|
|||||
|
|
Circular interpretation of regression coefficients |
|
| Authors: | Jolien Cremers Kees Tim Mulder Irene Klugkist |
| Affiliation: | 1. Department of Methodology and Statistics, Utrecht University, The Netherlands;2. Department of Methodology and Statistics, Utrecht University, The Netherlands Research Methodology, Measurement and Data Analysis, Behavioural Sciences, University of Twente, Enschede, The Netherlands |
| Abstract: | The interpretation of the effect of predictors in projected normal regression models is not straight-forward. The main aim of this paper is to make this interpretation easier such that these models can be employed more readily by social scientific researchers. We introduce three new measures: the slope at the inflection point (bc), average slope (AS) and slope at mean (SAM) that help us assess the marginal effect of a predictor in a Bayesian projected normal regression model. The SAM or AS are preferably used in situations where the data for a specific predictor do not lie close to the inflection point of a circular regression curve. In this case bc is an unstable and extrapolated effect. In addition, we outline how the projected normal regression model allows us to distinguish between an effect on the mean and spread of a circular outcome variable. We call these types of effects location and accuracy effects, respectively. The performance of the three new measures and of the methods to distinguish between location and accuracy effects is investigated in a simulation study. We conclude that the new measures and methods to distinguish between accuracy and location effects work well in situations with a clear location effect. In situations where the location effect is not clearly distinguishable from an accuracy effect not all measures work equally well and we recommend the use of the SAM. |
| Keywords: | Bayesian analysis circular regression projected normal distribution |