Original scientific paper
A note on Gabor frames
Shiv Kumar Kaushik
orcid.org/0000-0002-2850-0432
; Department of Mathematics, Kirorimal College, University of Delhi, Delhi, India
Suman Panwar
; Department of Mathematics, University of Delhi, Delhi, India
Abstract
Wilson frames $\{\psi_j^k :w_0,w_{-1}\in
L^2(\mathbb{R})\}_{j\in\mathbb{Z}\atop {k \in\mathbb{N}_0}}$ in
$L^2(\mathbb{R})$ have been defined and a characterization of Wilson frames in terms of Gabor frames is given when $w_0=w_{-1}$. Also, under certain conditions a necessary condition for a Wilson system to be a Wilson Bessel sequence is given. We have also obtained sufficient conditions for a Wilson system to be a Wilson frame in terms of Gabor Bessel sequences. For $w_0=w_{-1}$, stability of Wilson frames is discussed. Also, under the same assumption a necessary and sufficient condition is given for a Wilson system to be a Wilson Bessel sequence in terms of a Wilson frame.
Keywords
Gabor frames; Wilson frames; Gabor Bessel sequence; Wilson Bessel sequence
Hrčak ID:
121827
URI
Publication date:
26.5.2014.
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