5.1.1 Transforms, Radon, Haar, Hadamard, etc.

Chapter Contents (Back)
Transforms.

Walsh, J.L.,
A Closed Set of Normal Orthogonal Functions,
AJM(45), 1923, pp. 5-24. 2^n Walsh functions of length n. Essentially using binary numbers to specify the 1/0 nature. Order them in different ways and the Hadamard Transform results. For a discussion see:
HTML Version. BibRef 2300

Yuen, C., 1972.
Remarks on the Ordering of Walsh Functions,
TC(21), No. 12, December 1972, pp. 1452. BibRef 7212

Fino, B.J.,
Relations between Haar and Walsh/Hadamard Transforms,
PIEEE(60), No. 5, May 1972, pp. 647-648. BibRef 7205

Carl, J., and Swartwood, R.,
A Hybrid Walsh Transform Computer,
TC(22), No. 7, July 1973, pp. 669-672. BibRef 7307

Hawkes, P.W.,
A note on inverse filtering for anisoplanatic systems with coherent illumination,
PR(7), No. 1-2, June 1975, pp. 59-60.
WWW Version. 0309
Use of Mellin transform to describe field curvature and astigmatism. BibRef

Tretiak, O.J., and Metz, C.E.,
The Exponential Radon Transform,
SIAM_JAM(39), 1980, pp. 341-354. BibRef 8000

Rattey, P.A., and Lindgren, A.G.,
Sampling the 2-D Radon transform,
ASSP(29), No. 4, October 1981, pp. 994-1002. BibRef 8110

Deans, S.R.,
The Radon Transform and Some of its Applications,
John Wiley& Sons, New York. 1983. See also Hough Transform from the Radon Transform. BibRef 8300

Natterer, F.,
The Radon Transform,
WileyNew York, 1986. The book. BibRef 8600

Ramm, A.G., and Katsevich, A.I.,
The Radon Transform and Local Tomography,
CRC PressNew York, 1996. BibRef 9600

Jahns, J.,
Efficient Hadamard Transformation of Large Images,
SP(5), 1983, pp. 75-80. BibRef 8300

Wang, Z.D.,
A New Algorithm for the Slant Transform,
PAMI(4), No. 5, September 1982, pp. 551-555. BibRef 8209

Mali, P.C., Chaudhuri, B.B., Dutta Majumder, D.,
Performance Bound of Walsh-Hadamard Transform for Feature Selection and Compression and Some Related Fast Algorithms,
PRL(2), 1983, pp. 5-12. See also Some Algorithms for Image Enhancement Incorporating Human Visual Response. BibRef 8300

Mali, P.C., Chaudhuri, B.B., Dutta Majumder, D.,
Properties and Some Fast Algorithms of the Haar Transform in Image Processing and Pattern Recognition,
PRL(2), 1984, pp. 319-327. BibRef 8400

Hansen, E.W.,
Fast Hankel Transform Algorithm,
ASSP(33), 1985, pp. 666-671. BibRef 8500

Raghuramireddy, D., Unbehauen, R.,
The Two-Dimensional Differential Cepstrum,
ASSP(33), 1985, pp. 1335-1337. BibRef 8500

Zwicke, P.E., and Kiss, Jr., I.,
A New Implementation of the Mellin Transform and its Application to Radar Classification of Ships,
PAMI(5), No. 2, March 1983, pp. 191-199. BibRef 8303

Kumaresan, R., Gupta, P.K.,
Vector-Radix Algorithm for a 2-D Discrete Hartley Transform,
PIEEE(74), 1986, pp. 755-757. BibRef 8600

Bracewell, R.N., Buneman, O., Hao, H., Villasenor, J.D.,
Fast Two-Dimensional Hartley Transform,
PIEEE(74), 1986, pp. 1282-1283. BibRef 8600

Fitzpatrick, J.M., Louze, M.R.,
A Class of One-to-One Two-Dimensional Transformations,
CVGIP(39), No. 3, September 1987, pp. 369-382.
WWW Version. BibRef 8709

