Efficient Estimation of the Central Mean Subspace via Smoothed Gradient Outer Products

Abstract

We consider the problem of sufficient dimension reduction (SDR) for multi-index models. The estimators of the central mean subspace in prior works either have slow (non-parametric) convergence rates, or rely on stringent distributional conditions (e.g., the covariate distribution PX being elliptical symmetric). In this paper, we show that a fast parametric convergence rate of form Cd · n-1/2 is achievable via estimating the expected smoothed gradient outer product, for a general class of distribution PX admitting Gaussian or heavier distributions. When the link function is a polynomial with a degree of at most r and PX is the standard Gaussian, we show that the prefactor depends on the ambient dimension d as Cd dr.

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