We present here the necessary and sufficient conditions for the invertibility of tridiagonal matrices, commonly named Jacobi matrices, and explicitly compute their inverse. The techniques we use are related with the solution of Sturm–Liouville boundary value problems associated to second order linear difference equations. These boundary value problems can be expressed throughout a discrete Schrödinger operator and their solutions can be computed using recent advances in the study of linear difference equations. The conditions that ensure the uniqueness solution of the boundary value problem lead us to the invertibility conditions for the matrix, whereas the solutions of the boundary value problems provide the entries of the inverse matrixPe...
AbstractGiven a nonnegative diagonal matrix D, how do we find a column y such that the augmented mat...
A version of the inverse spectral problem for two spectra of finite-order real Jacobi matrices (trid...
AbstractIt is proved that a real symmetric tridiagonal matrix with positive codiagonal elements is u...
We present here the necessary and sufficient conditions for the invertibility of tridiagonal matrice...
We have named generalized Jacobi matrices to those that are practically tridiagonal, except for the ...
We have named tridiagonal (p,r)–Toeplitz matrix to those tridiagonal matrices in which each diagonal...
AbstractThis paper gives a simple algorithm for finding the explicit inverse of a general Jacobi tri...
AbstractTridiagonal or Jacobi matrices arise in many diverse branches of mathematics and have been s...
AbstractIn this paper, explicit formulae for the elements of the inverse of a general tridiagonal ma...
AbstractA formula for the inverse of a general tridiagonal matrix is given in terms of the principal...
We present here necessary and sufficient conditions for the invertibility of some circulant matrice...
This work deals with various finite algorithms that solve two special Structured Inverse Eigenvalue ...
By considering tridiagonal matrices as three-term recurrence relations with Dirichlet boundary condi...
[[abstract]]In this paper, we use a relation between products of matrices on M2 (R[x]) and Jacobi ma...
We show that using Dunford-Taylor’s integral, a classical tool of functional analysis, it is possibl...
AbstractGiven a nonnegative diagonal matrix D, how do we find a column y such that the augmented mat...
A version of the inverse spectral problem for two spectra of finite-order real Jacobi matrices (trid...
AbstractIt is proved that a real symmetric tridiagonal matrix with positive codiagonal elements is u...
We present here the necessary and sufficient conditions for the invertibility of tridiagonal matrice...
We have named generalized Jacobi matrices to those that are practically tridiagonal, except for the ...
We have named tridiagonal (p,r)–Toeplitz matrix to those tridiagonal matrices in which each diagonal...
AbstractThis paper gives a simple algorithm for finding the explicit inverse of a general Jacobi tri...
AbstractTridiagonal or Jacobi matrices arise in many diverse branches of mathematics and have been s...
AbstractIn this paper, explicit formulae for the elements of the inverse of a general tridiagonal ma...
AbstractA formula for the inverse of a general tridiagonal matrix is given in terms of the principal...
We present here necessary and sufficient conditions for the invertibility of some circulant matrice...
This work deals with various finite algorithms that solve two special Structured Inverse Eigenvalue ...
By considering tridiagonal matrices as three-term recurrence relations with Dirichlet boundary condi...
[[abstract]]In this paper, we use a relation between products of matrices on M2 (R[x]) and Jacobi ma...
We show that using Dunford-Taylor’s integral, a classical tool of functional analysis, it is possibl...
AbstractGiven a nonnegative diagonal matrix D, how do we find a column y such that the augmented mat...
A version of the inverse spectral problem for two spectra of finite-order real Jacobi matrices (trid...
AbstractIt is proved that a real symmetric tridiagonal matrix with positive codiagonal elements is u...