RANKS OF SUBMATRICES IN THE REFLEXIVE SOLUTIONS OF SOME MATRIX EQUATIONS

Sihem Guerarra, Radja BElkhiri

DOI Number
https://doi.org/10.22190/FUMI220922003G
First page
033
Last page
049

Abstract


Maximal and minimal ranks of the two submatrices X₁ and X₂ in the (skew-) Hermitian reflexive solution X=U[

X₁ 0
0 X₂
]U^{∗} of the matrix equation AXA^{∗}=C, in the reflexive solution of the matrix equation AXB=C are derived. Then necessary and sufficient conditions for these reflexive solutions to have special forms, and the general expressions of these reflexive solutions are achieved.


Keywords

matrix equation, rank, reflexive solution

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References


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DOI: https://doi.org/10.22190/FUMI220922003G

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