The proposed estimator is a location and shape estimator which generalizes the L1-idea to a multivariate context. Consider a sample x1,..., xn of p-variate observations. Then the estimator is defined as the solution (µ̂, V ̂ ) that yields the minimum of the sum of the distances di(µ, V) =√ (xi − µ)′V −1(xi − µ), minimized under the constraint that V has determinant 1. The constraint det(V) = 1 implies that we will get an estimate for the shape of the data cloud. To compute these estimates we use an Iteratively Reweighted Least Squares algorithm. We can also consider the estimator (µ̂, Σ̂) which is obtained as the solution to the problem of minimizing detΣ subject to the constrain
We solve the problem of estimating the distribution of presumed i.i.d.\ observations for the total v...
The minimum volume ellipsoid (MVE) estimator is based on the smallest volume ellipsoid that covers h...
This paper presents a simple resistant estimator of multivariate location and dispersion. The DD plo...
In this note we study a multivariate extension of the median obtained by considering the median as t...
In this paper, we describe an overall strategy for robust estimation of multivariate location and sh...
The L1-median is a robust estimator of multivariate location with good statistical properties. Sever...
Estimating multivariate location and scatter with both affine equivariance and positive breakdown ha...
Consider a sample x1,..., xn from a p-variate elliptically symmetric dis-tribution with density f(x;...
Several equivariant estimators of multivariate location and scatter are studied, which are highly ro...
We propose a location estimator based on a convex linear combination of the sample mean and median. ...
AbstractA finite sample performance measure of multivariate location estimators is introduced based ...
AbstractWe construct a simple algorithm, based on Newton's method, which permits asymptotic minimiza...
We construct a simple algorithm, based on Newton's method, which permits asymptotic minimization of ...
For i.i.d. univariate observations a new estimation method, the max-imum spacing (MSP) method, was d...
AbstractExtremes in a sample of random vectors from Rd are defined as the points on the boundary of ...
We solve the problem of estimating the distribution of presumed i.i.d.\ observations for the total v...
The minimum volume ellipsoid (MVE) estimator is based on the smallest volume ellipsoid that covers h...
This paper presents a simple resistant estimator of multivariate location and dispersion. The DD plo...
In this note we study a multivariate extension of the median obtained by considering the median as t...
In this paper, we describe an overall strategy for robust estimation of multivariate location and sh...
The L1-median is a robust estimator of multivariate location with good statistical properties. Sever...
Estimating multivariate location and scatter with both affine equivariance and positive breakdown ha...
Consider a sample x1,..., xn from a p-variate elliptically symmetric dis-tribution with density f(x;...
Several equivariant estimators of multivariate location and scatter are studied, which are highly ro...
We propose a location estimator based on a convex linear combination of the sample mean and median. ...
AbstractA finite sample performance measure of multivariate location estimators is introduced based ...
AbstractWe construct a simple algorithm, based on Newton's method, which permits asymptotic minimiza...
We construct a simple algorithm, based on Newton's method, which permits asymptotic minimization of ...
For i.i.d. univariate observations a new estimation method, the max-imum spacing (MSP) method, was d...
AbstractExtremes in a sample of random vectors from Rd are defined as the points on the boundary of ...
We solve the problem of estimating the distribution of presumed i.i.d.\ observations for the total v...
The minimum volume ellipsoid (MVE) estimator is based on the smallest volume ellipsoid that covers h...
This paper presents a simple resistant estimator of multivariate location and dispersion. The DD plo...