Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
564415 | Signal Processing | 2010 | 9 Pages |
We consider the problem of estimating the gains and phases of the RF channels of a M-element transmitting array, based on a calibration procedure where M orthogonal signals are sent through M orthogonal beams and received on a single antenna. The received data vector obeys a linear model of the type y=AFg+ny=AFg+n where A is an unknown complex scalar accounting for propagation loss and gg is the vector of unknown complex gains. In order to improve the performance of the least-squares (LS) estimator at low signal to noise ratio (SNR), we propose to exploit knowledge of the nominal value of gg, viz g¯. Towards this end, two approaches are presented. First, a Bayesian approach is advocated where A and gg are considered as random variables, with a non-informative prior distribution for A and a Gaussian prior distribution for gg. The posterior distributions of the unknown random variables are derived and a Gibbs sampling strategy is presented that enables one to generate samples distributed according to these posterior distributions, leading to the minimum mean-square error (MMSE) estimator. A second approach consists in solving a constrained least-squares problem in which h=Agh=Ag is constrained to be close to a scaled version of g¯. This second approach yields a closed-form solution, which amounts to a linear combination of g¯ and the LS estimator. Numerical simulations show that the two new estimators significantly outperform the conventional LS estimator, especially at low SNR.