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Main Authors: Chaudhuri, Sanjay, Dustin, Dean, Clarke, Bertrand
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.19804
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author Chaudhuri, Sanjay
Dustin, Dean
Clarke, Bertrand
author_facet Chaudhuri, Sanjay
Dustin, Dean
Clarke, Bertrand
contents We use the law of total variance to generate multiple expansions for the posterior predictive variance. These expansions are sums of terms involving conditional expectations and conditional variances and provide a quantification of the sources of predictive uncertainty. Since the posterior predictive variance is fixed given the model, it represents a constant quantity that is conserved over these expansions. The terms in the expansions can be assessed in absolute or relative sense to understand the main contributors to the length of prediction intervals. We quantify the term-wise uncertainty across expansions varying in the number of terms and the order of conditionates. In particular, given that a specific term in one expansion is small or zero, we identify the other terms in other expansions that must also be small or zero. We illustrate this approach to predictive model assessment in several well-known models.
format Preprint
id arxiv_https___arxiv_org_abs_2603_19804
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Uncertainty Quantification Via the Posterior Predictive Variance
Chaudhuri, Sanjay
Dustin, Dean
Clarke, Bertrand
Statistics Theory
Machine Learning
62F15, 62J10
We use the law of total variance to generate multiple expansions for the posterior predictive variance. These expansions are sums of terms involving conditional expectations and conditional variances and provide a quantification of the sources of predictive uncertainty. Since the posterior predictive variance is fixed given the model, it represents a constant quantity that is conserved over these expansions. The terms in the expansions can be assessed in absolute or relative sense to understand the main contributors to the length of prediction intervals. We quantify the term-wise uncertainty across expansions varying in the number of terms and the order of conditionates. In particular, given that a specific term in one expansion is small or zero, we identify the other terms in other expansions that must also be small or zero. We illustrate this approach to predictive model assessment in several well-known models.
title Uncertainty Quantification Via the Posterior Predictive Variance
topic Statistics Theory
Machine Learning
62F15, 62J10
url https://arxiv.org/abs/2603.19804