Computationally efficient versions of conformal predictive distributions
Abstract
Conformal predictive systems are a recent modification of conformal predictors that output, in regression problems, probability distributions for labels of test observations rather than set predictions. The extra information provided by conformal predictive systems may be useful, e.g., in decision making problems. Conformal predictive systems inherit the relative computational inefficiency of conformal predictors. In this paper we discuss two computationally efficient versions of conformal predictive systems, which we call split conformal predictive systems and cross-conformal predictive systems. The main advantage of split conformal predictive systems is their guaranteed validity, whereas for cross-conformal predictive systems validity only holds empirically and in the absence of excessive randomization. The main advantage of cross-conformal predictive systems is their greater predictive efficiency.
Cite
@article{arxiv.1911.00941,
title = {Computationally efficient versions of conformal predictive distributions},
author = {Vladimir Vovk and Ivan Petej and Ilia Nouretdinov and Valery Manokhin and Alex Gammerman},
journal= {arXiv preprint arXiv:1911.00941},
year = {2019}
}
Comments
31 pages, 14 figures, 1 table. The conference version published in the Proceedings of COPA 2018, and the journal version is to appear in Neurocomputing