5.3.5 Fourier Analysis, Frequency Spectrum Restoration

Chapter Contents (Back)
Restoration. Fourier.

Philip, J.,
Restoration of Pictures by Quadratic Programming and by Fourier Transform in the Complex Domain,
PIEEE(61), No. 4, April 1973, pp. 468-469. BibRef 7304

Philip, J.,
Digital Image and Spectrum Restoration by Quadratic Programming and by Modified Fourier Transformation,
PAMI(1), No. 4, October 1979, 385-399. BibRef 7910

Munson, Jr., D.C., Sanz, J.L.C.,
Image Reconstruction from Frequency-Offset Fourier Data,
PIEEE(72), 1984, pp. 661-669. BibRef 8400

Lee, J.A.C., Munson, Jr., D.C.,
Spatially Variant Apodization for Image Reconstruction from Partial Fourier Data,
IP(9), No. 11, November 2000, pp. 1914-1925.
IEEE DOI 0011
BibRef

Pakhomov, A.A.,
Optimization of an Image Restoration Algorithm from Its Fourier Spectrum Phase,
OptEng(35), No. 4, April 1996, pp. 1044-1045. BibRef 9604

Kutay, M.A., Ozaktas, H.M.,
Optimal Image-Restoration with the Fractional Fourier-Transform,
JOSA-A(15), No. 4, April 1998, pp. 825-833. 9804
BibRef

Ye, J.C.[Jong Chul], Bresler, Y.[Yoram], Moulin, P.[Pierre],
A Self-Referencing Level-Set Method for Image Reconstruction from Sparse Fourier Samples,
IJCV(50), No. 3, December 2002, pp. 253-270.
DOI Link 0211
BibRef
Earlier: ICIP01(II: 33-36).
IEEE DOI 0108
BibRef
And: LevelSet01(xx-yy). 0106
BibRef

Al Hudhud, G.A., Turner, M.,
Digital Removal of Power Frequency Artifacts Using a Fourier Space Median Filter,
SPLetters(12), No. 8, August 2005, pp. 573-576.
IEEE DOI 0508
BibRef

Flandrin, P.,
Time-Frequency Filtering Based on Spectrogram Zeros,
SPLetters(22), No. 11, November 2015, pp. 2137-2141.
IEEE DOI 1509
Fourier transforms BibRef

Hosotani, F., Inuzuka, Y., Hasegawa, M., Hirobayashi, S., Misawa, T.,
Image Denoising With Edge-Preserving and Segmentation Based on Mask NHA,
IP(24), No. 12, December 2015, pp. 6025-6033.
IEEE DOI 1512
Discrete Fourier transforms BibRef

Ghosh, S., Nair, P., Chaudhury, K.N.,
Optimized Fourier Bilateral Filtering,
SPLetters(25), No. 10, October 2018, pp. 1555-1559.
IEEE DOI 1810
approximation theory, convolution, Fourier analysis, Gaussian noise, Gaussian processes, image filtering, Fourier basis BibRef

Nair, P., Chaudhury, K.N.,
Fast High-Dimensional Bilateral and Nonlocal Means Filtering,
IP(28), No. 3, March 2019, pp. 1470-1481.
IEEE DOI 1812
Approximation algorithms, Kernel, Clustering algorithms, Gray-scale, Interpolation, Image color analysis, Color, fast algorithm BibRef

Gopal, P.[Preeti], Svalbe, I.[Imants],
Spatial domain morphological filtering for interpolation of the Fourier domain,
PRL(116), 2018, pp. 107-113.
Elsevier DOI 1812
Morphologic filters, Fourier interpolation, K-space sub-sampling, Alternating sequential filters BibRef


Levin, D.N., Nagle, S.K.,
A new class of sampling theorems for Fourier imaging of multiple regions,
ICIP98(II: 10-14).
IEEE DOI 9810
BibRef

Yagle, A.E.,
Closed-form Reconstruction of Images from Irregular 2-d Discrete Fourier Samples Using the Good-Thomas FFT,
ICIP00(Vol I: 117-119).
IEEE DOI 0008
BibRef

Ng, M.K.,
Nonlinear image restoration using FFT-based conjugate gradient methods,
ICIP95(II: 41-44).
IEEE DOI 9510
BibRef

Chapter on Image Processing, Restoration, Enhancement, Filters, Image and Video Coding continues in
Maximum Entropy in Restoration .


Last update:Mar 16, 2024 at 20:36:19