English

On $g-$Fusion Frames Representations via Linear Operators

Functional Analysis 2023-05-16 v1

Abstract

Let {Mk}kZ\{\frak{M} _k \} _{ k \in \mathbb{Z}} be a sequence of closed subspaces of Hilbert space HH, and let {Θk}kZ\{\Theta_k\}_{k \in \mathbb{Z}} be a sequence of linear operators from HH into Mk\frak{M}_k, kZk \in \mathbb{Z}. In the definition of fusion frames, we replace the orthogonal projections on Mk\frak{M} _k by Θk\Theta_k and find a slight generalization of fusion frames. In the case where, Θk\Theta_k is self-adjoint and Θk(Mk)=Mk\Theta_k(\frak{M} _k)= \frak{M} _k for all kZk \in \mathbb{Z}, we show that if a gg-fusion frame {(Mk,Θk)}kZ\{(\frak{M} _k, \Theta_k)\}_{k \in \mathbb{Z}} is represented via a linear operator TT on span{Mk}kZ\hbox{span} \{\frak{M} _k\}_{ k \in \mathbb{Z}}, then TT is bounded; moreover, if {(Mk,Θk)}kZ\{(\frak{M} _k, \Theta_k)\}_{k \in \mathbb{Z}} is a tight gg-fusion frame, then TT is not invertible. We also study the perturbation and the stability of these fusion frames. Finally, we give some examples to show the validity of the results.

Keywords

Cite

@article{arxiv.2305.08182,
  title  = {On $g-$Fusion Frames Representations via Linear Operators},
  author = {S. Jahedi and F. Javadi and M. J. Mehdipour},
  journal= {arXiv preprint arXiv:2305.08182},
  year   = {2023}
}
R2 v1 2026-06-28T10:34:04.580Z