Model-Based Recursive Partitioning

Recursive partitioning is embedded into the general and well-established class of parametric models that can be fitted using M-type estimators (including maximum likelihood). An algorithm for model-based recursive partitioning is suggested for which the basic steps are: (1) fit a parametric model to...

Full description

Saved in:
Bibliographic Details
Published inJournal of computational and graphical statistics Vol. 17; no. 2; pp. 492 - 514
Main Authors Zeileis, Achim, Hothorn, Torsten, Hornik, Kurt
Format Journal Article
LanguageEnglish
Published Alexandria Taylor & Francis 01.06.2008
American Statistical Association, Institute of Mathematical Statistics, and Interface Foundation of North America
Taylor & Francis Ltd
Subjects
Algorithms
Change points
Datasets
Economic fluctuations
Economic models
Linear regression
Machine learning
Mathematical independent variables
Maximum likelihood
Maximum likelihood method
Modeling
Objective functions
Parameter estimation
Parameter instability
Parametric models
Regression analysis
Studies
Online AccessGet full text

Cover

More Information
Summary:Recursive partitioning is embedded into the general and well-established class of parametric models that can be fitted using M-type estimators (including maximum likelihood). An algorithm for model-based recursive partitioning is suggested for which the basic steps are: (1) fit a parametric model to a dataset; (2) test for parameter instability over a set of partitioning variables; (3) if there is some overall parameter instability, split the model with respect to the variable associated with the highest instability; (4) repeat the procedure in each of the daughter nodes. The algorithm yields a partitioned (or segmented) parametric model that can be effectively visualized and that subject-matter scientists are used to analyzing and interpreting.
Bibliography:SourceType-Scholarly Journals-1
ObjectType-Feature-1
content type line 14
ISSN:1061-8600
1537-2715
DOI:10.1198/106186008X319331