English

Scalability of frames generated by dynamical operators

Functional Analysis 2016-12-02 v2

Abstract

Let AA be an operator on {a separable } Hilbert space \cH\cH, and let G\cHG \subset \cH. It is known that - under appropriate conditions on AA and GG - the set of iterations FG(A)={Aj\gbf    \gbfG,  0jL(\gbf)}F_G(A)= \{A^j \gbf \; | \; \gbf \in G, \; 0 \leq j \leq L(\gbf) \} is a frame for \cH\cH. We call FG(A)F_G(A) a dynamical frame for \cH\cH, and explore further its properties; in particular, we show that the canonical dual frame of FG(A)F_G(A) also has an iterative set structure. We explore the relations between the operator AA, the set GG and the number of iterations LL which ensure that the system FG(A)F_G(A) is a scalable frame. We give a general statement on frame scalability, We and study in detail the case when AA is a normal operator, utilizing the unitary diagonalization in finite dimensions. In addition, we answer the question of when FG(A)F_G(A) is a scalable frame in several special cases involving block-diagonal and companion operators.

Keywords

Cite

@article{arxiv.1608.05622,
  title  = {Scalability of frames generated by dynamical operators},
  author = {Roza Aceska and Yeon Hyang Kim},
  journal= {arXiv preprint arXiv:1608.05622},
  year   = {2016}
}
R2 v1 2026-06-22T15:24:26.850Z