Least squares estimation in the monotone single index model

Abstract

We study the monotone single index model where a real response variable Y is linked to a d-dimensional covariate X through the relationship E[Y | X] = 0(αT0 X) almost surely. Both the ridge function, 0, and the index parameter, α0, are unknown and the ridge function is assumed to be monotone on its interval of support. Under some regularity conditions, without imposing a particular distribution on the regression error, we show the n-1/3 rate of convergence in the 2-norm for the least squares estimator of the bundled function 0(αT0 ·), and also that of the ridge function and the index separately. Furthermore, we show that the least squares estimator is nearly parametrically rate-adaptive to piecewise constant ridge functions.