A Statistical Test for Joint Distributions Equivalence
Machine Learning
2016-07-26 v1 Computer Vision and Pattern Recognition
Machine Learning
Abstract
We provide a distribution-free test that can be used to determine whether any two joint distributions and are statistically different by inspection of a large enough set of samples. Following recent efforts from Long et al. [1], we rely on joint kernel distribution embedding to extend the kernel two-sample test of Gretton et al. [2] to the case of joint probability distributions. Our main result can be directly applied to verify if a dataset-shift has occurred between training and test distributions in a learning framework, without further assuming the shift has occurred only in the input, in the target or in the conditional distribution.
Keywords
Cite
@article{arxiv.1607.07270,
title = {A Statistical Test for Joint Distributions Equivalence},
author = {Francesco Solera and Andrea Palazzi},
journal= {arXiv preprint arXiv:1607.07270},
year = {2016}
}