Leavers, V.F., Boyce, J.F.,
The Radon Transform and Its Application to Shape Parameterization in Machine Vision,
IVC(5), No. 2, May 1987, pp. 161-166.
WWW Version. BibRef 8705

Leavers, V.F.,
Statistical Properties of the Hybrid Radon-Fourier Technique,
BMVC00(xx-yy).
PDF Version. 0009
BibRef

Leavers, V.F.[Violet F.],
Use of the Two-Dimensional Radon Transform to Generate a Taxonomy of Shape for the Characterization of Abrasive Powder Particles,
PAMI(22), No. 12, December 2000, pp. 1411-1423.
IEEE Abstract. IEEE Top Reference.
WWW Version. 0012
Inspection, Wear. Shape and angularity of particles for edge map. See also Use of the Radon Transform As a Method of Extracting Information About Shape in Two Dimensions. And See also Dynamic Generalized Hough Transform: Its Relationship to the Probabilistic Hough Transforms and an Application to the Concurrent Detection of Circles and Ellipses, The. BibRef

Leavers, V.F.,
Analysis of Wear Particles Using the Radon Transform,
ICPR00(Vol IV: 764-766).
IEEE DOI Link
HTML Version. 0009
BibRef

Berenyi, H.M., Leavers, V.F., Burge, R.E.,
Automatic Detection of Targets Against Cluttered Backgrounds Using a Fractal-Oriented Statistical Analysis and Radon Transform,
PRL(13), 1992, pp. 869-877. BibRef 9200

Temerinac, M., Edler, B.,
A unified approach to lapped orthogonal transforms,
IP(1), No. 1, January 1992, pp. 111-116.
IEEE DOI Link 0402
BibRef

Wang, W.L., Jin, G.F., Yan, Y.B., Wu, M.X.,
Image Feature-Extraction with the Optical Haar Wavelet Transform,
OptEng(34), No. 4, April 1995, pp. 1238-1242. BibRef 9504

Wang, W.L., Jin, G.F., Yan, Y.B., Wu, M.X.,
Joint Wavelet-Transform Correlator for Image Feature-Extraction,
AppOpt(34), No. 2, January 10 1995, pp. 370-376. BibRef 9501

0401

Götz, W.A., Druckmüller, H.J.,
A Fast Digital Radon-Transform: An Efficient Means for Evaluating the Hough Transform,
PR(28), No. 12, December 1995, pp. 1985-1992.
WWW Version. BibRef 9512
And: PR(29), No. 4, April 1996, pp. 711-718.
WWW Version. BibRef

Anguh, M.M., Martin, R.R.,
A Truncation Method for Computing Walsh Transforms with Applications to Image Processing,
GMIP(55), No. 6, November 1993, pp. 482-yy. BibRef 9311

Anguh, M.M., Martin, R.R.,
A 2-Dimensional Inplace Truncation Walsh Transform Method,
JVCIR(7), No. 2, June 1996, pp. 116-125. 9607
BibRef

Kelley, B.T., Madisetti, V.K.,
The Fast Discrete Radon Transform I: Theory,
IP(2), No. 3, July 1993, pp. 382-400.
IEEE DOI Link BibRef 9307

Sahiner, B., Yagle, A.E.,
Time-Frequency Distribution Inversion of the Radon Transform,
IP(2), No. 4, October 1993, pp. 539-543.
IEEE DOI Link BibRef 9310
Earlier:
Iterative inversion of the Radon transform using image-adaptive wavelet constraints,
ICIP98(II: 709-713).
IEEE DOI Link 9810
BibRef

Marzetta, T.L.,
Fan Filters, the 3-D Radon Transform, and Image Sequence Analysis,
IP(3), No. 3, May 1994, pp. 253-264.
IEEE DOI Link BibRef 9405

