Kendall's for two vectors:

Kendall's for a matrix:

Kendall's for two matrices:

Compute Kendall's for a bivariate distribution:

Compare to a simulated value:

Kendall's is typically used to detect linear dependence between two vectors:

The absolute magnitude of tends to 1 given strong linear dependence:

The value tends to 0 for linearly independent vectors:

Kendall's can be used to measure linear association:

Kendall's can only detect monotonic association:

HoeffdingD can be used to detect other dependence structures:

A series of factors was measured in 506 Boston suburbs with the intention of determining how these factors are related to home price. Significant correlations among factors such as nitrogen oxide concentration and median home price serve as a reminder that correlation does not imply causation:

A scatter plot matrix comparing the percentage of non-retail businesses, nitrogen oxide concentration, and median home value:

Kendall's matrix for the scatter plot matrix:

KendallTauTest suggests home values drop with increasing nitrogen oxide concentrations:

Kendall's ranges from -1 to 1 for high negative and high positive association, respectively:

Kendall's matrix is symmetric:

The diagonal elements of Kendall's matrix are 1:

Kendall's is related to SpearmanRho:

SpearmanRho tends to be about given weak linear association:

Use KendallTauTest to test for independence:

Alternatively, use IndependenceTest to automatically select an appropriate test:

Kendall's will attain 1 or -1 if the variables are perfectly monotonically related:

This is in contrast to Correlation, which strictly measures linear association:

Kendall's for a continuous bivariate distribution:

Kendall's for discrete distributions accounts for the distribution of ties:

Compare to a simulated value with and without corrections for ties:

Tie-corrected expectation:

No correction for ties: