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 azadkia and chatterjee


Assessing the overall and partial causal well-specification of nonlinear additive noise models

arXiv.org Machine Learning

Nonlinear additive noise models and their heteroscedastic extensions are a popular modelling framework for causal discovery and inference. They allow to infer the true causal connections and effects from the multivariate distribution when the nonparametric model is correct; see, e.g., Hoyer et al. (2008); Peters et al. (2014) or, for heteroscedastic models, Strobl and Lasko (2023); Immer et al. (2023). However, the conclusions can be misleading if the additive noise model is misspecified, especially in the presence of hidden confounding variables. In this paper, we define the term "causal well-specification" of additive noise models, discuss its relevance, and finally present a corresponding estimation technique for observational data. The concept of well-specification for regression functionals in parametric regression was introduced by Buja et al. (2019).


Limit theorems of Chatterjee's rank correlation

arXiv.org Artificial Intelligence

Establishing the limiting distribution of Chatterjee's rank correlation for a general, possibly non-independent, pair of random variables has been eagerly awaited to many. This paper shows that (a) Chatterjee's rank correlation is asymptotically normal as long as one variable is not a measurable function of the other, (b) the corresponding asymptotic variance is uniformly bounded by 36, and (c) a consistent variance estimator exists. Similar results also hold for Azadkia-Chatterjee's graph-based correlation coefficient, a multivariate analogue of Chatterjee's original proposal. The proof is given by appealing to H\'ajek representation and Chatterjee's nearest-neighbor CLT.