Dusaussoy, N.J.,
VOIR, A Volumetric Image-Reconstruction Algorithm-Based on Fourier Techniques for Inversion of the 3-D Radon-Transform,
IP(5), No. 1, January 1996, pp. 121-131.
IEEE DOI Link BibRef 9601

Copeland, A.C., Ravichandran, G., Trivedi, M.M.,
Radon Transform based Ship-Wake Detection,
GeoRS(33), No. 1, January 1995, pp. 35-45.
IEEE Top Reference. BibRef 9501
Earlier:
Localized Radon Transform-Based Detection of Linear Features in Noisy Images,
CVPR94(664-667).
IEEE Abstract. IEEE Top Reference. Hough Transform. SAR Image Analysis. BibRef

Heusdens, R.,
Design of Lapped Orthogonal-Transforms,
IP(5), No. 8, August 1996, pp. 1281-1284.
IEEE DOI Link 9608
BibRef

Hansen, K.V., Toft, P.A.,
Fast Curve Estimation Using Preconditioned Generalized Radon-Transform,
IP(5), No. 12, December 1996, pp. 1651-1661.
IEEE DOI Link 9701
BibRef

Falkowski, B.J., Rahardja, S.,
Walsh-Like Functions And Their Relations,
VISP(143), No. 5, October 1996, pp. 279-284. 9701
BibRef

Falkowski, B.J.,
Family of generalised multi-polarity complex Hadamard transforms,
VISP(145), No. 6, December 1998, pp. 371. BibRef 9812

Falkowski, B.J., Sasao, T.,
Unified algorithm to generate Walsh functions in four different orderings and its programmable hardware implementations,
VISP(152), No. 6, December 2005, pp. 819-826.
WWW Version. 0512
BibRef

Fu, C., Falkowski, B.J.,
Linearly independent ternary arithmetic helix transforms, their properties and relations,
VISP(153), No. 2, April 2006, pp. 87-94.
WWW Version. 0604
BibRef

Pitas, I., Karasaridis, A.,
Multichannel Transforms for Signal/Image Processing,
IP(5), No. 10, October 1996, pp. 1402-1413.
IEEE DOI Link 9610
BibRef

Prabhu, K.M.M., Sundaram, R.S.,
Fast Algorithm for Pseudodiscrete Wigner-Ville Distribution Using Moving Discrete Hartley Transform,
VISP(143), No. 6, December 1996, pp. 383-386. 9702
BibRef

Sundaram, R.S., Prabhu, K.M.M.,
Numerically Stable Algorithm for Computing Wigner-Ville Distribution,
VISP(144), No. 1, February 1997, pp. 46-48. 9706
BibRef

Martens, J.B.,
Local Orientation Analysis in Images by Means of the Hermite Transform,
IP(6), No. 8, August 1997, pp. 1103-1116.
IEEE DOI Link 9708
BibRef

Liang, Z.P., Munson, D.C.,
Partial Radon Transforms,
IP(6), No. 10, October 1997, pp. 1467-1469.
IEEE DOI Link 9710
BibRef

Martins, A.C.G., Rangayyan, R.M.,
Complex Cepstral Filtering of Images and Echo Removal in the Radon Domain,
PR(30), No. 11, November 1997, pp. 1931-1938.
WWW Version. 9801
BibRef

Bi, G.A.,
Split-Radix Algorithm for 2-D Discrete Hartley Transform,
SP(63), No. 1, November 1997, pp. 45-53. 9801
BibRef

Vardi, Y., Lee, D.,
Discrete Radon-Transform and Its Approximate Inversion via the EM Algorithm,
IJIST(9), No. 2-3, 1998, pp. 155-173. 9805
BibRef

Sundararajan, D., Ahmad, M.O.,
Fast Computation of the Discrete Walsh and Hadamard Transforms,
IP(7), No. 6, June 1998, pp. 898-904.
IEEE DOI Link 9806
BibRef

