Add to ORKGAbstract. In this paper, we present an efficient method for solving the inverses of anti-tridiagonal and anti-pentadiagonal matrices draw support from symmetric circulant matrices. In addition, we establish the connections between anti-tridiagonal, anti-pentadiagonal matrices and symmetric circulant matrices Also some numerical examples are given
In this paper we present an analytical formula for the inversion of symmetrical tridiagonal matrices...
In the current work, the author present a symbolic algorithm for finding the determinant of any gene...
AbstractThis paper gives a simple algorithm for finding the explicit inverse of a general Jacobi tri...
We present here necessary and sufficient conditions for the invertibility of some circulant matrice...
AbstractIn this paper we present an analytical forms for the inversion of general periodic tridiagon...
AbstractIn the current work, the authors present a symbolic algorithm for finding the inverse of any...
AbstractThe elements of the inverse of a circulant matrix having only three non-zero elements in eac...
AbstractDiscretizations in various types of problems lead to quasi-tridiagonal matrices. In this pap...
In the current paper, we present a computationally efficient algorithm for obtaining the inverse of ...
Summary We provide a new representation for the inverse of block tridiagonal and banded matrices. Th...
AbstractTridiagonal or Jacobi matrices arise in many diverse branches of mathematics and have been s...
AbstractThe inverse of a quasi-Hessenberg matrix is shown to have a simple structure. The result is ...
In a previous work the authors presented the necessary and sufficient conditions for the invertibili...
We present here necessary and sufficient conditions for the invertibility of some circulant matrice...
Abstract. In this paper some results are reviewed concerning the characterization of inverses of sym...
In this paper we present an analytical formula for the inversion of symmetrical tridiagonal matrices...
In the current work, the author present a symbolic algorithm for finding the determinant of any gene...
AbstractThis paper gives a simple algorithm for finding the explicit inverse of a general Jacobi tri...
We present here necessary and sufficient conditions for the invertibility of some circulant matrice...
AbstractIn this paper we present an analytical forms for the inversion of general periodic tridiagon...
AbstractIn the current work, the authors present a symbolic algorithm for finding the inverse of any...
AbstractThe elements of the inverse of a circulant matrix having only three non-zero elements in eac...
AbstractDiscretizations in various types of problems lead to quasi-tridiagonal matrices. In this pap...
In the current paper, we present a computationally efficient algorithm for obtaining the inverse of ...
Summary We provide a new representation for the inverse of block tridiagonal and banded matrices. Th...
AbstractTridiagonal or Jacobi matrices arise in many diverse branches of mathematics and have been s...
AbstractThe inverse of a quasi-Hessenberg matrix is shown to have a simple structure. The result is ...
In a previous work the authors presented the necessary and sufficient conditions for the invertibili...
We present here necessary and sufficient conditions for the invertibility of some circulant matrice...
Abstract. In this paper some results are reviewed concerning the characterization of inverses of sym...
In this paper we present an analytical formula for the inversion of symmetrical tridiagonal matrices...
In the current work, the author present a symbolic algorithm for finding the determinant of any gene...
AbstractThis paper gives a simple algorithm for finding the explicit inverse of a general Jacobi tri...