Profile least squares estimators in the monotone single index model

Abstract

We consider least squares estimators of the finite regression parameter α in the single index regression model Y=(αT X)+ε, where X is a d-dimensional random vector, (Y|X)=(αT X), and where is monotone. It has been suggested to estimate α by a profile least squares estimator, minimizing Σi=1n(Yi-(αT Xi))2 over monotone and α on the boundary Sd-1of the unit ball. Although this suggestion has been around for a long time, it is still unknown whether the estimate is n convergent. We show that a profile least squares estimator, using the same pointwise least squares estimator for fixed α, but using a different global sum of squares, is n-convergent and asymptotically normal. The difference between the corresponding loss functions is studied and also a comparison with other methods is given.