Greenshields, I.R., Rosiene, J.A.,
A Fast Wavelet Based Karhunen Loeve Transform,
PR(31), No. 7, July 1998, pp. 839-845.
WWW Version. 9807
BibRef

Pegna, J., Hilaire, T.P.,
Multifringe Pattern Analysis of Circular Zone Plates,
JEI(7), No. 1, January 1998, pp. 257-264. 9807
BibRef

Park, R.H., Yoon, K.S., Choi, W.Y.,
8-Point Discrete Hartley Transform as an Edge Operator and Its Interpretation in the Frequency-Domain,
PRL(19), No. 7, May 1998, pp. 569-574. 9808
BibRef

Pan, X.C.,
Quasi-Band-Limited Properties of Radon Transforms and Their Implications for Increasing Angular Sampling Densities,
MedImg(17), No. 3, June 1998, pp. 395-406.
IEEE Top Reference. 9809
BibRef

Alieva, T., Barbe, A.,
Fractional Fourier and Radon-Wigner Transforms Of Periodic Signals,
SP(69), No. 2, September 1998, pp. 183-189. 9811
BibRef

Brady, M.L.[Martin L.],
A Fast Discrete Approximation Algorithm for the Radon Transform,
SIAM_JC(27), No. 1, 1998, pp. 107-119 BibRef 9800

Souani, C.[Chokri], Atri, M.[Mohamed], Abid, M.[Mohamed], Torki, K.[Kholdoun], Tourki, R.[Rached],
Design of New Optimized Architecture Processor for DWT,
RealTimeImg(6), No. 4, August 2000, pp. 297-312. 0010
BibRef

Aach, T.[Til], Kunz, D.[Dietmar],
A lapped directional transform for spectral image analysis and its application to restoration and enhancement,
SP(80), No. 11, November 2000, pp. 2347-2364. 0010
BibRef

Fuderer, M.[Miha], Aach, T.[Til], Kunz, D.W.[Dietmar W.],
Directional adaptive noise reduction,
US_Patent6,049,623, Apr 11, 2000
WWW Version. BibRef 0004

Kunz, D.,
An Orientation-Selective Orthogonal Lapped Transform,
IP(17), No. 8, August 2008, pp. 1313-1322.
IEEE DOI Link 0808
BibRef

Lee, N.Y., Lucier, B.J.,
Wavelet Methods for Inverting the Radon Transform with Noisy Data,
IP(10), No. 1, January 2001, pp. 79-94.
IEEE DOI Link Computed Tomography 0101
BibRef

Rangayyan, R.M.[Rangaraj M.], Krishnan, S.[Sridhar],
Feature identification in the time-frequency plane by using the Hough-Radon transform,
PR(34), No. 6, June 2001, pp. 1147-1158.
WWW Version. 0103
BibRef

Pattichis, M.S., Bovik, A.C., Havlicek, J.W., Sidiropoulos, N.D.,
Multidimensional orthogonal FM transforms,
IP(10), No. 3, March 2001, pp. 448-464.
IEEE DOI Link 0104
BibRef

Pattichis, M.S., Havlicek, J.P., Acton, S.T., Bovik, A.C.,
Multidimensional AM-FM Models with Image Processing Applications,
AIPU02(277-306). 0905
BibRef

Rodriguez, V.P.[V. Paul], Pattichis, M.S.,
New Algorithms for Fast and Accurate AM-FM Demodulation of Digital Images,
ICIP05(II: 1294-1297).
IEEE DOI Link 0512
BibRef

Murray, V.[Victor], Pattichis, M.S.[Marios S.],
AM-FM Demodulation Methods for Reconstruction, Analysis and Motion Estimation in Video signals,
Southwest08(17-20).
IEEE DOI Link 0803
BibRef

Murray, V.[Victor], Rodriguez, V.P.[V. Paul], Pattichis, M.S.[Marios S.],
Robust Multiscale AM-FM Demodulation of Digital Images,
ICIP07(I: 465-468).
IEEE DOI Link 0709
BibRef

