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
@article{arxiv.2603.02289,
title = {Topological Causal Effects},
author = {Kwangho Kim and Hajin Lee},
journal= {arXiv preprint arXiv:2603.02289},
year = {2026}
}