Rectified Fisher-Bingham Model for Compositional Data with Zeros
Abstract
This paper introduces a rectified and renormalized Fisher-Bingham model for compositional data with zeros, motivated in part by the presence of zeros in microbiota studies. The approach represents compositions through a square-root transformation that maps data to the positive orthant of the unit sphere, and models them via a latent Fisher-Bingham followed by a deterministic transformation that induces exact zeros. This construction yields a coherent likelihood without requiring zero imputation or separate modeling of zero and nonzero components. Parameter estimation is performed using a Monte Carlo expectation-maximization algorithm that accommodates the latent structure. We further develop a score test for detecting structured differences in composition across groups, providing a parametric alternative to commonly used distance-based methods. Simulation studies demonstrate that the proposed method closely approximates the induced distribution and achieves higher power for detecting structured compositional changes, particularly when observations include many zero-valued components. An application to a dietary intervention study illustrates that the method identifies meaningful microbiota shifts not detected by standard approaches.
Cite
@article{arxiv.2604.25030,
title = {Rectified Fisher-Bingham Model for Compositional Data with Zeros},
author = {Eugene Han and Marahi Perez-Tamayo and Hannah D. Holscher and Ruoqing Zhu},
journal= {arXiv preprint arXiv:2604.25030},
year = {2026}
}
Comments
34 pages, 5 figures