Dehghan and Hajarian, [4], investigated the matrix equations A^TXB+B^TX^TA = C and A^TXB + B^TXA = C providing inequalities for the determinant of the solutions of these equations. In the same paper, the authors pre...Dehghan and Hajarian, [4], investigated the matrix equations A^TXB+B^TX^TA = C and A^TXB + B^TXA = C providing inequalities for the determinant of the solutions of these equations. In the same paper, the authors presented a lower bound for the product of the eigenvalues of the solutions to these matrix equations. Inspired by their work, we give some generalizations of Dehghan and Hajarian results. Using the theory of the numerical ranges, we present an inequality involving the trace of C when A, B, X are normal matrices satisfying A^T B = BA^T.展开更多
基金partially supported by FCT(Portugal)with national funds through Centro de Matemática da Universidade de Trás-os-Montes e Alto Douro(PEst-OE/MAT/UI4080/2014)
文摘Dehghan and Hajarian, [4], investigated the matrix equations A^TXB+B^TX^TA = C and A^TXB + B^TXA = C providing inequalities for the determinant of the solutions of these equations. In the same paper, the authors presented a lower bound for the product of the eigenvalues of the solutions to these matrix equations. Inspired by their work, we give some generalizations of Dehghan and Hajarian results. Using the theory of the numerical ranges, we present an inequality involving the trace of C when A, B, X are normal matrices satisfying A^T B = BA^T.
