Abstract
In this paper we study sparse high dimensional additive partial linear models with
nonparametric additive components of heterogeneous smoothness. We review several existing algo-
rithms that have been developed for this problem in the recent literature, highlighting the connec-
tions between them, and present some computationally efficient algorithms for fitting such models.
To achieve optimal rates in large sample situations we use hybrid P-splines and block wavelet penal-
isation techniques combined with adaptive (group) LASSO-like procedures for selecting the additive
components in the nonparametric part of the models. Hence, the component selection and estimation
in the nonparametric part may be viewed as a functional version of estimation and grouped variable
selection. This allows to take advantage of several oracle results which yield asymptotic optimality
of estimators in high-dimensional but sparse additive models. Numerical implementations of our
procedures for proximal like algorithms are discussed. Large sample properties of the estimates and
of the model selection are presented and the results are illustrated with simulated examples and a
real data analysis.
Anno
2017
Autori IAC
Tipo pubblicazione
Altri Autori
Umberto Amato
Anestis Antoniadis
Italia De Feis
Yannig Goude
Anestis Antoniadis
Italia De Feis
Yannig Goude
Editore
South African Statistical Association.
Rivista
South African statistical journal (Online)