Uncertainty Quantification for Regression using Proper Scoring Rules
- URL: http://arxiv.org/abs/2509.26610v1
- Date: Tue, 30 Sep 2025 17:52:12 GMT
- Title: Uncertainty Quantification for Regression using Proper Scoring Rules
- Authors: Alexander Fishkov, Kajetan Schweighofer, Mykyta Ielanskyi, Nikita Kotelevskii, Mohsen Guizani, Maxim Panov,
- Abstract summary: We introduce a unified UQ framework for regression based on proper scoring rules, such as CRPS, logarithmic, squared error, and quadratic scores.<n>We derive closed-form expressions for the uncertainty measures under practical parametric assumptions and show how to estimate them using ensembles of models.<n>Our broad evaluation on synthetic and real-world regression datasets provides guidance for selecting reliable UQ measures.
- Score: 76.24649098854219
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: Quantifying uncertainty of machine learning model predictions is essential for reliable decision-making, especially in safety-critical applications. Recently, uncertainty quantification (UQ) theory has advanced significantly, building on a firm basis of learning with proper scoring rules. However, these advances were focused on classification, while extending these ideas to regression remains challenging. In this work, we introduce a unified UQ framework for regression based on proper scoring rules, such as CRPS, logarithmic, squared error, and quadratic scores. We derive closed-form expressions for the resulting uncertainty measures under practical parametric assumptions and show how to estimate them using ensembles of models. In particular, the derived uncertainty measures naturally decompose into aleatoric and epistemic components. The framework recovers popular regression UQ measures based on predictive variance and differential entropy. Our broad evaluation on synthetic and real-world regression datasets provides guidance for selecting reliable UQ measures.
Related papers
- Principled Input-Output-Conditioned Post-Hoc Uncertainty Estimation for Regression Networks [1.4671424999873808]
Uncertainty is critical in safety-sensitive applications but is often omitted from off-the-shelf neural networks due to adverse effects on predictive performance.<n>We propose a theoretically grounded framework for post-hoc uncertainty estimation in regression tasks by fitting an auxiliary model to both original inputs and frozen model outputs.
arXiv Detail & Related papers (2025-06-01T09:13:27Z) - An Axiomatic Assessment of Entropy- and Variance-based Uncertainty Quantification in Regression [26.822418248900547]
We introduce a set of axioms to rigorously assess uncertainty measures in supervised regression.<n>We generalize commonly used approaches for uncertainty representation and corresponding uncertainty measures.<n>Our findings offer theoretical insights and practical guidelines for reliable uncertainty assessment.
arXiv Detail & Related papers (2025-04-25T15:44:46Z) - Beyond the Norms: Detecting Prediction Errors in Regression Models [26.178065248948773]
This paper tackles the challenge of detecting unreliable behavior in regression algorithms.
We introduce the notion of unreliability in regression, when the output of the regressor exceeds a specified discrepancy (or error)
We show empirical improvements in error detection for multiple regression tasks, consistently outperforming popular baseline approaches.
arXiv Detail & Related papers (2024-06-11T05:51:44Z) - Predictability Analysis of Regression Problems via Conditional Entropy Estimations [1.8913544072080544]
Conditional entropy estimators are developed to assess predictability in regression problems.
Experiments on synthesized and real-world datasets demonstrate the robustness and utility of these estimators.
arXiv Detail & Related papers (2024-06-06T07:59:19Z) - Relaxed Quantile Regression: Prediction Intervals for Asymmetric Noise [51.87307904567702]
Quantile regression is a leading approach for obtaining such intervals via the empirical estimation of quantiles in the distribution of outputs.<n>We propose Relaxed Quantile Regression (RQR), a direct alternative to quantile regression based interval construction that removes this arbitrary constraint.<n>We demonstrate that this added flexibility results in intervals with an improvement in desirable qualities.
arXiv Detail & Related papers (2024-06-05T13:36:38Z) - Conformalized Selective Regression [2.3964255330849356]
We propose a novel approach to selective regression by leveraging conformal prediction.
We show how our proposed approach, conformalized selective regression, demonstrates an advantage over multiple state-of-the-art baselines.
arXiv Detail & Related papers (2024-02-26T04:43:50Z) - Selective Nonparametric Regression via Testing [54.20569354303575]
We develop an abstention procedure via testing the hypothesis on the value of the conditional variance at a given point.
Unlike existing methods, the proposed one allows to account not only for the value of the variance itself but also for the uncertainty of the corresponding variance predictor.
arXiv Detail & Related papers (2023-09-28T13:04:11Z) - The Implicit Delta Method [61.36121543728134]
In this paper, we propose an alternative, the implicit delta method, which works by infinitesimally regularizing the training loss of uncertainty.
We show that the change in the evaluation due to regularization is consistent for the variance of the evaluation estimator, even when the infinitesimal change is approximated by a finite difference.
arXiv Detail & Related papers (2022-11-11T19:34:17Z) - Towards Clear Expectations for Uncertainty Estimation [64.20262246029286]
Uncertainty Quantification (UQ) is crucial to achieve trustworthy Machine Learning (ML)
Most UQ methods suffer from disparate and inconsistent evaluation protocols.
This opinion paper offers a new perspective by specifying those requirements through five downstream tasks.
arXiv Detail & Related papers (2022-07-27T07:50:57Z) - Learning Probabilistic Ordinal Embeddings for Uncertainty-Aware
Regression [91.3373131262391]
Uncertainty is the only certainty there is.
Traditionally, the direct regression formulation is considered and the uncertainty is modeled by modifying the output space to a certain family of probabilistic distributions.
How to model the uncertainty within the present-day technologies for regression remains an open issue.
arXiv Detail & Related papers (2021-03-25T06:56:09Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.