Irregular Sampling on Shift Invariant Spaces
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概要
- 論文の詳細を見る
Let V(φ) be a shift invariant subspace of $L^{2}(\mathbb{R})$ with a Riesz or frame generator φ(t). We take φ(t) suitably so that the regular sampling expansion : $f(t) = \sum _{n\in \mathbb{Z}}f(n)S(t-n)$ holds on V(φ). We then find conditions on the generator φ(t) and various bounds of the perturbation $\{ \delta _n \}_{n \in \mathbb{Z}}$ under which an irregular sampling expansion: ƒ(t) = $\sum_{n \in \mathbb{Z}} f(n+ \delta_n)S_n(t)$ holds on V(φ). Some illustrating examples are also provided.
- (社)電子情報通信学会の論文
- 2010-06-01
著者
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KWON Kil
Department of Mathematical Sciences, KAIST
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LEE Jaekyu
Department of Mathematical Sciences, KAIST
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Lee Jaekyu
Department Of Mathematical Sciences Kaist S. Korea
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Kwon Kil
Department Of Mathematical Sciences Kaist S. Korea
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Kwon Kil
Department Of Mathematical Sciences Kaist
関連論文
- Irregular Sampling on Shift Invariant Spaces
- Irregular Sampling on Shift Invariant Spaces
- Oversampling Expansion in Wavelet Subspaces
- Band-Limited Scaling Functions with Oversampling Property
- Recovery of Missing Samples from Oversampled Bandpass Signals and Its Stability
- Invariance and Periodic Oversampling in Principal Shift-Invariant Spaces