Topological Causal Effects
Abstract
Estimating causal effects is particularly challenging when outcomes arise in complex, non-Euclidean spaces, where conventional methods often fail to capture meaningful structural variation. We develop a framework for topological causal inference that defines treatment effects through differences in the topological structure of potential outcomes, summarized by power-weighted silhouette functions of persistence diagrams. We develop an efficient, doubly robust estimator in a fully nonparametric model, establish functional weak convergence, and construct a formal test of the null hypothesis of no topological effect. Empirical studies illustrate that the proposed method reliably quantifies topological treatment effects across diverse complex outcome types.
Cite
Text
Kim and Lee. "Topological Causal Effects." International Conference on Learning Representations, 2026.Markdown
[Kim and Lee. "Topological Causal Effects." International Conference on Learning Representations, 2026.](https://mlanthology.org/iclr/2026/kim2026iclr-topological/)BibTeX
@inproceedings{kim2026iclr-topological,
title = {{Topological Causal Effects}},
author = {Kim, Kwangho and Lee, Hajin},
booktitle = {International Conference on Learning Representations},
year = {2026},
url = {https://mlanthology.org/iclr/2026/kim2026iclr-topological/}
}