TY - JOUR
T1 - Intrinsic Data Depth for Hermitian Positive Definite Matrices
AU - Chau, Joris
AU - Ombao, Hernando
AU - von Sachs, Rainer
N1 - KAUST Repository Item: Exported on 2020-10-01
Acknowledgements: The authors gratefully acknowledge financial support from the following agencies and projects: the Belgian Fund for Scientific Research FRIA/FRS-FNRS (J. Chau), the contract “Projet d’Actions de Recherche Concertées” No. 12/17-045 of the “Communauté française de Belgique” (R. von Sachs), IAP research network P7/06 of the Belgian government (R. von Sachs), the US National Science Foundation and KAUST (H. Ombao). We thank Lieven Desmet and the SMCS/UCL for providing access to the clinical trial data, and two anonymous referees for their suggestions that helped to improve the presentation of this work. Computational resources have been provided by the CISM/UCL and the CÉCI funded by the FRS-FNRS.
PY - 2018/11/28
Y1 - 2018/11/28
N2 - Nondegenerate covariance, correlation, and spectral density matrices are necessarily symmetric or Hermitian and positive definite. This article develops statistical data depths for collections of Hermitian positive definite matrices by exploiting the geometric structure of the space as a Riemannian manifold. The depth functions allow one to naturally characterize most central or outlying matrices, but also provide a practical framework for inference in the context of samples of positive definite matrices. First, the desired properties of an intrinsic data depth function acting on the space of Hermitian positive definite matrices are presented. Second, we propose two pointwise and integrated data depth functions that satisfy each of these requirements and investigate several robustness and efficiency aspects. As an application, we construct depth-based confidence regions for the intrinsic mean of a sample of positive definite matrices, which is applied to the exploratory analysis of a collection of covariance matrices in a multicenter clinical trial. Supplementary materials and an accompanying R-package are available online.
AB - Nondegenerate covariance, correlation, and spectral density matrices are necessarily symmetric or Hermitian and positive definite. This article develops statistical data depths for collections of Hermitian positive definite matrices by exploiting the geometric structure of the space as a Riemannian manifold. The depth functions allow one to naturally characterize most central or outlying matrices, but also provide a practical framework for inference in the context of samples of positive definite matrices. First, the desired properties of an intrinsic data depth function acting on the space of Hermitian positive definite matrices are presented. Second, we propose two pointwise and integrated data depth functions that satisfy each of these requirements and investigate several robustness and efficiency aspects. As an application, we construct depth-based confidence regions for the intrinsic mean of a sample of positive definite matrices, which is applied to the exploratory analysis of a collection of covariance matrices in a multicenter clinical trial. Supplementary materials and an accompanying R-package are available online.
UR - http://hdl.handle.net/10754/631388
UR - https://www.tandfonline.com/doi/full/10.1080/10618600.2018.1537926
UR - http://www.scopus.com/inward/record.url?scp=85061272986&partnerID=8YFLogxK
U2 - 10.1080/10618600.2018.1537926
DO - 10.1080/10618600.2018.1537926
M3 - Article
SN - 1061-8600
VL - 28
SP - 427
EP - 439
JO - Journal of Computational and Graphical Statistics
JF - Journal of Computational and Graphical Statistics
IS - 2
ER -