Document Type
Article
Publication Date
10-2006
Abstract
In multivariate regression, interest lies on how the response vector depends on a set of covariates. A multivariate regression model is proposed where the covariates explain variation in the response only in the direction of the first principal component axis. This model is not only parsimonious, but it provides an easy interpretation in allometric growth studies where the first principal component of the log-transformed data corresponds to constants of allometric growth. The proposed model naturally generalizes the two–group allometric extension model to the situation where groups differ according to a set of covariates. A bootstrap test for the model is proposed and a study on plant growth in the Florida Everglades is used to illustrate the model.
Repository Citation
Tarpey, T.,
& Ivey, C. T.
(2006). Allometric Extension for Multivariate Regression Models. Journal of Data Science, 4 (4), 387-398.
https://corescholar.libraries.wright.edu/math/202