English

One-Step R-Estimation in Linear Models with Stable Errors

Methodology 2012-10-19 v1 Statistics Theory Statistics Theory

Abstract

Classical estimation techniques for linear models either are inconsistent, or perform rather poorly, under α\alpha-stable error densities; most of them are not even rate-optimal. In this paper, we propose an original one-step R-estimation method and investigate its asymptotic performances under stable densities. Contrary to traditional least squares, the proposed R-estimators remain root-nn consistent (the optimal rate) under the whole family of stable distributions, irrespective of their asymmetry and tail index. While parametric stable-likelihood estimation, due to the absence of a closed form for stable densities, is quite cumbersome, our method allows us to construct estimators reaching the parametric efficiency bounds associated with any prescribed values (α0, b0)(\alpha_0, \ b_0) of the tail index α\alpha and skewness parameter bb, while preserving root-nn consistency under any (α, b)(\alpha, \ b) as well as under usual light-tailed densities. The method furthermore avoids all forms of multidimensional argmin computation. Simulations confirm its excellent finite-sample performances.

Keywords

Cite

@article{arxiv.1210.5073,
  title  = {One-Step R-Estimation in Linear Models with Stable Errors},
  author = {Marc Hallin and Yvik Swan and Thomas Verdebout and David Veredas},
  journal= {arXiv preprint arXiv:1210.5073},
  year   = {2012}
}
R2 v1 2026-06-21T22:24:01.952Z