Stäckel and differential-Stäckel matrices are generalized so that the matrix elements may be functions of the derivatives of the dependent variable as well as the independent variable. The inverses of these matrices are characterized and it is shown that for significant classes of linear and nonlinear partial differential equations, variable separation is accomplished via this generalized Stäckel mechanism
This paper considered the application of generalized inverse of a matrix to models not of full rank....
Definite Sturm-Liouville matrix differential equations and applications of Moore-Penrose inverses to...
In recent years, matrices have become very useful in the study of differential equations. The aim of...
Stäckel and differential-Stäckel matrices are generalized so that the matrix elements may be functio...
We show that additive separation of variables for linear homogeneous equations of all orders is char...
This paper briefly reviews the mathematical considerations behind the generalized inverse of a matri...
Singular square matrices and rectangular matrices do not possess inverses in the regular sense of th...
This paper seeks to find a generalized inverse of singular and rectangular matrices. It also looks ...
The generalized inverse is proving to be a very useful tool in modern linear matrix theory in partic...
A class of linear partial differential equations whose coefficients are solutions of nonlinear integ...
In this article, the class of higher order linear matrix differential equations with constant coeffi...
The paper studies linear differential operators in derivatives with respect to one variable. Such op...
AbstractIt is shown that matrices with a UV-displacement structure possess generalized inverses with...
We consider the problem of separation of variables for the algebraically integrable Hamiltonian syst...
This study is a survey of the theory of the generalized-inverses of matrices as defined by Penrose. ...
This paper considered the application of generalized inverse of a matrix to models not of full rank....
Definite Sturm-Liouville matrix differential equations and applications of Moore-Penrose inverses to...
In recent years, matrices have become very useful in the study of differential equations. The aim of...
Stäckel and differential-Stäckel matrices are generalized so that the matrix elements may be functio...
We show that additive separation of variables for linear homogeneous equations of all orders is char...
This paper briefly reviews the mathematical considerations behind the generalized inverse of a matri...
Singular square matrices and rectangular matrices do not possess inverses in the regular sense of th...
This paper seeks to find a generalized inverse of singular and rectangular matrices. It also looks ...
The generalized inverse is proving to be a very useful tool in modern linear matrix theory in partic...
A class of linear partial differential equations whose coefficients are solutions of nonlinear integ...
In this article, the class of higher order linear matrix differential equations with constant coeffi...
The paper studies linear differential operators in derivatives with respect to one variable. Such op...
AbstractIt is shown that matrices with a UV-displacement structure possess generalized inverses with...
We consider the problem of separation of variables for the algebraically integrable Hamiltonian syst...
This study is a survey of the theory of the generalized-inverses of matrices as defined by Penrose. ...
This paper considered the application of generalized inverse of a matrix to models not of full rank....
Definite Sturm-Liouville matrix differential equations and applications of Moore-Penrose inverses to...
In recent years, matrices have become very useful in the study of differential equations. The aim of...