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arxiv: 2111.04095 · v2 · pith:5Q23XJO4new · submitted 2021-11-07 · 💻 cs.LG · cs.AI· stat.ME· stat.ML

Iterative Causal Discovery in the Possible Presence of Latent Confounders and Selection Bias

classification 💻 cs.LG cs.AIstat.MEstat.ML
keywords causalgraphiterationiterativebiascompleteconditioningconfounders
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We present a sound and complete algorithm, called iterative causal discovery (ICD), for recovering causal graphs in the presence of latent confounders and selection bias. ICD relies on the causal Markov and faithfulness assumptions and recovers the equivalence class of the underlying causal graph. It starts with a complete graph, and consists of a single iterative stage that gradually refines this graph by identifying conditional independence (CI) between connected nodes. Independence and causal relations entailed after any iteration are correct, rendering ICD anytime. Essentially, we tie the size of the CI conditioning set to its distance on the graph from the tested nodes, and increase this value in the successive iteration. Thus, each iteration refines a graph that was recovered by previous iterations having smaller conditioning sets -- a higher statistical power -- which contributes to stability. We demonstrate empirically that ICD requires significantly fewer CI tests and learns more accurate causal graphs compared to FCI, FCI+, and RFCI algorithms (code is available at https://github.com/IntelLabs/causality-lab).

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Towards a holistic understanding of Selection Bias for Causal Effect Identification

    stat.ME 2026-05 unverdicted novelty 6.0

    Necessary and sufficient conditions for ATE identifiability under selection bias using weaker assumptions on probability classes than prior graphical criteria.

  2. Towards a holistic understanding of Selection Bias for Causal Effect Identification

    stat.ME 2026-05 unverdicted novelty 5.0

    Provides necessary and sufficient conditions for ATE identifiability under selection bias by characterizing propensity and selection probabilities via weak assumptions on probability classes.