We consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. (J. Statist. Plann. Inference 91 (2000) 557). The population SCM is shown to be proportional to the inverse of the regular covariance matrix. The eigenvectors and standardized eigenvalues of the covariance, matrix can thus be derived from the SCM. We also construct an estimate of the covariance and correlation matrix based on the SCM. The influence functions and limiting distributions of the SCM and its eigenvectors and eigenvalues are found. Limiting efficiencies are given in multivariate normal and t-distribution cases. The estimates are highly efficient in the multivariate normal case and perform better than estimates based on the sample covarianc...
Abstract. Solving linear system of equations Ax = b enters into many scientific appli-cations. In th...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
In this paper, we apply orthogonally equivariant spatial sign covariance matrices as well as their a...
AbstractWe consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. ...
We consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. (J. Stat...
Visuri, Koivunen and Oja (2003) proposed and illustrated the use of the affine equivariant rank cova...
The asymptotic efficiency of the spatial sign covariance matrix (SSCM) relative to affine equivarian...
Vis uri et al. (20Gl) proposed and illustrated the use ofthe affine equivariant rank covariance matr...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
AbstractIn this paper, the influence functions and limiting distributions of the canonical correlati...
Publisher Copyright: This work is licensed under a Creative Commons Attribution 4.0 License. For mor...
AbstractThe asymptotic covariance matrix of the sample correlation matrix is derived in matrix form ...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
<p>(A) Eigenvalue distribution of an example population covariance matrix () computed from the van ...
The Sign Covariance Matrix is an orthogonal equivariant estimator of multivariate scale. It is often...
Abstract. Solving linear system of equations Ax = b enters into many scientific appli-cations. In th...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
In this paper, we apply orthogonally equivariant spatial sign covariance matrices as well as their a...
AbstractWe consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. ...
We consider the affine equivariant sign covariance matrix (SCM) introduced by Visuri et al. (J. Stat...
Visuri, Koivunen and Oja (2003) proposed and illustrated the use of the affine equivariant rank cova...
The asymptotic efficiency of the spatial sign covariance matrix (SSCM) relative to affine equivarian...
Vis uri et al. (20Gl) proposed and illustrated the use ofthe affine equivariant rank covariance matr...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
AbstractIn this paper, the influence functions and limiting distributions of the canonical correlati...
Publisher Copyright: This work is licensed under a Creative Commons Attribution 4.0 License. For mor...
AbstractThe asymptotic covariance matrix of the sample correlation matrix is derived in matrix form ...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
<p>(A) Eigenvalue distribution of an example population covariance matrix () computed from the van ...
The Sign Covariance Matrix is an orthogonal equivariant estimator of multivariate scale. It is often...
Abstract. Solving linear system of equations Ax = b enters into many scientific appli-cations. In th...
In this paper, the influence functions and limiting distributions of the canonical correlations and ...
In this paper, we apply orthogonally equivariant spatial sign covariance matrices as well as their a...