SIP \(X_d\)-frames and their perturbations in uniformly convex Banach spaces (Q2875659)

Aldroubi et al. introduced p-frames in order to obtain series expansions in shift invariant subspaces of \(L_p(\mathbb{R})\). \textit{P. G. Casazza} et al. [Contemp. Math. 247, 149--182 (1999; Zbl 0947.46010)] considered a more general notion called \(X_d\)-frames and characterized separable Banach spaces \(X\) having an \(X_d\)-frame with respect to a given BK-space \(X_d\). \textit{H. Zhang} and \textit{J. Zhang} [Appl. Comput. Harmon. Anal. 31, No. 1, 1--25 (2011; Zbl 1221.42067)] defined \(X_d\)-frames for a separable Banach space using semi-inner product. In this paper, the authors study \(X_d\)-frames via semi-inner product and in the process define SIP-I and SIP-II \(X_d\)-frames in a uniformly convex separable Banach space X with respect to a given BK-space \(X_d\) with a mention that SIP-I \(X_d\)-frames are almost identical with the \(X_d\)-frames given by H. Zhang and J. Zhang [loc. cit.]. They characterize Banach spaces having SIP-I and SIP-II \(X_d\)-frames. Also, SIP Banach frames and SIP atomic decompositions are defined and various perturbation results for SIP \(X_d\)-frames and SIP Banach frames are given.