Add to ORKGThe Sylvester-Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues that appears in a variety of applicative problems. We show that it belongs to a four dimensional linear space of tridiagonal matrices that can be simultaneously reduced to triangular form. We name this space after the matrix
AbstractThe object of our interest is a certain tridiagonal matrix that appears in a variety of prob...
AbstractWe study spectral properties of irreducible tridiagonal k-Toeplitz matrices and certain matr...
Abstract: This work is devoted to a systematic investigation of triangular matrix forms of the Pasca...
The Sylvester\u2013Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues t...
The Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues that ...
The Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues that ...
AbstractThe Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalue...
AbstractThe Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalue...
In this paper, a new tridiagonal matrix, whose eigenvalues are the same as the Sylvester-Kac matrix ...
Recently some generalizations of Sylvester type tridiagonal matrices have been considered with their...
The Sylvester-Kac matrix is also known as the Clement matrix The Sylvester-Kac matrix is widely used...
The Sylvester matrix was first defined by JJ Sylvester. Some authors have studied the relationships ...
The Sylvester matrix was first defined by JJ Sylvester. Some authors have studied the relationships ...
We consider a k-tridiagonal ℓ-Toeplitz matrix as one of generalizations of a tridiagonal Toeplitz ma...
AbstractA certain triple diagonal matrix was studied extensively by Mark Kac in connection with prob...
AbstractThe object of our interest is a certain tridiagonal matrix that appears in a variety of prob...
AbstractWe study spectral properties of irreducible tridiagonal k-Toeplitz matrices and certain matr...
Abstract: This work is devoted to a systematic investigation of triangular matrix forms of the Pasca...
The Sylvester\u2013Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues t...
The Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues that ...
The Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalues that ...
AbstractThe Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalue...
AbstractThe Sylvester–Kac matrix is a tridiagonal matrix with integer entries and integer eigenvalue...
In this paper, a new tridiagonal matrix, whose eigenvalues are the same as the Sylvester-Kac matrix ...
Recently some generalizations of Sylvester type tridiagonal matrices have been considered with their...
The Sylvester-Kac matrix is also known as the Clement matrix The Sylvester-Kac matrix is widely used...
The Sylvester matrix was first defined by JJ Sylvester. Some authors have studied the relationships ...
The Sylvester matrix was first defined by JJ Sylvester. Some authors have studied the relationships ...
We consider a k-tridiagonal ℓ-Toeplitz matrix as one of generalizations of a tridiagonal Toeplitz ma...
AbstractA certain triple diagonal matrix was studied extensively by Mark Kac in connection with prob...
AbstractThe object of our interest is a certain tridiagonal matrix that appears in a variety of prob...
AbstractWe study spectral properties of irreducible tridiagonal k-Toeplitz matrices and certain matr...
Abstract: This work is devoted to a systematic investigation of triangular matrix forms of the Pasca...