Ordinal regression models made easy: A tutorial on parameter interpretation, data simulation and power analysis

Ordinal data such as Likert items, ratings or generic ordered variables are widespread in psychology. These variables are usually analysed using metric models (e.g., standard linear regression) with important drawbacks in terms of statistical inference (reduced power and increased type‐1 error) and...

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Bibliographic Details
Published in:International journal of psychology 2024-12, Vol.59 (6), p.1263-1292
Main Authors: Gambarota, Filippo, Altoè, Gianmarco
Format: Article
Language:English
Subjects:
Computer Simulation
Data Interpretation, Statistical
Humans
Models, Statistical
Monte Carlo simulations
Ordinal measurement
Ordinal regression
Power analysis
Power structure
Psychology
Regression Analysis
Simulation
Statistical inference
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Summary:Ordinal data such as Likert items, ratings or generic ordered variables are widespread in psychology. These variables are usually analysed using metric models (e.g., standard linear regression) with important drawbacks in terms of statistical inference (reduced power and increased type‐1 error) and prediction. One possible reason for not using ordinal regression models could be difficulty in understanding parameters or conducting a power analysis. The tutorial aims to present ordinal regression models using a simulation‐based approach. Firstly, we introduced the general model highlighting crucial components and assumptions. Then, we explained how to interpret parameters for a logit and probit model. Then we proposed two ways for simulating data as a function of predictors showing a 2 × 2 interaction with categorical predictors and the interaction between a numeric and categorical predictor. Finally, we showed an example of power analysis using simulations that can be easily extended to complex models with multiple predictors. The tutorial is supported by a collection of custom R functions developed to simulate and understand ordinal regression models. The code to reproduce the proposed simulation, the custom R functions and additional examples of ordinal regression models can be found on the online Open Science Framework repository ( https://osf.io/93h5j).
ISSN:0020-7594
1464-066X
1464-066X
DOI:10.1002/ijop.13243