AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of the frame elements, with coefficients called frame coefficients. Calculation of the frame coefficients requires inversion of an operator S on H. We show how the inverse of S can be approximated as close as we like using finite-dimensional linear algebra. In contrast with previous methods, our approximation can be used for any frame. Various consequences for approximation of the frame coefficients or approximation of the solution to a moment problem are discussed. We also apply the results to Gabor frames and frames consisting of translates of a single function
AbstractWe consider frames which contain a Riesz basis. Among those, we find Riesz frames, i.e., fra...
AbstractCertain mathematical objects appear in a lot of scientific disciplines, like physics, signal...
We solve the problem of best approximation by Parseval frames to an arbitrary frame in a subspace of...
AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of t...
A frame is a possibly linearly dependent set of vectors in a Hilbert space that facilitates the deco...
AbstractThe finite section method is a convenient tool for approximation of the inverse of certain o...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
Abstract. A frame of subspaces in a Hilbert space H allows that identity operator on H to be written...
AbstractWe give an equivalent characterization of Hilbert space frames and derive a useful perturbat...
AbstractWe give lower frame bounds for finite subfamilies of a frame of exponentials {eiλk(·)}k∈Z in...
AbstractLet T denote an operator on a Hilbert space (H,〈·,·〉), and let {fi}∞i=1 be a frame for the o...
article distributed under the Creative Commons Attribution License, which permits unrestricted use, ...
The goal of this paper will be to study how frame theory is applied within the field of signal proce...
Matrix representations of bounded Hilbert space operators are considered. The matrices in question a...
AbstractWe show the existence of a “best approximation solution” to the set of equations 〈f,fi〉 =ai,...
AbstractWe consider frames which contain a Riesz basis. Among those, we find Riesz frames, i.e., fra...
AbstractCertain mathematical objects appear in a lot of scientific disciplines, like physics, signal...
We solve the problem of best approximation by Parseval frames to an arbitrary frame in a subspace of...
AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of t...
A frame is a possibly linearly dependent set of vectors in a Hilbert space that facilitates the deco...
AbstractThe finite section method is a convenient tool for approximation of the inverse of certain o...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
Abstract. A frame of subspaces in a Hilbert space H allows that identity operator on H to be written...
AbstractWe give an equivalent characterization of Hilbert space frames and derive a useful perturbat...
AbstractWe give lower frame bounds for finite subfamilies of a frame of exponentials {eiλk(·)}k∈Z in...
AbstractLet T denote an operator on a Hilbert space (H,〈·,·〉), and let {fi}∞i=1 be a frame for the o...
article distributed under the Creative Commons Attribution License, which permits unrestricted use, ...
The goal of this paper will be to study how frame theory is applied within the field of signal proce...
Matrix representations of bounded Hilbert space operators are considered. The matrices in question a...
AbstractWe show the existence of a “best approximation solution” to the set of equations 〈f,fi〉 =ai,...
AbstractWe consider frames which contain a Riesz basis. Among those, we find Riesz frames, i.e., fra...
AbstractCertain mathematical objects appear in a lot of scientific disciplines, like physics, signal...
We solve the problem of best approximation by Parseval frames to an arbitrary frame in a subspace of...