Boussakta, S., Alshibami, O., Aziz, M., Holt, A.G.J.,
3-D vector radix algorithm for the 3-D new mersenne number transform,
VISP(148), No. 2, April 2001, pp. 115-125. 0106
BibRef

Yu, P.[Pinneng], Hua, H.P.[He-Ping],
A new fast recursive algorithm for computing discrete Hartley transform and its implementation,
SP(81), No. 10, October 2001, pp. 2235-2241.
HTML Version. 0110
BibRef

Amira, A., Bouridane, A., Milligan, P., Roula, M.A.,
Novel FPGA Implementations of Walsh-Hadamard Transforms for Signal Processing,
VISP(148), No. 6, December 2001, pp. 377-383.
IEEE Top Reference. 0203
See also FPGA Implementations of Fast Fourier Transforms for Real-Time Signal and Image Processing. BibRef

Amira, A.,
An FPGA based parameterisable system for discrete Hartley transforms implementation,
ICIP03(II: 567-570).
IEEE Abstract. IEEE Top Reference. 0312
BibRef

Alshibami, O., Boussakta, S.,
Fast 3-D decimation-in-frequency algorithm for 3-D Hartley transform,
SP(82), No. 1, January 2002, pp. 121-126.
HTML Version. 0202
BibRef

Jing, C.Y., Tai, H.M.,
Design and implementation of a fast algorithm for modulated lapped transform,
VISP(149), No. 1, February 2002, pp. 27-32.
IEEE Top Reference. 0205
BibRef

Horbelt, S., Liebling, M., Unser, M.,
Discretization of the Radon Transform and of its Inverse by Spline Convolutions,
MedImg(21), No. 4, April 2002, pp. 363-376.
IEEE Top Reference. 0206
BibRef

Zeng, Y.H.[Yong-Hong], Bi, G.A.[Guo-An], Leyman, A.R.[Abdul Rahim],
New algorithms for multidimensional discrete Hartley transform,
SP(82), No. 8, August 2002, pp. 1086-1095.
HTML Version. 0206
BibRef

Xia, X.G.[Xiang-Gen], Suter, B.W.,
On vector Karhunen-Loeve transforms and optimal vector transforms,
CirSysVideo(5), No. 4, August 1995, pp. 372-374.
IEEE Top Reference. 0206
BibRef

Xia, X.G.[Xiang-Gen], Suter, B.W.,
A systematic construction method for spatial-varying FIR filter banks with perfect reconstruction,
ICIP94(I: 830-834).
IEEE DOI Link 9411
BibRef

Egiazarian, K.O.[Karen O.], Astola, J.T.[Jaakko T.],
Tree-Structured Haar Transforms,
JMIV(16), No. 3, May 2002, pp. 269-279.
WWW Version. 0211
BibRef

Lun, D.P.K.[Daniel P. K.], Hsung, T.C., Shen, T.W.,
Orthogonal discrete periodic Radon transform. Part I: theory and realization,
SP(83), No. 5, May 2003, pp. 941-955.
WWW Version. 0304
BibRef

Lun, D.P.K.[Daniel P. K.], Hsung, T.C., Shen, T.W.,
Orthogonal discrete periodic Radon transform. Part II: applications,
SP(83), No. 5, May 2003, pp. 957-971.
WWW Version. 0304
BibRef

Aburdene, M.F., Xie, J.[Jin], Kozick, R.J.,
Efficient computation of discrete polynomial transforms,
SPLetters(10), No. 10, October 2003, pp. 285-288.
IEEE Abstract. IEEE Top Reference. 0310
BibRef

Agaian, S.S., Tourshan, K., Noonan, J.P.,
Parameterisation of slant-Haar transforms,
VISP(150), No. 4, October 2003, pp. 306-311.
IEEE Abstract. IEEE Top Reference. 0401
BibRef

