AbstractThe symmetric solutions of linear matrix equations AX = C and AXB = C are considered. The necessary and sufficient conditions for the consistency of the equations with a symmetric condition on solutions are derived using the singular-value decomposition and the generalized singular-value decomposition. Numerical algorithms for solving the equations are suggested
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
AbstractIn this paper, a large system with a symmetric and essentially (2,2)-band matrix is reformul...
AbstractIn this paper a new method for computing the solution of a linear system having a symmetric ...
AbstractThe symmetric solutions of linear matrix equations like AX = B have been considered using th...
AbstractIn this paper, two efficient iterative methods are presented to solve the symmetric and skew...
AbstractThe symmetric solutions of linear matrix equations like AX = B have been considered using th...
AbstractA formula for the partitioned minimum-norm reflexive generalized inverse is applied to find ...
AbstractThe necessary and sufficient conditions for the existence of and the expressions for the sym...
AbstractThe necessary and sufficient conditions for the existence of and the expressions for the sym...
AbstractIn this paper, two efficient iterative methods are presented to solve the symmetric and skew...
AbstractA formula for the partitioned minimum-norm reflexive generalized inverse is applied to find ...
AbstractIn this paper, an iterative method is constructed to solve the linear matrix equation AXB=C ...
AbstractThe solution of the linear matrix equations (i) AXB+CYD=E and (ii) (AXB, FXG)=(E, H) are con...
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
AbstractIn this paper, a large system with a symmetric and essentially (2,2)-band matrix is reformul...
AbstractIn this paper a new method for computing the solution of a linear system having a symmetric ...
AbstractThe symmetric solutions of linear matrix equations like AX = B have been considered using th...
AbstractIn this paper, two efficient iterative methods are presented to solve the symmetric and skew...
AbstractThe symmetric solutions of linear matrix equations like AX = B have been considered using th...
AbstractA formula for the partitioned minimum-norm reflexive generalized inverse is applied to find ...
AbstractThe necessary and sufficient conditions for the existence of and the expressions for the sym...
AbstractThe necessary and sufficient conditions for the existence of and the expressions for the sym...
AbstractIn this paper, two efficient iterative methods are presented to solve the symmetric and skew...
AbstractA formula for the partitioned minimum-norm reflexive generalized inverse is applied to find ...
AbstractIn this paper, an iterative method is constructed to solve the linear matrix equation AXB=C ...
AbstractThe solution of the linear matrix equations (i) AXB+CYD=E and (ii) (AXB, FXG)=(E, H) are con...
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
We provide necessary and sufficient conditions for the matrix equation X⊤AX=B to be consistent when ...
AbstractIn this paper, a large system with a symmetric and essentially (2,2)-band matrix is reformul...
AbstractIn this paper a new method for computing the solution of a linear system having a symmetric ...
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