English

Efficient estimation of conditional covariance matrices for dimension reduction

Statistics Theory 2014-08-21 v4 Methodology Statistics Theory

Abstract

Let XRp\boldsymbol{X}\in \mathbb{R}^p and YRY\in \mathbb{R}. In this paper we propose an estimator of the conditional covariance matrix, Cov(E[XY])\mathrm{Cov}(\mathbb{E}[\boldsymbol{X}\vert Y]), in an inverse regression setting. Based on the estimation of a quadratic functional, this methodology provides an efficient estimator from a semi parametric point of view. We consider a functional Taylor expansion of Cov(E[XY])\mathrm{Cov}(\mathbb{E}[\boldsymbol{X}\vert Y]) under some mild conditions and the effect of using an estimate of the unknown joint distribution. The asymptotic properties of this estimator are also provided.

Keywords

Cite

@article{arxiv.1110.3238,
  title  = {Efficient estimation of conditional covariance matrices for dimension reduction},
  author = {Sébastien Da Veiga and Jean-Michel Loubes and Maikol Solís},
  journal= {arXiv preprint arXiv:1110.3238},
  year   = {2014}
}
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