Regularization of linear inverse problems with irregular noise using embedding operators
From MaRDI portal
Publication:6666617
DOI10.1137/24m1636307MaRDI QIDQ6666617
Ronny Ramlau, Simon Hubmer, Shuai Lu, Xinyan Li
Publication date: 20 January 2025
Published in: SIAM Journal on Imaging Sciences (Search for Journal in Brave)
computerized tomographylinear inverse problemsregularization theoryembedding operatorsirregular noise
Ill-posedness and regularization problems in numerical linear algebra (65F22) Numerical solutions of ill-posed problems in abstract spaces; regularization (65J20) Linear operators and ill-posed problems, regularization (47A52) Numerical solution to inverse problems in abstract spaces (65J22)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Oracle-type posterior contraction rates in Bayesian inverse problems
- Regularization theory for ill-posed problems. Selected topics
- Fourier reconstruction in tomography
- Non-equispaced fast Fourier transforms with applications to tomography
- Iteratively regularized Newton-type methods for general data misfit functionals and applications to Poisson data
- Discrepancy based model selection in statistical inverse problems
- The Mathematics of Computerized Tomography
- Heuristic parameter selection based on functional minimization: Optimality and model function approach
- Rational approximations for tomographic reconstructions
- Regularization under general noise assumptions
- Discrepancy principle for statistical inverse problems with application to conjugate gradient iteration
- Two-step regularization methods for linear inverse problems
- Interpolation in variable Hilbert scales with application to inverse problems
- A Scientific Study of Filter Selection for a Fan-Beam Convolution Reconstruction Algorithm
- Geometry of linear ill-posed problems in variable Hilbert scales
- A Regularization Parameter in Discrete Ill-Posed Problems
- Bayesian inverse problems with non-commuting operators
- Analysis of regularized inversion of data corrupted by white Gaussian noise
- Regularization by fractional filter methods and data smoothing
- On Majorization, Factorization, and Range Inclusion of Operators on Hilbert Space
- Equivalent Norms for Sobolev Spaces
- Enhancing linear regularization to treat large noise
- Characterizations of adjoint Sobolev embedding operators with applications in inverse problems
This page was built for publication: Regularization of linear inverse problems with irregular noise using embedding operators
