Abstract
<abstract><p>In this paper, the necessary and sufficient conditions under which the matrix inequality $ C^*XC\geq D\ (&gt;D) $ subject to the linear constraint $ A^*XA = B $ is solvable are deduced by means of the spectral decompositions of some matrices and the generalized singular value decomposition of a matrix pair. An explicit expression of the general Hermitian solution is also provided. One numerical example demonstrates the effectiveness of the proposed method.</p></abstract>
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