Weighted singular value decomposition and determinantal representations of the quaternion weighted Moore–Penrose inverse

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摘要

Weighted singular value decomposition (WSVD) and a representation of the weighted Moore–Penrose inverse of a quaternion matrix by WSVD have been derived. Using this representation, limit and determinantal representations of the weighted Moore–Penrose inverse of a quaternion matrix have been obtained within the framework of the theory of noncommutative column-row determinants. By using the obtained analogs of the adjoint matrix, we get the Cramer rules for the weighted Moore–Penrose solutions of left and right systems of quaternion linear equations.

论文关键词:Weighted singular value decomposition,Weighted Moore–Penrose inverse,Quaternion matrix,Cramer rule,System linear equation,Noncommutative determinant

论文评审过程:Received 4 April 2016, Accepted 27 March 2017, Available online 14 April 2017, Version of Record 14 April 2017.

论文官网地址:https://doi.org/10.1016/j.amc.2017.03.048