Exact and Approximate Conformal Inference for Multi-Output Regression
Abstract
It is common in machine learning to estimate a response given covariate information . However, these predictions alone do not quantify any uncertainty associated with said predictions. One way to overcome this deficiency is with conformal inference methods, which construct a set containing the unobserved response with a prescribed probability. Unfortunately, even with a one-dimensional response, conformal inference is computationally expensive despite recent encouraging advances. In this paper, we explore multi-output regression, delivering exact derivations of conformal inference -values when the predictive model can be described as a linear function of . Additionally, we propose \texttt{unionCP} and a multivariate extension of \texttt{rootCP} as efficient ways of approximating the conformal prediction region for a wide array of multi-output predictors, both linear and nonlinear, while preserving computational advantages. We also provide both theoretical and empirical evidence of the effectiveness of these methods using both real-world and simulated data.
Cite
@article{arxiv.2210.17405,
title = {Exact and Approximate Conformal Inference for Multi-Output Regression},
author = {Chancellor Johnstone and Eugene Ndiaye},
journal= {arXiv preprint arXiv:2210.17405},
year = {2024}
}
Comments
20 pages, 6 figures