AbstractThe inverses of r-banded matrices, for r=1,2,3 have been thoroughly investigated as one can see from the references we provide. Let Br,n (1≤r≤n) be an n×n matrix of entries {aji}, −r≤i≤r, 1≤j≤r, with the remaining un-indexed entries all zeros. In this paper, generalizing a method of Mallik (1999) [5], we give the LU factorization and the inverse of the matrix Br,n (if it exists). Our results are valid for an arbitrary square matrix (taking r=n), and so, we will give a new approach for computing the inverse of an invertible square matrix. Our method is based on Hessenberg submatrices associated to Br,n
AbstractThe lower half of the inverse of a lower Hessenberg matrix is shown to have a simple structu...
Abstract. We present a new representation for the inverse of a matrix that is a sum of a banded matr...
We describe a method for obtaining an analytic form for the inverse of a finite symmetric banded Toe...
We discuss the conditions that are necessary for a given banded matrix to have a banded inverse. Alt...
AbstractWe establish a correspondence between the vanishing of a certain set of minors of a matrix A...
AbstractThe additive structure of the inverses of banded matrices is investigated. Under certain con...
Bounds for the ranks of upper-right submatrices of a generalized inverse of a strictly lower k-bande...
AbstractWe give a simple criterion for the invertibility of a class of banded matrices that arise in...
AbstractIn this paper, an inversion algorithm for a banded matrix is presented. The n twisted decomp...
We describe rank structures in generalized inverses of possibly rectangular banded matrices. In part...
We describe rank structures in generalized inverses of possibly rectangular banded matrices. In par...
We use elementary triangular matrices to obtain some factorization, multiplication, and inversion pr...
none3noDecay patterns of matrix inverses have recently attracted considerable interest, due to their...
AbstractResults are obtained on the elements of the inverses of banded and k-Hessenberg matrices. Th...
AbstractOur concern is with the reconstruction of functions from linear observations which only depe...
AbstractThe lower half of the inverse of a lower Hessenberg matrix is shown to have a simple structu...
Abstract. We present a new representation for the inverse of a matrix that is a sum of a banded matr...
We describe a method for obtaining an analytic form for the inverse of a finite symmetric banded Toe...
We discuss the conditions that are necessary for a given banded matrix to have a banded inverse. Alt...
AbstractWe establish a correspondence between the vanishing of a certain set of minors of a matrix A...
AbstractThe additive structure of the inverses of banded matrices is investigated. Under certain con...
Bounds for the ranks of upper-right submatrices of a generalized inverse of a strictly lower k-bande...
AbstractWe give a simple criterion for the invertibility of a class of banded matrices that arise in...
AbstractIn this paper, an inversion algorithm for a banded matrix is presented. The n twisted decomp...
We describe rank structures in generalized inverses of possibly rectangular banded matrices. In part...
We describe rank structures in generalized inverses of possibly rectangular banded matrices. In par...
We use elementary triangular matrices to obtain some factorization, multiplication, and inversion pr...
none3noDecay patterns of matrix inverses have recently attracted considerable interest, due to their...
AbstractResults are obtained on the elements of the inverses of banded and k-Hessenberg matrices. Th...
AbstractOur concern is with the reconstruction of functions from linear observations which only depe...
AbstractThe lower half of the inverse of a lower Hessenberg matrix is shown to have a simple structu...
Abstract. We present a new representation for the inverse of a matrix that is a sum of a banded matr...
We describe a method for obtaining an analytic form for the inverse of a finite symmetric banded Toe...