English

Distribution-Free Location-Scale Regression

Methodology 2023-12-21 v4

Abstract

We introduce a generalized additive model for location, scale, and shape (GAMLSS) next of kin aiming at distribution-free and parsimonious regression modelling for arbitrary outcomes. We replace the strict parametric distribution formulating such a model by a transformation function, which in turn is estimated from data. Doing so not only makes the model distribution-free but also allows to limit the number of linear or smooth model terms to a pair of location-scale predictor functions. We derive the likelihood for continuous, discrete, and randomly censored observations, along with corresponding score functions. A plethora of existing algorithms is leveraged for model estimation, including constrained maximum-likelihood, the original GAMLSS algorithm, and transformation trees. Parameter interpretability in the resulting models is closely connected to model selection. We propose the application of a novel best subset selection procedure to achieve especially simple ways of interpretation. All techniques are motivated and illustrated by a collection of applications from different domains, including crossing and partial proportional hazards, complex count regression, non-linear ordinal regression, and growth curves. All analyses are reproducible with the help of the "tram" add-on package to the R system for statistical computing and graphics.

Keywords

Cite

@article{arxiv.2208.05302,
  title  = {Distribution-Free Location-Scale Regression},
  author = {Sandra Siegfried and Lucas Kook and Torsten Hothorn},
  journal= {arXiv preprint arXiv:2208.05302},
  year   = {2023}
}
R2 v1 2026-06-25T01:37:21.090Z