Related papers: Identification of Causal Direction under an Arbitrary Number of Latent Confounders

Identification of Causal Direction under an Arbitrary Number of Latent Confounders

URL: http://arxiv.org/abs/2510.22711v1
Date: Sun, 26 Oct 2025 15:10:00 GMT
Title: Identification of Causal Direction under an Arbitrary Number of Latent Confounders
Authors: Wei Chen, Linjun Peng, Zhiyi Huang, Haoyue Dai, Zhifeng Hao, Ruichu Cai, Kun Zhang,
Abstract summary: In real-world scenarios, observed variables may be affected by multiple latent variables simultaneously.<n>We make use of the joint higher-order cumulant matrix of the observed variables constructed in a specific way.<n>We show that, surprisingly, causal asymmetry between two observed variables can be directly seen from the rank deficiency properties of such higher-order cumulant matrices.
Score: 54.76982125821112
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Recovering causal structure in the presence of latent variables is an important but challenging task. While many methods have been proposed to handle it, most of them require strict and/or untestable assumptions on the causal structure. In real-world scenarios, observed variables may be affected by multiple latent variables simultaneously, which, generally speaking, cannot be handled by these methods. In this paper, we consider the linear, non-Gaussian case, and make use of the joint higher-order cumulant matrix of the observed variables constructed in a specific way. We show that, surprisingly, causal asymmetry between two observed variables can be directly seen from the rank deficiency properties of such higher-order cumulant matrices, even in the presence of an arbitrary number of latent confounders. Identifiability results are established, and the corresponding identification methods do not even involve iterative procedures. Experimental results demonstrate the effectiveness and asymptotic correctness of our proposed method.

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