Constrained M-estimators for regression were introduced by Mendes and Tyler in 1995 as an alternative class of robust regression estimators with high breakdown point and high asymptotic efficiency. To compute the CM-estimate, the global minimum of an objective function with an inequality constraint has to be localized. To find the S-estimate for the same problem, we instead restrict ourselves to the boundary of the feasible region. The algorithm presented for computing CM-estimates can easily be modified to compute S-estimates as well. Testing is carried out with a comparison to the algorithm SURREAL by Ruppert
AbstractThis paper extends the results of Chen and Wu [1] concerning consistency of M-estimators in ...
A new class of estimates for the linear model is introduced. These estimates, that we call C-estimat...
A straightforward application of the method of maximum likelihood to a mixture of normal distributio...
Constrained M-estimators for regression were introduced by Mendes and Tyler in 1995 as an alternativ...
Constrained M (CM) estimates of multivariate location and scatter [Kent, J. T., Tyler, D. E. (1996)....
In this paper, the constrained M-estimation of the regression coefficients and scatter parameters in...
This paper describes how to use the Matlab software package CMregr, and also gives some limited info...
We propose a unified framework for establishing existence of nonparametic M-estimators, computing th...
We discuss the relation between S-estimators and M-estimators of multivariate location and covarianc...
A maximum likelihood (ML) estimation procedure is developed to find the mean of the exponential fami...
This thesis is devoted to algorithms for solving two optimization problems, using linear M-estimatio...
The effects of over- and underfitting the regression model is studied for M-estimators. Applying now...
We consider, in the modern setting of high-dimensional statistics, the classic problem of optimizing...
Most of statistical procedures consist in estimating parameters by minimizing (or maximizing) some c...
The authors consider the M-type estimators of regression function and show their almost-sure consist...
AbstractThis paper extends the results of Chen and Wu [1] concerning consistency of M-estimators in ...
A new class of estimates for the linear model is introduced. These estimates, that we call C-estimat...
A straightforward application of the method of maximum likelihood to a mixture of normal distributio...
Constrained M-estimators for regression were introduced by Mendes and Tyler in 1995 as an alternativ...
Constrained M (CM) estimates of multivariate location and scatter [Kent, J. T., Tyler, D. E. (1996)....
In this paper, the constrained M-estimation of the regression coefficients and scatter parameters in...
This paper describes how to use the Matlab software package CMregr, and also gives some limited info...
We propose a unified framework for establishing existence of nonparametic M-estimators, computing th...
We discuss the relation between S-estimators and M-estimators of multivariate location and covarianc...
A maximum likelihood (ML) estimation procedure is developed to find the mean of the exponential fami...
This thesis is devoted to algorithms for solving two optimization problems, using linear M-estimatio...
The effects of over- and underfitting the regression model is studied for M-estimators. Applying now...
We consider, in the modern setting of high-dimensional statistics, the classic problem of optimizing...
Most of statistical procedures consist in estimating parameters by minimizing (or maximizing) some c...
The authors consider the M-type estimators of regression function and show their almost-sure consist...
AbstractThis paper extends the results of Chen and Wu [1] concerning consistency of M-estimators in ...
A new class of estimates for the linear model is introduced. These estimates, that we call C-estimat...
A straightforward application of the method of maximum likelihood to a mixture of normal distributio...