Using a natural deconvolution for analysis of perturbed integer sampling in shift-invariant spaces
An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spaces V spanned by a Riesz basis of integer-translates of a single function. Under some mild differentiability and decay assumptions on the Fourier transform of this function, we show that V also is gen...
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Veröffentlicht in: | Journal of mathematical analysis and applications 2011, Vol.373 (1), p.271-286 |
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Format: | Artikel |
Sprache: | eng |
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Zusammenfassung: | An important cornerstone of both wavelet and sampling theory is shift-invariant spaces, that is, spaces
V spanned by a Riesz basis of integer-translates of a single function. Under some mild differentiability and decay assumptions on the Fourier transform of this function, we show that
V also is generated by a function with Fourier transform
φ
ˆ
(
ξ
)
=
∫
ξ
−
π
ξ
+
π
g
(
ν
)
d
ν
for some
g with
∫
R
g
(
ξ
)
d
ξ
=
1
. We explain why analysis of this particular generating function can be more likely to provide large jitter bounds
ε such that any
f
∈
V
can be reconstructed from perturbed integer samples
f
(
k
+
ε
k
)
whenever
sup
k
∈
Z
|
ε
k
|
⩽
ε
. We use this natural deconvolution of
φ
ˆ
(
ξ
)
to further develop analysis techniques from a previous paper. Then we demonstrate the resulting analysis method on the class of spaces for which
g has compact support and bounded variation (including all spaces generated by Meyer wavelet scaling functions), on some particular choices of
φ for which we know of no previously published bounds and finally, we use it to improve some previously known bounds for B-spline shift-invariant spaces. |
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ISSN: | 0022-247X 1096-0813 1096-0813 |
DOI: | 10.1016/j.jmaa.2010.07.021 |