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Main Authors: Xiao, Xingyao, Rabe-Hesketh, Sophia
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.27844
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author Xiao, Xingyao
Rabe-Hesketh, Sophia
author_facet Xiao, Xingyao
Rabe-Hesketh, Sophia
contents The classic Deviance Information Criterion (DIC) is not invariant to reparameterization and can have a negative and unstable effective number of parameters. The reason for the effective number of parameters being negative is actually that the plug-in deviance becomes excessively large when the posterior means of the model parameter differ dramatically from the maximum likelihood estimates. In latent variable models, the cause can be identifiability issues that lead to meaningless and unstable plug-in estimates. Specifically, nonidentifiability means that distinct parameter points can have the same likelihood and switching between such points within or between MCMC chains produces unstable and meaningless posterior means. To address this issue, we propose a plug-in-free, parameterization-invariant version of the DIC, denoted DIC$_i$, and show that it is asymptotically equivalent to the Watanabe-Akaike Information Criterion (WAIC). Simulations demonstrate that DIC$_i$ aligns with WAIC in factor analysis and growth mixture models where the classic DIC breaks down. These results suggest that DIC$_i$ is a useful, computationally efficient alternative to the DIC when WAIC is not applicable or not available.
format Preprint
id arxiv_https___arxiv_org_abs_2605_27844
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle A Parameterization-Invariant DIC
Xiao, Xingyao
Rabe-Hesketh, Sophia
Methodology
The classic Deviance Information Criterion (DIC) is not invariant to reparameterization and can have a negative and unstable effective number of parameters. The reason for the effective number of parameters being negative is actually that the plug-in deviance becomes excessively large when the posterior means of the model parameter differ dramatically from the maximum likelihood estimates. In latent variable models, the cause can be identifiability issues that lead to meaningless and unstable plug-in estimates. Specifically, nonidentifiability means that distinct parameter points can have the same likelihood and switching between such points within or between MCMC chains produces unstable and meaningless posterior means. To address this issue, we propose a plug-in-free, parameterization-invariant version of the DIC, denoted DIC$_i$, and show that it is asymptotically equivalent to the Watanabe-Akaike Information Criterion (WAIC). Simulations demonstrate that DIC$_i$ aligns with WAIC in factor analysis and growth mixture models where the classic DIC breaks down. These results suggest that DIC$_i$ is a useful, computationally efficient alternative to the DIC when WAIC is not applicable or not available.
title A Parameterization-Invariant DIC
topic Methodology
url https://arxiv.org/abs/2605.27844