Djurovic, I., Stankovic, L.,
Nonparametric Algorithm for Local Frequency Estimation of Multidimensional Signals,
IP(13), No. 4, April 2004, pp. 467-474.
IEEE DOI Link 0404
BibRef

Djurovic, I., Stankovic, L., Stankovic, S., Stojanovic, R.,
Local Frequency Estimation Based on the Wigner Distribution,
ICIP01(III: 736-739).
IEEE Abstract. IEEE Top Reference. 0108
BibRef

Corinthios, M.J.,
Complex-variable distribution theory for Laplace and z transforms,
VISP(152), No. 1, February 2005, pp. 97-106.
IEEE Abstract. IEEE Top Reference. 0501
BibRef

Colonna, F.[Flavia], Easley, G.R.[Glenn R.],
Generalized Discrete Radon Transforms and Their Use in the Ridgelet Transform,
JMIV(23), No. 2, September 2005, pp. 145-165.
Springer DOI Link 0505
BibRef

Easley, G.R., Labate, D., Colonna, F.,
Shearlet-Based Total Variation Diffusion for Denoising,
IP(18), No. 2, February 2009, pp. 260-268.
IEEE DOI Link 0901
BibRef

Luengo Hendriks, C.L.[Cris L.], van Ginkel, M.[Michael], Verbeek, P.W.[Piet W.], van Vliet, L.J.[Lucas J.],
The generalized Radon transform: Sampling, accuracy and memory considerations,
PR(38), No. 12, December 2005, pp. 2494-2505.
WWW Version. 0510
BibRef
Earlier: (British spelling -- "-ised") CAIP03(681-688).
WWW Version. 0311
BibRef

Rouze, N.C.[Ned C.], Soon, V.C.[Victor C.], Hutchins, G.D.[Gary D.],
On the connection between the Zernike moments and Radon transform of an image,
PRL(27), No. 6, 15 April 2006, pp. 636-642.
WWW Version. 0604
Zernike moments; Radon transform; Image reconstruction BibRef

Wang, X.,
Moving Window-Based Double Haar Wavelet Transform for Image Processing,
IP(15), No. 9, August 2006, pp. 2771-2779.
IEEE DOI Link 0608
BibRef

Marti-Puig, P.,
A Family of Fast Walsh Hadamard Algorithms With Identical Sparse Matrix Factorization,
SPLetters(13), No. 11, November 2006, pp. 672-675.
IEEE DOI Link 0610
BibRef

Shu, H.Z.[Hua-Zhong], Wang, Y.[Yuan], Senhadji, L.[Lotfi], Luo, L.M.[Li-Min],
Direct Computation of Type-II Discrete Hartley Transform,
SPLetters(14), No. 5, May 2007, pp. 329-332.
IEEE DOI Link 0704
BibRef

Dabov, K.[Kostadin], Foi, A.[Alessandro], Katkovnik, V.[Vladimir], Egiazarian, K.O.[Karen O.],
Image Denoising by Sparse 3-D Transform-Domain Collaborative Filtering,
IP(16), No. 8, August 2007, pp. 2080-2095.
IEEE DOI Link 0709
BibRef
And:
Color Image Denoising via Sparse 3D Collaborative Filtering with Grouping Constraint in Luminance-Chrominance Space,
ICIP07(I: 313-316).
IEEE DOI Link 0709
BibRef

Foi, A., Trimeche, M., Katkovnik, V., Egiazarian, K.O.,
Practical Poissonian-Gaussian Noise Modeling and Fitting for Single-Image Raw-Data,
IP(17), No. 10, October 2008, pp. 1737-1754.
IEEE DOI Link 0809
BibRef

Minasyan, S., Astola, J.T., Egiazarian, K.O., Guevorkian, D.,
Parametric Haar-Like Transforms in Image Denoising,
ICIP06(2629-2632). 0610

IEEE DOI Link BibRef

Hjouj, F., Kammler, D.W.,
Identification of Reflected, Scaled, Translated, and Rotated Objects From Their Radon Projections,
IP(17), No. 3, March 2008, pp. 301-310.
IEEE DOI Link 0802
BibRef

