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Auteurs principaux: Mutoh, Ayumi, Heo, Junoh
Format: Preprint
Publié: 2025
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Accès en ligne:https://arxiv.org/abs/2511.10950
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author Mutoh, Ayumi
Heo, Junoh
author_facet Mutoh, Ayumi
Heo, Junoh
contents Gaussian processes (GPs) are widely used metamodels for approximating expensive computer simulations, particularly in engineering design and spatial prediction. However, their performance can deteriorate significantly when covariance parameters are poorly estimated, highlighting the importance of accurate inference. The most common approach involves maximizing the marginal likelihood, yielding point estimates of these parameters. However, this approach is highly sensitive to initialization and optimization settings. An alternative is to adopt a fully Bayesian hierarchical framework, where the posterior distribution over the covariance parameters is inferred. This approach provides more robust uncertainty quantification and reduces sensitivity to parameter selection. Yet, a key challenge lies in the careful specification of prior distributions for these parameters. While many available software packages provide default priors, their influence on model behavior is often underexplored. Additionally, the choice of proposal distributions can also influence sampling efficiency and convergence. In this paper, we examine how different prior and proposal distributions over the lengthscale parameters $θ$ affect predictive performance in a hierarchical GP model, using both simulated and real data experiments. By evaluating various types of priors and proposals, we aim to better understand their influence on predictive accuracy and uncertainty quantification.
format Preprint
id arxiv_https___arxiv_org_abs_2511_10950
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Influence of Prior Distributions on Gaussian Process Hyperparameter Inference
Mutoh, Ayumi
Heo, Junoh
Computation
Gaussian processes (GPs) are widely used metamodels for approximating expensive computer simulations, particularly in engineering design and spatial prediction. However, their performance can deteriorate significantly when covariance parameters are poorly estimated, highlighting the importance of accurate inference. The most common approach involves maximizing the marginal likelihood, yielding point estimates of these parameters. However, this approach is highly sensitive to initialization and optimization settings. An alternative is to adopt a fully Bayesian hierarchical framework, where the posterior distribution over the covariance parameters is inferred. This approach provides more robust uncertainty quantification and reduces sensitivity to parameter selection. Yet, a key challenge lies in the careful specification of prior distributions for these parameters. While many available software packages provide default priors, their influence on model behavior is often underexplored. Additionally, the choice of proposal distributions can also influence sampling efficiency and convergence. In this paper, we examine how different prior and proposal distributions over the lengthscale parameters $θ$ affect predictive performance in a hierarchical GP model, using both simulated and real data experiments. By evaluating various types of priors and proposals, we aim to better understand their influence on predictive accuracy and uncertainty quantification.
title Influence of Prior Distributions on Gaussian Process Hyperparameter Inference
topic Computation
url https://arxiv.org/abs/2511.10950