A low variance consistent test of relative dependency

W Bounliphone, A Gretton… - International …, 2015 - proceedings.mlr.press
W Bounliphone, A Gretton, A Tenenhaus, M Blaschko
International Conference on Machine Learning, 2015proceedings.mlr.press
We describe a novel non-parametric statistical hypothesis test of relative dependence
between a source variable and two candidate target variables. Such a test enables us to
determine whether one source variable is significantly more dependent on a first target
variable or a second. Dependence is measured via the Hilbert-Schmidt Independence
Criterion (HSIC), resulting in a pair of empirical dependence measures (source-target 1,
source-target 2). We test whether the first dependence measure is significantly larger than …
Abstract
We describe a novel non-parametric statistical hypothesis test of relative dependence between a source variable and two candidate target variables. Such a test enables us to determine whether one source variable is significantly more dependent on a first target variable or a second. Dependence is measured via the Hilbert-Schmidt Independence Criterion (HSIC), resulting in a pair of empirical dependence measures (source-target 1, source-target 2). We test whether the first dependence measure is significantly larger than the second. Modeling the covariance between these HSIC statistics leads to a provably more powerful test than the construction of independent HSIC statistics by sub-sampling. The resulting test is consistent and unbiased, and (being based on U-statistics) has favorable convergence properties. The test can be computed in quadratic time, matching the computational complexity of standard empirical HSIC estimators. The effectiveness of the test is demonstrated on several real-world problems: we identify language groups from a multilingual corpus, and we prove that tumor location is more dependent on gene expression than chromosomal imbalances. Source code is available for download at https://github. com/wbounliphone/reldep/.
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