Abstract—We investigate the dynamic behavior of the sta-tionary random process defined by a central complex Wishart (CW) matrix W(t) as it varies along a certain dimension t. We characterize the second-order joint cdf of the largest eigenvalue, and the second-order joint cdf of the smallest eigenvalue of this matrix. We show that both cdfs can be expressed in exact closed-form in terms of a finite number of well-known special functions in the context of communication theory. As a direct application, we investigate the dynamic behavior of the parallel channels associated with multiple-input multiple-output (MIMO) systems in the presence of Rayleigh fading. Studying the complex random matrix that defines the MIMO channel, we characterize the ...
Abstract — In a fading environment, the statistical distribution of the mutual information of a mult...
This paper investigates the distribution of the condition number of complex Wishart matrices. Two cl...
The research of closed form expressions for the pdf of the $ith{ell}$ ordered eigenvalue of a Wisha...
Abstract — In this letter, the joint probability density function (PDF) for the eigenvalues of a com...
The eigenvalue densities of complex central Wishart matrices are investigated with the objective of ...
Random matrices play a crucial role in the design and analysis of multiple-input multiple-output (MI...
The rates of change of a wide variety of MIMO metrics are evaluated by differentiating the relevant ...
none4The rates of change of a wide variety of MIMO metrics are evaluated by differentiating the rele...
In this letter, the joint probability density function (PDF) for the eigenvalues of a complex Wishar...
Abstract—The statistical properties of Wishart matrices have been extensively used to analyze the pe...
We review some recent results on the distribution of the eigenvalues of Gaussian quadratic forms and...
The pseudo-Wishart distribution arises when a Hermitian matrix generated from a complex Gaussian ens...
Abstract—This paper investigates the distribution of the con-dition number of complex Wishart matric...
In this paper, we analyze statistical properties of the largest eigenvalue of correlated complex Wis...
In this paper, we analyze statistical properties of the largest eigenvalue of correlated complex Wis...
Abstract — In a fading environment, the statistical distribution of the mutual information of a mult...
This paper investigates the distribution of the condition number of complex Wishart matrices. Two cl...
The research of closed form expressions for the pdf of the $ith{ell}$ ordered eigenvalue of a Wisha...
Abstract — In this letter, the joint probability density function (PDF) for the eigenvalues of a com...
The eigenvalue densities of complex central Wishart matrices are investigated with the objective of ...
Random matrices play a crucial role in the design and analysis of multiple-input multiple-output (MI...
The rates of change of a wide variety of MIMO metrics are evaluated by differentiating the relevant ...
none4The rates of change of a wide variety of MIMO metrics are evaluated by differentiating the rele...
In this letter, the joint probability density function (PDF) for the eigenvalues of a complex Wishar...
Abstract—The statistical properties of Wishart matrices have been extensively used to analyze the pe...
We review some recent results on the distribution of the eigenvalues of Gaussian quadratic forms and...
The pseudo-Wishart distribution arises when a Hermitian matrix generated from a complex Gaussian ens...
Abstract—This paper investigates the distribution of the con-dition number of complex Wishart matric...
In this paper, we analyze statistical properties of the largest eigenvalue of correlated complex Wis...
In this paper, we analyze statistical properties of the largest eigenvalue of correlated complex Wis...
Abstract — In a fading environment, the statistical distribution of the mutual information of a mult...
This paper investigates the distribution of the condition number of complex Wishart matrices. Two cl...
The research of closed form expressions for the pdf of the $ith{ell}$ ordered eigenvalue of a Wisha...