AbstractThe finite section method is a convenient tool for approximation of the inverse of certain operators using finite-dimensional matrix techniques. In this paper we demonstrate that the method is very useful in frame theory: it leads to an efficient approximation of the inverse frame operator and also solves related computational problems in frame theory. In the case of a frame which is localized w.r.t. an orthonormal basis we are able to estimate the rate of approximation. The results are applied to the reproducing kernel frame appearing in the theory for shift-invariant spaces generated by a Riesz basis
We solve the problem of best approximation by partial isometries of given rank to an arbitrary recta...
In applied linear algebra, the term frame is used to refer to a redundant or linearly dependent coor...
Recently, a sampling theory for infinite dimensional U-invariant subspaces of a separable Hilbert sp...
AbstractThe finite section method is a convenient tool for approximation of the inverse of certain o...
AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of t...
AbstractWe consider frames which contain a Riesz basis. Among those, we find Riesz frames, i.e., fra...
AbstractWe give lower frame bounds for finite subfamilies of a frame of exponentials {eiλk(·)}k∈Z in...
AbstractWe give an equivalent characterization of Hilbert space frames and derive a useful perturbat...
The recently introduced notion of a frame potential has led to useful characterizations of finite-di...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
We solve the problem of best approximation by Parseval frames to an arbitrary frame in a subspace of...
We show that for self-adjoint Jacobi matrices and Schrödinger operators, perturbed by dissipative po...
A tight frame is a sequence in a separable Hilbert space satisfying the frame inequality with equal ...
AbstractLet D be a Hessenberg matrix and D the closed operator associated to it. In this work, we st...
AbstractWe generalize the main result in [O. Christensen, H.O. Kim, R.Y. Kim, J.K. Lim, Perturbation...
We solve the problem of best approximation by partial isometries of given rank to an arbitrary recta...
In applied linear algebra, the term frame is used to refer to a redundant or linearly dependent coor...
Recently, a sampling theory for infinite dimensional U-invariant subspaces of a separable Hilbert sp...
AbstractThe finite section method is a convenient tool for approximation of the inverse of certain o...
AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of t...
AbstractWe consider frames which contain a Riesz basis. Among those, we find Riesz frames, i.e., fra...
AbstractWe give lower frame bounds for finite subfamilies of a frame of exponentials {eiλk(·)}k∈Z in...
AbstractWe give an equivalent characterization of Hilbert space frames and derive a useful perturbat...
The recently introduced notion of a frame potential has led to useful characterizations of finite-di...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
We solve the problem of best approximation by Parseval frames to an arbitrary frame in a subspace of...
We show that for self-adjoint Jacobi matrices and Schrödinger operators, perturbed by dissipative po...
A tight frame is a sequence in a separable Hilbert space satisfying the frame inequality with equal ...
AbstractLet D be a Hessenberg matrix and D the closed operator associated to it. In this work, we st...
AbstractWe generalize the main result in [O. Christensen, H.O. Kim, R.Y. Kim, J.K. Lim, Perturbation...
We solve the problem of best approximation by partial isometries of given rank to an arbitrary recta...
In applied linear algebra, the term frame is used to refer to a redundant or linearly dependent coor...
Recently, a sampling theory for infinite dimensional U-invariant subspaces of a separable Hilbert sp...