A spatially adaptive hybrid total variation model for image restoration under Gaussian plus impulse noise
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Publication:2668334
DOI10.1016/j.amc.2021.126862OpenAlexW4200063948WikidataQ113104199 ScholiaQ113104199MaRDI QIDQ2668334
Publication date: 3 March 2022
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2021.126862
total variation and high-order total variationcombined \(L^1/L^2\) data fidelity termhybrid total variationmixed Gaussian-impulse noisespatially adaptive parameters
Mathematical programming (90Cxx) Communication, information (94Axx) Computing methodologies and applications (68Uxx)
Uses Software
Cites Work
- Nonlinear total variation based noise removal algorithms
- Removal of mixed Gaussian and impulse noise using directional tensor product complex tight framelets
- Wavelet frame based blind image inpainting
- Image restoration using total variation with overlapping group sparsity
- A new method for removing mixed noises
- Restoration of images corrupted by Gaussian and uniform impulsive noise
- A new GVF-based image enhancement formulation for use in the presence of mixed noise
- Two-phase approach for deblurring images corrupted by impulse plus Gaussian noise
- On the Douglas-Rachford splitting method and the proximal point algorithm for maximal monotone operators
- Some qualitative properties for the total variation flow
- An exp model with spatially adaptive regularization parameters for multiplicative noise removal
- Automated regularization parameter selection in multi-scale total variation models for image restoration
- A first-order primal-dual algorithm for convex problems with applications to imaging
- Total variation and high-order total variation adaptive model for restoring blurred images with Cauchy noise
- Restoration of images corrupted by mixed Gaussian-impulse noise via \(l_{1}-l_{0}\) minimization
- High-order TVL1-based images restoration and spatially adapted regularization parameter selection
- A framelet-based image inpainting algorithm
- Fourth-order partial differential equations for noise removal
- Spatially dependent regularization parameter selection in total generalized variation models for image restoration
- A Patch-Based Approach for Removing Impulse or Mixed Gaussian-Impulse Noise
- Restoration of Images Corrupted by Impulse Noise and Mixed Gaussian Impulse Noise Using Blind Inpainting
- Subspace Correction Methods for a Class of Nonsmooth and Nonadditive Convex Variational Problems with Mixed $L^1/L^2$ Data-Fidelity in Image Processing
- A New Detail-Preserving Regularization Scheme
- On the $O(1/n)$ Convergence Rate of the Douglas–Rachford Alternating Direction Method
- Solving Constrained Total-variation Image Restoration and Reconstruction Problems via Alternating Direction Methods
- A New Alternating Minimization Algorithm for Total Variation Image Reconstruction
- Spatially adapted regularization parameter selection based on the local discrepancy function for Poissonian image deblurring
- Structured Total Least Squares for Color Image Restoration
- Noise removal using fourth-order partial differential equation with applications to medical magnetic resonance images in space and time
- Expected absolute value estimators for a spatially adapted regularization parameter choice rule in L 1 -TV-based image restoration
- High-Order Total Variation-Based Image Restoration
- Locally adaptive total variation for removing mixed Gaussian–impulse noise
- Automated parameter selection in the ${L}^{1} \mbox{-} {L}^{2}$-TV model for removing Gaussian plus impulse noise
- Framelet Algorithms for De-Blurring Images Corrupted by Impulse Plus Gaussian Noise
- Spatially Adapted Total Variation Model to Remove Multiplicative Noise
- A Weighted Dictionary Learning Model for Denoising Images Corrupted by Mixed Noise
- Convex analysis and monotone operator theory in Hilbert spaces
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