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Meta-regression with DisMod-MR: how robust is the model?
Abstract Background The Global Burden of Disease, Injuries, and Risk Factors Study 2010 (GBD 2010) required age-specific prevalence estimates for over 300 outcomes for all countries. Results of systematic reviews were often very sparse and noisy, so DisMod-MR was frequently used to combine all avail...
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Published in: | The Lancet (British edition) 2013-06, Vol.381 (S2), p.S110-S110 |
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Main Authors: | , |
Format: | Article |
Language: | English |
Subjects: | |
Citations: | Items that cite this one |
Online Access: | Get full text |
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Summary: | Abstract Background The Global Burden of Disease, Injuries, and Risk Factors Study 2010 (GBD 2010) required age-specific prevalence estimates for over 300 outcomes for all countries. Results of systematic reviews were often very sparse and noisy, so DisMod-MR was frequently used to combine all available data and create estimates. We investigated the robustness of this approach by comparing the negative binomial rate model to alternative rate models using out-of-sample predictive validity. Methods We compared all disease and injury models analysed with DisMod-MR from GBD 2010 with more than four prevalence data points in western Europe. For each disease/injury model, western European prevalence data were partitioned into random 75/25% train/test splits for 1000 replicates. We fitted an age-specific rate model to the training data and used the results to predict values for the test data for each replicate. We compared the bias, median absolute error (MAE), and percent coverage for each replicate to determine if the negative binomial, binomial, normal, or lognormal rate model was superior for each condition. Findings Each metric has its own superior rate model. The lognormal model had the most replicates with smallest bias. The binomial model had the most with minimum MAE. The negative binomial model had the percent coverage closest to the target coverage of 95%. Interpretation Depending on the metric, different rate models are superior. The negative binomial model provides an appealing balance of accuracy, precision, and calibration. Funding Bill & Melinda Gates Foundation. |
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ISSN: | 0140-6736 1474-547X |
DOI: | 10.1016/S0140-6736(13)61364-1 |