Open AccessRandom intercept and linear mixed models including heteroscedasticity in a logarithmic scale: Correction terms and prediction in the original scale
Author(s) -
Ricardo RamírezAldana,
Lizbeth Naranjo
Publication year - 2021
Publication title -
plos one
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.99
H-Index - 332
ISSN - 1932-6203
DOI - 10.1371/journal.pone.0249910
Subject(s) - heteroscedasticity , logarithm , logarithmic scale , statistics , scale (ratio) , mathematics , inference , random variable , variable (mathematics) , random effects model , linear model , computer science , mathematical analysis , physics , artificial intelligence , medicine , meta analysis , quantum mechanics , acoustics
Random intercept models are linear mixed models (LMM) including error and intercept random effects. Sometimes heteroscedasticity is included and the response variable is transformed into a logarithmic scale, while inference is required in the original scale; thus, the response variable has a log-normal distribution. Hence, correction terms should be included to predict the response in the original scale. These terms multiply the exponentiated predicted response variable, which subestimates the real values. We derive the correction terms, simulations and real data about the income of elderly are presented to show the importance of using them to obtain more accurate predictions. Generalizations for any LMM are also presented.