We introduce a class of robust estimates for multivariate linear models. The regression coefficients and the covariance matrix of the errors are estimated simultaneously by minimizing the determinant of the covariance matrix estimate, subject to a constraint on a robust scale of the Mahalanobis norms of the residuals. By choosing a [tau]-estimate as a robust scale, the resulting estimates combine good robustness properties and asymptotic efficiency under Gaussian errors. These estimates are asymptotically normal and in the case where the errors have an elliptical distribution, their asymptotic covariance matrix differs only by a scalar factor from the one corresponding to the maximum likelihood estimate. We derive the influence curve and pr...
This paper studies robust estimation of multivariate regression model using kernel weighted local li...
We consider robust covariance estimation with an emphasis on Tyler\u27s M-estimator. This method pro...
In this paper, we propose a new family of robust regression estimators, which we call bounded residu...
AbstractWe introduce a class of robust estimates for multivariate linear models. The regression coef...
We propose a class of robust estimates for multivariate linear models. Based on the approach of MM-e...
AbstractWe propose a class of robust estimates for multivariate linear models. Based on the approach...
Several problems emerging with the studentization of M-estimators of regression model are briefly di...
We introduce a robust method for multivariate regression based on robust estimation of the joint loc...
Robustness and eciency of the residual scale estimators in the regression model is important for rob...
En esta tesis, proponemos una clase de estimadores robustos para modelos lineales multivariados. Bas...
A reasonable approach to robust regression estimation is minimizing a robust scale estimator of the...
Model robustness has become increasingly popular in recent decades. We study multiple aspects of rob...
An S-estimator of multivariate location and scale minimizes the determinant of the covariance matrix...
Mixed linear models are used to analyze data in many settings. These models have a multivariate norm...
In the linear model Xn - 1 = Cn - p[theta]p - 1 + En - 1, Huber's theory of robust estimation of the...
This paper studies robust estimation of multivariate regression model using kernel weighted local li...
We consider robust covariance estimation with an emphasis on Tyler\u27s M-estimator. This method pro...
In this paper, we propose a new family of robust regression estimators, which we call bounded residu...
AbstractWe introduce a class of robust estimates for multivariate linear models. The regression coef...
We propose a class of robust estimates for multivariate linear models. Based on the approach of MM-e...
AbstractWe propose a class of robust estimates for multivariate linear models. Based on the approach...
Several problems emerging with the studentization of M-estimators of regression model are briefly di...
We introduce a robust method for multivariate regression based on robust estimation of the joint loc...
Robustness and eciency of the residual scale estimators in the regression model is important for rob...
En esta tesis, proponemos una clase de estimadores robustos para modelos lineales multivariados. Bas...
A reasonable approach to robust regression estimation is minimizing a robust scale estimator of the...
Model robustness has become increasingly popular in recent decades. We study multiple aspects of rob...
An S-estimator of multivariate location and scale minimizes the determinant of the covariance matrix...
Mixed linear models are used to analyze data in many settings. These models have a multivariate norm...
In the linear model Xn - 1 = Cn - p[theta]p - 1 + En - 1, Huber's theory of robust estimation of the...
This paper studies robust estimation of multivariate regression model using kernel weighted local li...
We consider robust covariance estimation with an emphasis on Tyler\u27s M-estimator. This method pro...
In this paper, we propose a new family of robust regression estimators, which we call bounded residu...