AbstractIn this paper we show that the group inverse of a real singular Toeplitz matrix can be represented as the sum of products of lower and upper triangular Toeplitz matrices. Such a matrix representation generalizes “Gohberg–Semencul formula” in the literature
AbstractIt is shown that a formula of Heinig for the inverse of a Toeplitz matrix follows from a for...
AbstractIn 1992, Labahn and Shalom showed that the inverse of a Toeplitz matrix can be reconstructed...
AbstractA necessary and sufficient condition derived by Huang and Cline for a nonsingular Toeplitz m...
AbstractThe Moore-Penrose inverses of Toeplitz matrices can always be represented as a sum of produc...
AbstractGohberg and Semencul gave some elegant formulas for the inverse of a Toeplitz matrix as a di...
AbstractIn order to estimate the condition number of the preconditioned matrix proposed in [F.R. Lin...
AbstractWe give explicit inverses of tridiagonal 2-Toeplitz and 3-Toeplitz matrices which generalize...
Formulas for the inverse of layered or striped Toeplitz matrices in terms of solutions of standard e...
We give explicit inverses of tridiagonal 2-Toeplitz and 3-Toeplitz matrices which generalize some we...
AbstractTwo proofs are given of the Gohberg–Heinig formula for the inverse of a Toeplitz matrix with...
AbstractWe show how an arbitrary square matrix can be expressed as sums of products of circulant and...
AbstractFormulas for the inverse of layered or striped Toeplitz matrices in terms of solutions of st...
AbstractWe derive a formula for the product of two Toeplitz matrices that is similar to the Trench f...
AbstractIn this article, using the difference operator B(a[m]), we introduce a lower triangular Toep...
AbstractThe spectral inverse As of a Toeplitz matrix A whose form is related to that of a circulant ...
AbstractIt is shown that a formula of Heinig for the inverse of a Toeplitz matrix follows from a for...
AbstractIn 1992, Labahn and Shalom showed that the inverse of a Toeplitz matrix can be reconstructed...
AbstractA necessary and sufficient condition derived by Huang and Cline for a nonsingular Toeplitz m...
AbstractThe Moore-Penrose inverses of Toeplitz matrices can always be represented as a sum of produc...
AbstractGohberg and Semencul gave some elegant formulas for the inverse of a Toeplitz matrix as a di...
AbstractIn order to estimate the condition number of the preconditioned matrix proposed in [F.R. Lin...
AbstractWe give explicit inverses of tridiagonal 2-Toeplitz and 3-Toeplitz matrices which generalize...
Formulas for the inverse of layered or striped Toeplitz matrices in terms of solutions of standard e...
We give explicit inverses of tridiagonal 2-Toeplitz and 3-Toeplitz matrices which generalize some we...
AbstractTwo proofs are given of the Gohberg–Heinig formula for the inverse of a Toeplitz matrix with...
AbstractWe show how an arbitrary square matrix can be expressed as sums of products of circulant and...
AbstractFormulas for the inverse of layered or striped Toeplitz matrices in terms of solutions of st...
AbstractWe derive a formula for the product of two Toeplitz matrices that is similar to the Trench f...
AbstractIn this article, using the difference operator B(a[m]), we introduce a lower triangular Toep...
AbstractThe spectral inverse As of a Toeplitz matrix A whose form is related to that of a circulant ...
AbstractIt is shown that a formula of Heinig for the inverse of a Toeplitz matrix follows from a for...
AbstractIn 1992, Labahn and Shalom showed that the inverse of a Toeplitz matrix can be reconstructed...
AbstractA necessary and sufficient condition derived by Huang and Cline for a nonsingular Toeplitz m...
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