The additive model with different smoothness for the components

Abstract

We consider an additive regression model consisting of two components f0 and g0, where the first component f0 is in some sense "smoother" than the second g0. Smoothness is here described in terms of a semi-norm on the class of regression functions. We use a penalized least squares estimator ( f, g) of (f0, g0) and show that the rate of convergence for f is faster than the rate of convergence for g. In fact, both rates are generally as fast as in the case where one of the two components is known. The theory is illustrated by a simulation study. Our proofs rely on recent results from empirical process theory.