Weak Nonhomogeneous Wavelet Bi-Frames for Reducing Subspaces of Sobolev Spaces
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Publication:2987791
DOI10.1080/01630563.2016.1233119zbMath1364.42038OpenAlexW2559244916MaRDI QIDQ2987791
Publication date: 18 May 2017
Published in: Numerical Functional Analysis and Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/01630563.2016.1233119
Nontrigonometric harmonic analysis involving wavelets and other special systems (42C40) General harmonic expansions, frames (42C15)
Related Items (9)
Phase retrieval of real-valued functions in Sobolev space ⋮ A class of vector-valued subspace weak Gabor duals of type II ⋮ A Characterization of (Weak) Nonhomogeneous Wavelet Dual Frames and Mixed Oblique Principle in Sobolev Spaces on the Half Real Line ⋮ Generalized multiresolution structures in reducing subspaces of local fields ⋮ Weak affine super bi-frames for reducing subspaces of \(L^{2}(\mathbb R,\mathbb C^{L})\) ⋮ A characterization of multi-wavelet dual frames in Sobolev spaces ⋮ Vector-valued weak Gabor dual frames on discrete periodic sets ⋮ A class of weak dual wavelet frames for reducing subspaces of Sobolev spaces ⋮ Dualwavelet frames in Sobolev spaces on local fields of positive characteristic
Cites Work
- Generalized multiresolution structures in reducing subspaces of \(L^2(\mathbb R^d)\)
- Nonhomogeneous wavelet systems in high dimensions
- Refinable function-based construction of weak (quasi-)affine bi-frames
- Pairs of frequency-based nonhomogeneous dual wavelet frames in the distribution space
- Affine frame decompositions and shift-invariant spaces
- Wavelet bi-frames with few generators from multivariate refinable functions
- Multivariate FMRAs and FMRA frame wavelets for reducing subspaces of \(L^2(\mathbb R^d)\)
- Iteratively solving linear inverse problems under general convex constraints
- Dual wavelet frames and Riesz bases in Sobolev spaces
- The theory of multiresolution analysis frames and applications to filter banks
- Affine systems in \(L_ 2(\mathbb{R}^d)\): The analysis of the analysis operator
- On dual wavelet tight frames
- Tight frames of multidimensional wavelets
- Affine systems in \(L_2(\mathbb{R}^d)\). II: Dual systems
- Compactly supported wavelet bases for Sobolev spaces
- Tight wavelet frames in Lebesgue and Sobolev spaces
- The existence of subspace wavelet sets
- Bi-framelet systems with few vanishing moments characterize Besov spaces
- Tight frame: an efficient way for high-resolution image reconstruction
- Framelets: MRA-based constructions of wavelet frames
- Pairs of dual wavelet frames from any two refinable functions
- Bessel multiwavelet sequences and dual multiframelets in Sobolev spaces
- The construction of multivariate periodic wavelet bi-frames
- Deconvolution: a wavelet frame approach
- A framelet algorithm for enhancing video stills
- A framelet-based image inpainting algorithm
- Weak (quasi-)affine bi-frames for reducing subspaces of \(L^{2}(\mathbb{R}^{d})\)
- Subspaces with normalized tight frame wavelets in ℝ
- Wavelets and Framelets Within the Framework of Nonhomogeneous Wavelet Systems
- GMRA-BASED CONSTRUCTION OF FRAMELETS IN REDUCING SUBSPACES OF L2(ℝd)
- Restoration of Chopped and Nodded Images by Framelets
- Biorthogonal bases of compactly supported wavelets
- Wavelet Algorithms for High-Resolution Image Reconstruction
- Frame wavelets in subspaces of $L^2(\mathbb R^d)$
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