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
Abstract. Matrix representations of bounded Hilbert space operators are considered. The matrices in ...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
AbstractWe point out some connections between the existing theories for frames and pseudo-inverses. ...
AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of t...
AbstractThe finite section method is a convenient tool for approximation of the inverse of certain o...
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...
AbstractFrames in Hilbert spaces are a redundant set of vectors which yield a representation for eac...
AbstractCertain mathematical objects appear in a lot of scientific disciplines, like physics, signal...
A frame is a possibly linearly dependent set of vectors in a Hilbert space that facilitates the deco...
We discuss three applications of operator algebra techniques in Gabor analysis: the parametrizations...
AbstractWe show the existence of a “best approximation solution” to the set of equations 〈f,fi〉 =ai,...
article distributed under the Creative Commons Attribution License, which permits unrestricted use, ...
AbstractLet T denote an operator on a Hilbert space (H,〈·,·〉), and let {fi}∞i=1 be a frame for the o...
AbstractA decomposition of a Hilbert space H into a quasi-orthogonal family of closed subspaces is i...
Abstract. Matrix representations of bounded Hilbert space operators are considered. The matrices in ...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
AbstractWe point out some connections between the existing theories for frames and pseudo-inverses. ...
AbstractA frame allows every element in a Hilbert space H to be written as a linear combination of t...
AbstractThe finite section method is a convenient tool for approximation of the inverse of certain o...
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...
AbstractFrames in Hilbert spaces are a redundant set of vectors which yield a representation for eac...
AbstractCertain mathematical objects appear in a lot of scientific disciplines, like physics, signal...
A frame is a possibly linearly dependent set of vectors in a Hilbert space that facilitates the deco...
We discuss three applications of operator algebra techniques in Gabor analysis: the parametrizations...
AbstractWe show the existence of a “best approximation solution” to the set of equations 〈f,fi〉 =ai,...
article distributed under the Creative Commons Attribution License, which permits unrestricted use, ...
AbstractLet T denote an operator on a Hilbert space (H,〈·,·〉), and let {fi}∞i=1 be a frame for the o...
AbstractA decomposition of a Hilbert space H into a quasi-orthogonal family of closed subspaces is i...
Abstract. Matrix representations of bounded Hilbert space operators are considered. The matrices in ...
abstract: This investigation seeks to establish the practicality of numerical frame approximations. ...
AbstractWe point out some connections between the existing theories for frames and pseudo-inverses. ...