English

Fr\'echet frames, general definition and expansions

Functional Analysis 2015-10-19 v2

Abstract

We define an {\it (X1,Θ,X2)(X_1,\Theta, X_2)-frame} with Banach spaces X2X1X_2\subseteq X_1, 12|\cdot|_1 \leq |\cdot|_2, and a BKBK-space (Θ,\snorm[])(\Theta, \snorm[\cdot]). Then by the use of decreasing sequences of Banach spaces Xss=0{X_s}_{s=0}^\infty and of sequence spaces Θss=0{\Theta_s}_{s=0}^\infty, we define a general Fr\' echet frame on the Fr\' echet space XF=s=0XsX_F=\bigcap_{s=0}^\infty X_s. We give frame expansions of elements of XFX_F and its dual XFX_F^*, as well of some of the generating spaces of XFX_F with convergence in appropriate norms. Moreover, we give necessary and sufficient conditions for a general pre-Fr\' echet frame to be a general Fr\' echet frame, as well as for the complementedness of the range of the analysis operator U:XFΘFU:X_F\to\Theta_F.

Cite

@article{arxiv.1201.2096,
  title  = {Fr\'echet frames, general definition and expansions},
  author = {Stevan Pilipović and Diana T. Stoeva},
  journal= {arXiv preprint arXiv:1201.2096},
  year   = {2015}
}

Comments

A new section is added and a minor revision is done

R2 v1 2026-06-21T20:02:44.968Z