Gabor systems and almost periodic functions (Q347513)

[\textit{Y. H. Kim} and \textit{A. Ron}, Constr. Approx. 29, No. 3, 303--323 (2009; Zbl 1159.42318)] gave some results concerning almost periodic norm estimates using shift-invariant systems. In this paper, the authors have extended some of their results using a Gabor system in place of shift-invariant systems.NEWLINENEWLINEThe authors construct an almost periodic function for an almost periodic sequence in terms of translates of a fixed continuous function in the Wiener class. \(AP(\mathbb{R})\) denotes the set of almost periodic functions on \(\mathbb{R}\) and \(AP_2(\mathbb{R})\) denotes the completion of \(AP(\mathbb{R})\). It is proved that \(AP(\mathbb{R})\), which is non-separable, can be viewed as a direct orthogonal sum of separable Hilbert spaces for which frames are defined in the usual sense. These results are useful in the sense that a non-separable space could be viewed as a direct orthogonal sum of separable Hilbert spaces.