Abstract
We treat the problem of reconstructing a signal, x, that lies in a subspace, W, from its noisy samples. The samples are modelled as the inner products of x with a set of sampling vectors that span a subspace, S, not necessarily equal to W. We consider two approaches to reconstructing x from the noisy samples, a least-squares (LS) method and a minimax mean-squared error (MSE) strategy. We show that if the elements of x are finite, then the minimax MSE approach results in a smaller MSE than the LS approach for all values of x. We then generalize the results to the problem of minimizing an inner-product MSE.
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