Buffer periods

Common scenarios:

• 0: Continuous prediction
• >0: Forward gap for realistic evaluation
• Match business forecasting needs