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Center-Outward R-Estimation for Semiparametric VARMA Models

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<mark>Journal publication date</mark>30/06/2022
<mark>Journal</mark>Journal of the American Statistical Association
Issue number538
Volume117
Number of pages14
Pages (from-to)925-938
Publication StatusPublished
Early online date7/12/20
<mark>Original language</mark>English

Abstract

We propose a new class of R-estimators for semiparametric VARMA models in which the innovation density plays the role of the nuisance parameter. Our estimators are based on the novel concepts of multivariate center-outward ranks and signs. We show that these concepts, combined with Le Cam's asymptotic theory of statistical experiments, yield a class of semiparametric estimation procedures, which are efficient (at a given reference density), root-$n$ consistent, and asymptotically normal under a broad class of (possibly non elliptical) actual innovation densities. No kernel density estimation is required to implement our procedures. A Monte Carlo comparative study of our R-estimators and other routinely-applied competitors demonstrates the benefits of the novel methodology, in large and small sample. Proofs, computational aspects, and further numerical results are available in the supplementary material.