English

Directed Graphical Models and Causal Discovery for Zero-Inflated Data

Methodology 2020-04-09 v1 Applications

Abstract

Modern RNA sequencing technologies provide gene expression measurements from single cells that promise refined insights on regulatory relationships among genes. Directed graphical models are well-suited to explore such (cause-effect) relationships. However, statistical analyses of single cell data are complicated by the fact that the data often show zero-inflated expression patterns. To address this challenge, we propose directed graphical models that are based on Hurdle conditional distributions parametrized in terms of polynomials in parent variables and their 0/1 indicators of being zero or nonzero. While directed graphs for Gaussian models are only identifiable up to an equivalence class in general, we show that, under a natural and weak assumption, the exact directed acyclic graph of our zero-inflated models can be identified. We propose methods for graph recovery, apply our model to real single-cell RNA-seq data on T helper cells, and show simulated experiments that validate the identifiability and graph estimation methods in practice.

Keywords

Cite

@article{arxiv.2004.04150,
  title  = {Directed Graphical Models and Causal Discovery for Zero-Inflated Data},
  author = {Shiqing Yu and Mathias Drton and Ali Shojaie},
  journal= {arXiv preprint arXiv:2004.04150},
  year   = {2020}
}

Comments

41 pages, 7 figures

R2 v1 2026-06-23T14:44:37.595Z