Baumgartner-Weiss-Schindler (BWS)¶

The Baumgartner-Weiss-Schindler test is a modern non-parametric test that combines advantages of several classical tests, with particular sensitivity to tail differences:

\[ B = \frac{1}{n_1 n_2} \sum_{i,j} \psi(F(x_i), F(y_j)) \]

where \(\psi\) is a weighting function that emphasizes tail regions.

Key characteristics:

Modern design: Developed to address limitations of classical tests
High power: Generally higher statistical power across various scenarios
Tail sensitivity: Strong sensitivity to tail differences like Anderson-Darling
Versatility: Performs well across different types of distributional shifts

When to use:

High-stakes computer vision (medical imaging, autonomous vehicles)
Production vision systems where missing drift is costly
When you need high statistical power across diverse drift scenarios
For detecting both location and scale shifts simultaneously
When computational cost is not a primary constraint
As a robust alternative when other tests give ambiguous results

Limitations:

Complexity and overhead. It is a more modern, complex statistic that is harder to find in standard libraries and may require more compute time for high-velocity data streams.