AbstractIn this paper, the authors derived exact central distributions of the extreme roots of the Wishart and MANOVA matrices. The expressions for these distributions and the associated probability integrals are written as linear combinations of the products of certain double integrals. The double integrals encountered can be evaluated without any difficulty
AbstractA simple relationship is given between the exact null distribution gm,n(J) of the J-th large...
AbstractAsymptotic expansions are given for the density function of the normalized latent roots of S...
AbstractLet W be a correlated complex non-central Wishart matrix defined through W=XHX, where X is a...
In this paper, the authors derived exact central distributions of the extreme roots of the Wishart a...
AbstractIn this paper, the authors derived exact central distributions of the extreme roots of the W...
AbstractIn this paper, the authors cosider the derivation of the exact distributions of the ratios o...
AbstractIn this paper, the authors derived exact expressions for the joint marginal densities of any...
Exact distributions extreme roots noncentral Wishart matrix MANOVA matrix canonical correlation matr...
AbstractIn this paper, the authors consider the evaluation of the distribution functions of the rati...
This paper tabulates the distribution of the largest and smallest characteristic roots of a Wishart ...
A simple relationship is given between the exact null distribution gm,n(J) of the J-th largest laten...
AbstractAsymptotic expansions of the joint distributions of the latent roots of the Wishart matrix a...
The study of the statistical distribution of the eigenvalues of Wishart matrices finds application i...
In this paper we study the distribution of the scaled largest eigenvalue of complex Wishart matrices...
Let W be a correlated complex non-central Wishart matrix defined through W = X(H)X, where X is an n ...
AbstractA simple relationship is given between the exact null distribution gm,n(J) of the J-th large...
AbstractAsymptotic expansions are given for the density function of the normalized latent roots of S...
AbstractLet W be a correlated complex non-central Wishart matrix defined through W=XHX, where X is a...
In this paper, the authors derived exact central distributions of the extreme roots of the Wishart a...
AbstractIn this paper, the authors derived exact central distributions of the extreme roots of the W...
AbstractIn this paper, the authors cosider the derivation of the exact distributions of the ratios o...
AbstractIn this paper, the authors derived exact expressions for the joint marginal densities of any...
Exact distributions extreme roots noncentral Wishart matrix MANOVA matrix canonical correlation matr...
AbstractIn this paper, the authors consider the evaluation of the distribution functions of the rati...
This paper tabulates the distribution of the largest and smallest characteristic roots of a Wishart ...
A simple relationship is given between the exact null distribution gm,n(J) of the J-th largest laten...
AbstractAsymptotic expansions of the joint distributions of the latent roots of the Wishart matrix a...
The study of the statistical distribution of the eigenvalues of Wishart matrices finds application i...
In this paper we study the distribution of the scaled largest eigenvalue of complex Wishart matrices...
Let W be a correlated complex non-central Wishart matrix defined through W = X(H)X, where X is an n ...
AbstractA simple relationship is given between the exact null distribution gm,n(J) of the J-th large...
AbstractAsymptotic expansions are given for the density function of the normalized latent roots of S...
AbstractLet W be a correlated complex non-central Wishart matrix defined through W=XHX, where X is a...
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