Identifying Causal Direction via Dense Functional Classes
This addresses a fundamental challenge in causal inference for researchers and practitioners, offering an interpretable and fast method, though it is incremental as it builds on existing MDL-based approaches.
The paper tackles the problem of determining causal direction between two continuous variables by proposing LCUBE, a method based on Minimum Description Length using cubic splines, which achieves superior precision on benchmark datasets like Tuebingen, with specific gains in AUDRC and average precision.
We address the problem of determining the causal direction between two univariate, continuous-valued variables, X and Y, under the assumption of no hidden confounders. In general, it is not possible to make definitive statements about causality without some assumptions on the underlying model. To distinguish between cause and effect, we propose a bivariate causal score based on the Minimum Description Length (MDL) principle, using functions that possess the density property on a compact real interval. We prove the identifiability of these causal scores under specific conditions. These conditions can be easily tested. Gaussianity of the noise in the causal model equations is not assumed, only that the noise is low. The well-studied class of cubic splines possesses the density property on a compact real interval. We propose LCUBE as an instantiation of the MDL-based causal score utilizing cubic regression splines. LCUBE is an identifiable method that is also interpretable, simple, and very fast. It has only one hyperparameter. Empirical evaluations compared to state-of-the-art methods demonstrate that LCUBE achieves superior precision in terms of AUDRC on the real-world Tuebingen cause-effect pairs dataset. It also shows superior average precision across common 10 benchmark datasets and achieves above average precision on 13 datasets.