A novel modeling framework for ordinal data defined by collapsed counts |
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Authors: | James S McGinley Patrick J Curran Donald Hedeker |
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Institution: | 1. McGinley Statistical Consulting, LLC, North Huntingdon, PA, U.S.A.;2. Department of Psychology, University of North Carolina at Chapel Hill, Chapel Hill, NC, U.S.A.;3. Department of Public Health Sciences, University of Chicago, Chicago, IL, U.S.A. |
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Abstract: | Adolescent alcohol use is a serious public health concern. Despite advances in the theoretical conceptualization of pathways to alcohol use, researchers are limited by the statistical techniques currently available. Researchers often fit linear models and restrictive categorical models (e.g., proportional odds models) to ordinal data with many response categories defined by collapsed count data (0 drinking days, 1–2days, 3–6days, etc.). Consequently, existing models ignore the underlying count process, resulting in disjoint between the construct of interest and the models being fitted. Our proposed ordinal modeling approach overcomes this limitation by explicitly linking ordinal responses to a suitable underlying count distribution. In doing so, researchers can use maximum likelihood estimation to fit count models to ordinal data as if they had directly observed the underlying discrete counts. The usefulness of our ordinal negative binomial and ordinal zero‐inflated negative binomial models is verified by simulation studies. We also demonstrate our approach using real empirical data from the 2010 National Survey of Drug Use and Health. Results show the benefit of the proposed ordinal modeling framework compared with existing methods. Copyright © 2015 John Wiley & Sons, Ltd. |
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Keywords: | ordinal data count data grouped counts collapsed counts ordinal‐count zero inflation |
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