AbstractWe give an explicit formula for the Moore-Penrose inverse of an m × n partitioned matrix M=(ADBC), and then derive some representations, which are simpler in form when conditions are placed on the blocks of the partitioning of the matrix
Abstract. The full-rank LDL ∗ decomposition of a polynomial Hermitian matrix is examined. Explicit f...
AbstractLet A be a complex m×n matrix of rank r and with Moore-Penrose inverse A†. If A=A11A21a12A22...
Necessary and sufficient conditions are given for the Moore-Penrose inverse of a com-panion matrix o...
AbstractThe Moore-Penrose inverse of a 2 × 2 block matrix M = m=acbd is discussed. General expressio...
AbstractThis article gives the expressions for the Moore-Penrose inverses of m × n block matrices wh...
In this presentation Derive functions are provided for the computation of the Moore-Penrose inverse ...
AbstractFor any two complex Hilbert spaces H and K, let BL(H,K) be the set of bounded linear operato...
AbstractIn this paper R.E. Cline's formula for the generalized inverse of the partitioned matrix (U,...
Abstract. In this paper, some new representations of the Moore-Penrose inverse of a complex m × n ma...
AbstractThe defining equations for the Moore-Penrose inverse of a matrix are extended to give a uniq...
Performing elementary row operations on [ A | I ] , we can calculate matrices whose columns form bas...
AbstractIn this paper R.E. Cline's formula for the generalized inverse of the partitioned matrix (U,...
AbstractConsider an arbitrary symmetric nonnegative definite matrix A and its Moore–Penrose inverse ...
Abstract. In this article a fast computational method is provided in order to calculate the Moore-Pe...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
Abstract. The full-rank LDL ∗ decomposition of a polynomial Hermitian matrix is examined. Explicit f...
AbstractLet A be a complex m×n matrix of rank r and with Moore-Penrose inverse A†. If A=A11A21a12A22...
Necessary and sufficient conditions are given for the Moore-Penrose inverse of a com-panion matrix o...
AbstractThe Moore-Penrose inverse of a 2 × 2 block matrix M = m=acbd is discussed. General expressio...
AbstractThis article gives the expressions for the Moore-Penrose inverses of m × n block matrices wh...
In this presentation Derive functions are provided for the computation of the Moore-Penrose inverse ...
AbstractFor any two complex Hilbert spaces H and K, let BL(H,K) be the set of bounded linear operato...
AbstractIn this paper R.E. Cline's formula for the generalized inverse of the partitioned matrix (U,...
Abstract. In this paper, some new representations of the Moore-Penrose inverse of a complex m × n ma...
AbstractThe defining equations for the Moore-Penrose inverse of a matrix are extended to give a uniq...
Performing elementary row operations on [ A | I ] , we can calculate matrices whose columns form bas...
AbstractIn this paper R.E. Cline's formula for the generalized inverse of the partitioned matrix (U,...
AbstractConsider an arbitrary symmetric nonnegative definite matrix A and its Moore–Penrose inverse ...
Abstract. In this article a fast computational method is provided in order to calculate the Moore-Pe...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
Abstract. The full-rank LDL ∗ decomposition of a polynomial Hermitian matrix is examined. Explicit f...
AbstractLet A be a complex m×n matrix of rank r and with Moore-Penrose inverse A†. If A=A11A21a12A22...
Necessary and sufficient conditions are given for the Moore-Penrose inverse of a com-panion matrix o...
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