Partial Counterfactual Identification of Continuous Outcomes with a
Curvature Sensitivity Model
- URL: http://arxiv.org/abs/2306.01424v3
- Date: Thu, 11 Jan 2024 16:10:40 GMT
- Title: Partial Counterfactual Identification of Continuous Outcomes with a
Curvature Sensitivity Model
- Authors: Valentyn Melnychuk, Dennis Frauen, Stefan Feuerriegel
- Abstract summary: We propose a novel sensitivity model called Curvature Sensitivity Model.
This allows us to obtain informative bounds by bounding the curvature of level sets of the functions.
We then propose an implementation of our Curvature Sensitivity Model in the form of a novel deep generative model.
- Score: 30.77874108094485
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Counterfactual inference aims to answer retrospective "what if" questions and
thus belongs to the most fine-grained type of inference in Pearl's causality
ladder. Existing methods for counterfactual inference with continuous outcomes
aim at point identification and thus make strong and unnatural assumptions
about the underlying structural causal model. In this paper, we relax these
assumptions and aim at partial counterfactual identification of continuous
outcomes, i.e., when the counterfactual query resides in an ignorance interval
with informative bounds. We prove that, in general, the ignorance interval of
the counterfactual queries has non-informative bounds, already when functions
of structural causal models are continuously differentiable. As a remedy, we
propose a novel sensitivity model called Curvature Sensitivity Model. This
allows us to obtain informative bounds by bounding the curvature of level sets
of the functions. We further show that existing point counterfactual
identification methods are special cases of our Curvature Sensitivity Model
when the bound of the curvature is set to zero. We then propose an
implementation of our Curvature Sensitivity Model in the form of a novel deep
generative model, which we call Augmented Pseudo-Invertible Decoder. Our
implementation employs (i) residual normalizing flows with (ii) variational
augmentations. We empirically demonstrate the effectiveness of our Augmented
Pseudo-Invertible Decoder. To the best of our knowledge, ours is the first
partial identification model for Markovian structural causal models with
continuous outcomes.
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