The likelihood-ratio test for multi-edge network models
Abstract
The complexity underlying real-world systems implies that standard statistical hypothesis testing methods may not be adequate for these peculiar applications. Specifically, we show that the likelihood-ratio test's null-distribution needs to be modified to accommodate the complexity found in multi-edge network data. When working with independent observations, the p-values of likelihood-ratio tests are approximated using a distribution. However, such an approximation should not be used when dealing with multi-edge network data. This type of data is characterized by multiple correlations and competitions that make the standard approximation unsuitable. We provide a solution to the problem by providing a better approximation of the likelihood-ratio test null-distribution through a Beta distribution. Finally, we empirically show that even for a small multi-edge network, the standard approximation provides erroneous results, while the proposed Beta approximation yields the correct p-value estimation.
Cite
@article{arxiv.2102.11116,
title = {The likelihood-ratio test for multi-edge network models},
author = {Giona Casiraghi},
journal= {arXiv preprint arXiv:2102.11116},
year = {2021}
}
Comments
15 pages, 3 figures