AbstractLet R∈Cm×m and S∈Cn×n be nontrivial involution matrices; i.e. R=R−1≠±I and S=S−1≠±I. An m×n complex matrix A is said to be a (R,S)-symmetric ((R,S)-skew symmetric) matrix if RAS=A (RAS=−A). The (R,S)-symmetric and (R,S)-skew symmetric matrices have many special properties and are widely used in engineering and scientific computations. In this paper, we consider the matrix equations A1XB1=C,A1X=D1,XB2=D2, and A1X=D1,XB2=D2,A3X=D3,XB4=D4, over the (R,S)-symmetric ((R,S)-skew symmetric) matrix X. We derive necessary and sufficient conditions for the existence of (R,S)-symmetric ((R,S)-skew symmetric) solutions for these matrix equations. Also we give the expressions for the (R,S)-symmetric ((R,S)-skew symmetric) solutions to the matrix...
AbstractIn this paper, an iterative method is constructed to solve the linear matrix equation AXB=C ...
AbstractBy transforming nonsymmetric linear systems to the extended skew-symmetric ones, we present ...
AbstractWe study the properties of skew-coninvolutory (EE¯=-I) matrices, and derive canonical forms ...
AbstractLet R∈Cm×m and S∈Cn×n be nontrivial involution matrices; i.e. R=R−1≠±I and S=S−1≠±I. An m×n ...
AbstractLet R∈Cn×n be a nontrivial involution; i.e., R=R−1≠±I. We say that A∈Cn×n is R-symmetric (R-...
AbstractIn this paper we consider symmetric and skew-antisymmetric solutions to certain matrix equat...
AbstractLet R∈Cm×m and S∈Cn×n be nontrivial involutions; thus R=R−1≠±I and S=S−1≠±I. We say that A∈C...
AbstractAn n×n real matrix X is said to be a skew-symmetric orthogonal matrix if XT=−X and XTX=I. Us...
AbstractLet R∈Cn×n be a nontrivial unitary involution; i.e., R=R∗=R−1≠±I. We say that A∈Cn×n is R-sy...
AbstractIn this paper, two efficient iterative methods are presented to solve the symmetric and skew...
AbstractThe symmetric solutions of linear matrix equations AX = C and AXB = C are considered. The ne...
AbstractThe necessary and sufficient conditions for the existence of and the expressions for the sym...
AbstractLet R∈Cn×n be a nontrivial involution; i.e., R=R−1≠±I. We say that A∈Cn×n is R-symmetric (R-...
AbstractThe symmetric solutions of linear matrix equations like AX = B have been considered using th...
We derive the necessary and sufficient conditions of and the expressions for the orthogonal solution...
AbstractIn this paper, an iterative method is constructed to solve the linear matrix equation AXB=C ...
AbstractBy transforming nonsymmetric linear systems to the extended skew-symmetric ones, we present ...
AbstractWe study the properties of skew-coninvolutory (EE¯=-I) matrices, and derive canonical forms ...
AbstractLet R∈Cm×m and S∈Cn×n be nontrivial involution matrices; i.e. R=R−1≠±I and S=S−1≠±I. An m×n ...
AbstractLet R∈Cn×n be a nontrivial involution; i.e., R=R−1≠±I. We say that A∈Cn×n is R-symmetric (R-...
AbstractIn this paper we consider symmetric and skew-antisymmetric solutions to certain matrix equat...
AbstractLet R∈Cm×m and S∈Cn×n be nontrivial involutions; thus R=R−1≠±I and S=S−1≠±I. We say that A∈C...
AbstractAn n×n real matrix X is said to be a skew-symmetric orthogonal matrix if XT=−X and XTX=I. Us...
AbstractLet R∈Cn×n be a nontrivial unitary involution; i.e., R=R∗=R−1≠±I. We say that A∈Cn×n is R-sy...
AbstractIn this paper, two efficient iterative methods are presented to solve the symmetric and skew...
AbstractThe symmetric solutions of linear matrix equations AX = C and AXB = C are considered. The ne...
AbstractThe necessary and sufficient conditions for the existence of and the expressions for the sym...
AbstractLet R∈Cn×n be a nontrivial involution; i.e., R=R−1≠±I. We say that A∈Cn×n is R-symmetric (R-...
AbstractThe symmetric solutions of linear matrix equations like AX = B have been considered using th...
We derive the necessary and sufficient conditions of and the expressions for the orthogonal solution...
AbstractIn this paper, an iterative method is constructed to solve the linear matrix equation AXB=C ...
AbstractBy transforming nonsymmetric linear systems to the extended skew-symmetric ones, we present ...
AbstractWe study the properties of skew-coninvolutory (EE¯=-I) matrices, and derive canonical forms ...