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Paper detail

Estimation for the Linear Model with Uncertain Covariance Matrices

We derive a maximum a posteriori estimator for the linear observation model, where the signal and noise covariance matrices are both uncertain. The uncertainties are treated probabilistically by modeling the covariance matrices with prior inverse-Wishart distributions. The nonconvex problem of jointly estimating the signal of interest and the covariance matrices is tackled by a computationally efficient fixed-point iteration as well as an approximate variational Bayes solution. The statistical performance of estimators is compared numerically to state-of-the-art estimators from the literature and shown to perform favorably.

preprint2014arXivOpen access
Dave ZachariahNafiseh ShariatiMats BengtssonMagnus JanssonSaikat Chatterjee
math.STStatistics Theory
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Dave ZachariahNafiseh ShariatiMats BengtssonMagnus JanssonSaikat Chatterjee

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