investigation on the hermitian matrix expression subject to some consistent equations
نویسندگان
چکیده
in this paper, we study the extremal ranks and inertias of the hermitian matrix expression $$ f(x,y)=c_{4}-b_{4}y-(b_{4}y)^{*}-a_{4}xa_{4}^{*},$$ where $c_{4}$ is hermitian, $*$ denotes the conjugate transpose, $x$ and $y$ satisfy the following consistent system of matrix equations $a_{3}y=c_{3}, a_{1}x=c_{1},xb_{1}=d_{1},a_{2}xa_{2}^{*}=c_{2},x=x^{*}.$ as consequences, we get the necessary and sufficient conditions for the above expression $f(x,y)$ to be (semi) positive, (semi) negative. the relations between the hermitian part of the solution to the matrix equation $a_{3}y=c_{3}$ and the hermitian solution to the system of matrix equations $a_{1}x=c_{1},xb_{1}=d_{1},a_{2}xa_{2}^{*}=c_{2}$ are also characterized. moreover, we give the necessary and sufficient conditions for the solvability to the following system of matrix equations $a_{3}y=c_{3},a_{1}x=c_{1},xb_{1}=d_{1}, a_{2}xa_{2}^{*}=c_{2},x=x^{*}, b_{4}y+(b_{4}y)^{*}+a_{4}xa_{4}^{*}=c_{4} $ and provide an expression of the general solution to this system when it is solvable.
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عنوان ژورنال:
bulletin of the iranian mathematical societyناشر: iranian mathematical society (ims)
ISSN 1017-060X
دوره 40
شماره 1 2014
کلمات کلیدی
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