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LASSO ISOtone for High Dimensional Additive Isotonic Regression

Abstract:
Additive isotonic regression attempts to determine the relationship between a multi-dimensional observation variable and a response, under the constraint that the estimate is the additive sum of univariate component effects that are monotonically increasing. In this article, we present a new method for such regression called LASSO Isotone (LISO). LISO adapts ideas from sparse linear modelling to additive isotonic regression. Thus, it is viable in many situations with high dimensional predictor variables, where selection of significant versus insignificant variables are required. We suggest an algorithm involving a modification of the backfitting algorithm CPAV. We give a numerical convergence result, and finally examine some of its properties through simulations. We also suggest some possible extensions that improve performance, and allow calculation to be carried out when the direction of the monotonicity is unknown.
Publication status:
Published

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Publisher copy:
10.1198/jcgs.2011.10095

Authors

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Institution:
University of Oxford
Division:
MPLS
Department:
Statistics
Role:
Author


Journal:
JOURNAL OF COMPUTATIONAL AND GRAPHICAL STATISTICS More from this journal
Volume:
21
Issue:
1
Pages:
72-91
Publication date:
2010-06-15
DOI:
EISSN:
1537-2715
ISSN:
1061-8600


Language:
English
Keywords:
Pubs id:
pubs:97845
UUID:
uuid:85da0771-ea71-4734-bf71-5d16938633d6
Local pid:
pubs:97845
Source identifiers:
97845
Deposit date:
2012-12-19
ARK identifier:

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