On best coapproximations in subspaces of diagonal matrices
Abstract
We characterize the best coapproximation(s) to a given matrix T out of a given subspace Y of the space of diagonal matrices Dn , by using Birkhoff-James orthogonality techniques and with the help of a newly introduced property, christened the * -Property. We also characterize the coproximinal subspaces and the co-Chebyshev subspaces of Dn in terms of the * -Property. We observe that a complete characterization of the best coapproximation problem in ∞n follows directly as a particular case of our approach.
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