Abstract
We present the Drazin-inverse solution of the matrix equation AXB = G as a least-squares solution of a specified minimization problem. Some important properties of the Moore-Penrose inverse are extended on the Drazin inverse by exploring the minimal norm properties of the Drazin-inverse solution of the matrix equation AXB = G. The least squares properties of the Drazin-inverse solution lead to new representations of the Drazin inverse of a given matrix, which are justified by illustrative examples.
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Miladinović, M., Miljković, S., & Stanimirović, P. S. (2014). Minimal properties of the Drazin-inverse solution of a matrix equation. Filomat, 28(2), 383–395. https://doi.org/10.2298/FIL1402383M
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