# Operator representations of frames: boundedness, duality, and stability

**Authors:** Ole Christensen, Marzieh Hasannasab

arXiv: 1704.08918 · 2017-05-01

## TL;DR

This paper characterizes when frames generated by iterating a linear operator are bounded, dualizable, and stable, linking these properties to shift-invariance and classical perturbation conditions in frame theory.

## Contribution

It provides new characterizations of boundedness, duality, and stability for operator-generated frames, connecting these to shift-invariance and classical perturbation theory.

## Key findings

- Boundedness characterized by shift-invariance of a sequence space.
- Dual frames are representable via a specific inverse operator.
- Frame stability is sensitive to classical perturbation conditions.

## Abstract

The purpose of the paper is to analyze frames $\{f_k\}_{k\in \mathbf Z}$ having the form $\{T^kf_0\}_{k\in\mathbf Z}$ for some linear operator $T: \mbox{span} \{f_k\}_{k\in \mathbf Z} \to \mbox{span}\{f_k\}_{k\in \mathbf Z}$. A key result characterizes boundedness of the operator $T$ in terms of shift-invariance of a certain sequence space. One of the consequences is a characterization of the case where the representation $\{f_k\}_{k\in \mathbf Z}=\{T^kf_0\}_{k\in\mathbf Z}$ can be achieved for an operator $T$ that has an extension to a bounded bijective operator $\widetilde{T}: \cal H \to \cal H.$ In this case we also characterize all the dual frames that are representable in terms of iterations of an operator $V;$ in particular we prove that the only possible operator is $V=(\widetilde{T}^*)^{-1}.$ Finally, we consider stability of the representation $\{T^kf_0\}_{k\in\mathbf Z};$ rather surprisingly, it turns out that the possibility to represent a frame on this form is sensitive towards some of the classical perturbation conditions in frame theory. Various ways of avoiding this problem will be discussed. Throughout the paper the results will be connected with the operators and function systems appearing in applied harmonic analysis, as well as with general group representations.

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1704.08918/full.md

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Source: https://tomesphere.com/paper/1704.08918