When inferring parameters from a Gaussian-distributed data set by computing a likelihood, a covariance matrix is needed that describes the data errors and their correlations. If the covariance matrix is not known a priori, it may be estimated and thereby becomes a random object with some intrinsic uncertainty itself. We show how to infer parameters in the presence of such an estimated covariance matrix, by marginalizing over the true covariance matrix, conditioned on its estimated value. This leads to a likelihood function that is no longer Gaussian, but rather an adapted version of a multivariate t-distribution, which has the same numerical complexity as the multivariate Gaussian. As expected, marginalization over the true covariance matri...
We consider the estimation of a Gaussian random vector x observed through a linear transformation H ...
We consider estimation of the covariance matrix of a random vector under the constraint that certain...
An exact formula of the inverse covariance matrix of an autoregressive stochastic process is obtaine...
A family of prior distributions for covariance matrices is studied. Members of the family possess th...
We introduce a distributionally robust maximum likelihood estimation model with a Wasserstein ambigu...
We consider distributed estimation of the inverse covariance matrix, also called the concentration o...
We consider estimation of the covariance matrix of a multivariate random vector under the constraint...
We consider distributed estimation of the inverse co-variance matrix, also called the concentration ...
A Bayesian approach to estimate parameters of signals embedded in complex Gaussian noise with unknow...
A Bayesian approach to estimate parameters of signals embedded in complex Gaussian noise with unknow...
Aims.The maximum-likelihood method is the standard approach to obtain model fits to observational da...
The properties of the normal distribution under linear transformation, as well the easy way to compu...
Many testing, estimation and confidence interval procedures discussed in the multivariate statistica...
In \cite{Abramovich04}, it was demonstrated that the likelihood ratio (LR) for multivariate complex ...
We present a method for estimating mean and covariance of a transformed Gaussian random variable. Th...
We consider the estimation of a Gaussian random vector x observed through a linear transformation H ...
We consider estimation of the covariance matrix of a random vector under the constraint that certain...
An exact formula of the inverse covariance matrix of an autoregressive stochastic process is obtaine...
A family of prior distributions for covariance matrices is studied. Members of the family possess th...
We introduce a distributionally robust maximum likelihood estimation model with a Wasserstein ambigu...
We consider distributed estimation of the inverse covariance matrix, also called the concentration o...
We consider estimation of the covariance matrix of a multivariate random vector under the constraint...
We consider distributed estimation of the inverse co-variance matrix, also called the concentration ...
A Bayesian approach to estimate parameters of signals embedded in complex Gaussian noise with unknow...
A Bayesian approach to estimate parameters of signals embedded in complex Gaussian noise with unknow...
Aims.The maximum-likelihood method is the standard approach to obtain model fits to observational da...
The properties of the normal distribution under linear transformation, as well the easy way to compu...
Many testing, estimation and confidence interval procedures discussed in the multivariate statistica...
In \cite{Abramovich04}, it was demonstrated that the likelihood ratio (LR) for multivariate complex ...
We present a method for estimating mean and covariance of a transformed Gaussian random variable. Th...
We consider the estimation of a Gaussian random vector x observed through a linear transformation H ...
We consider estimation of the covariance matrix of a random vector under the constraint that certain...
An exact formula of the inverse covariance matrix of an autoregressive stochastic process is obtaine...