Fr\'echet frames, general definition and expansions

Abstract

We define an (X1,, X2)-frame with Banach spaces X2⊂eq X1, |·|1 ≤ |·|2, and a BK-space (, [·]). Then by the use of decreasing sequences of Banach spaces Xss=0∞ and of sequence spaces ss=0∞, we define a general Fr\' echet frame on the Fr\' echet space XF=s=0∞ Xs. We give frame expansions of elements of XF and its dual XF*, as well of some of the generating spaces of XF 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:XFF.