Let L be the infinite lower triangular Toeplitz matrix with first column (μ, a1, a2, ⋯, ap, a1, ⋯, ap, ⋯)T and let D be the infinite diagonal matrix whose entries are 1, 2, 3, ⋯ Let A := L + D be the sum of these two matrices. Bünger and Rump have shown that if p = 2 and certain linear inequalities between the parameters μ, a1, a2, are satisfied, then the singular values of any finite left upper square submatrix of A can be bounded from below by an expression depending only on those parameters, but not on the matrix size. By extending parts of their reasoning, we show that a similar behaviour should be expected for arbitrary p and a much larger range of values for μ, a1, ⋯, ap. It depends on the asymptotics in μ of the l2-norm of certain se...
AbstractIn this paper we work with pairs of zero–one matrices whose product is the full upper-triang...
AbstractWe consider a class of symmetric tridiagonal matrices which may be viewed as perturbations o...
AbstractLet A=(an,k)n,k⩾0 be a non-negative matrix. Denote by Lp,q(A) the supremum of those L satisf...
Let L be the infinite lower triangular Toeplitz matrix with first column (μ, a1, a2, ⋯, ap, a1, ⋯, a...
Square matrices of the form Xn = Tn+fn(T −1 n ) ∗ , where Tn is an n×n invertible banded Toepli...
AbstractFor a matrix A which is diagonally dominant both by rows and by columns, we give bounds for ...
AbstractAn upper bound for ‖A−1‖∞ and a lower bound for the smallest singular value, for the weakly ...
AbstractA lower bound for the smallest singular value of Aϵnxn is given in terms of the determinant ...
AbstractExplicit expressions for the well-known Szegö limits are obtained for the cases when the upp...
A uniform bound on the 1-norm is given for the inverse of a lower triangular Toeplitz matrix with no...
AbstractA uniform bound on the 1-norm is given for the inverse of a lower triangular Toeplitz matrix...
In this paper we are concerned with the asymptotic behavior of the smallest eigenvalue λ1(n) of symm...
Recent progress in signal processing and estimation has generated considerable interest in the probl...
AbstractWe study determinant inequalities for certain Toeplitz-like matrices over C. For fixed n and...
Infinite limitedly Toeplitz extensions of a finite rectangular Toeplitz matrix are considered. Condi...
AbstractIn this paper we work with pairs of zero–one matrices whose product is the full upper-triang...
AbstractWe consider a class of symmetric tridiagonal matrices which may be viewed as perturbations o...
AbstractLet A=(an,k)n,k⩾0 be a non-negative matrix. Denote by Lp,q(A) the supremum of those L satisf...
Let L be the infinite lower triangular Toeplitz matrix with first column (μ, a1, a2, ⋯, ap, a1, ⋯, a...
Square matrices of the form Xn = Tn+fn(T −1 n ) ∗ , where Tn is an n×n invertible banded Toepli...
AbstractFor a matrix A which is diagonally dominant both by rows and by columns, we give bounds for ...
AbstractAn upper bound for ‖A−1‖∞ and a lower bound for the smallest singular value, for the weakly ...
AbstractA lower bound for the smallest singular value of Aϵnxn is given in terms of the determinant ...
AbstractExplicit expressions for the well-known Szegö limits are obtained for the cases when the upp...
A uniform bound on the 1-norm is given for the inverse of a lower triangular Toeplitz matrix with no...
AbstractA uniform bound on the 1-norm is given for the inverse of a lower triangular Toeplitz matrix...
In this paper we are concerned with the asymptotic behavior of the smallest eigenvalue λ1(n) of symm...
Recent progress in signal processing and estimation has generated considerable interest in the probl...
AbstractWe study determinant inequalities for certain Toeplitz-like matrices over C. For fixed n and...
Infinite limitedly Toeplitz extensions of a finite rectangular Toeplitz matrix are considered. Condi...
AbstractIn this paper we work with pairs of zero–one matrices whose product is the full upper-triang...
AbstractWe consider a class of symmetric tridiagonal matrices which may be viewed as perturbations o...
AbstractLet A=(an,k)n,k⩾0 be a non-negative matrix. Denote by Lp,q(A) the supremum of those L satisf...