Bi, G., Aung, A., Ng, B.P.,
Pipelined Hardware Structure for Sequency-Ordered Complex Hadamard Transform,
SPLetters(15), No. 1, 2008, pp. 401-404.
IEEE DOI Link 0804
BibRef

Kingston, A.[Andrew], Autrusseau, F.[Florent],
Lossless image compression via predictive coding of discrete Radon projections,
SP:IC(23), No. 4, April 2008, pp. 313-324.
WWW Version. 0711
Lossless image coding; Discrete Radon transform; Mojette; Redundancy BibRef

Kingston, A., Parrein, B., Autrusseau, F.,
Redundant image representation via multi-scale digital Radon projections,
ICIP08(2920-2923).
IEEE DOI Link 0810
BibRef

Kingston, A.[Andrew], Colosimo, S., Campisi, P., Autrusseau, F.[Florent],
Lossless Image Compression and Selective Encryption using a Discrete Radon Transform,
ICIP07(IV: 465-468).
IEEE DOI Link 0709
BibRef

Huang, Q.[Qiu], Zeng, G.L.[Gengsheng L.], Gullberg, G.T.[Grant T.],
An Analytical Inversion of the 180deg Exponential Radon Transform with a Numerically Generated Kernel,
IJIG(7), No. 1, January 2007, pp. 71-85. 0701
BibRef

Zhu, C., Xiong, B.,
Transform-Exempted Calculation of Sum of Absolute Hadamard Transformed Differences,
CirSysVideo(19), No. 8, August 2009, pp. 1183-1188.
IEEE DOI Link 0909
BibRef


Scherzer, O.[Otmar], Walch, B.[Birgit],
Sparsity Regularization for Radon Measures,
SSVM09(452-463).
Springer DOI Link 0906
BibRef

Falcon-Morales, L.[Luis], Bayro-Corrochano, E.[Eduardo],
Radon transform and Conformal Geometric Algebra with lines,
ICPR08(1-4).
IEEE DOI Link 0812
BibRef

Anguelov, R.[Roumen],
Discrete Pulse Transform of images: Algorithm and applications,
ICPR08(1-4).
IEEE DOI Link 0812
BibRef

Anguelov, R.[Roumen], Fabris-Rotelli, I.[Inger],
Discrete Pulse Transform of Images,
ICISP08(1-9).
Springer DOI Link 0807
BibRef

Averbuch, A., Coifman, R.R., Donoho, D.L., Israeli, M., and Walden, J.,
Fast slant stack: A notion of radon transform for data on a cartesian grid which is rapidly computable, algebraically exact, geometrically faithful, and invertible,
TRStanford University, 2001. BibRef 0100

Bartels, C., de Haan, G.,
Direct Motion Estimation in the Radon Transform Domain using Match-Profile Backprojections,
ICIP07(VI: 153-156).
IEEE DOI Link 0709
BibRef

Agaian, S.S., Caglayan, O.,
New Fast Hartley Transform with Linear Multiplicative Complexity,
ICIP06(377-380). 0610

IEEE DOI Link BibRef

Antoniol, G., Ceccarelli, M., Petrosino, A.,
Microarray Image Addressing Based on the Radon Transform,
ICIP05(I: 13-16).
IEEE DOI Link 0512
BibRef

Qu, Y.Y.[Yan-Yun], Zheng, N.N.[Nan-Ning], Li, C.H.[Cui-Hua], Yuan, Z.J.[Ze-Jian],
Sequential updating algorithm for extracting the basis of Karhunen-Loeve Transformation,
ICIP04(III: 1529-1532).
IEEE DOI Link 0505
BibRef

Svalbe, I.[Imants], Kingston, A.[Andrew],
On Correcting the Unevenness of Angle Distributions Arising from Integer Ratios Lying in Restricted Portions of the Farey Plane,
IWCIA04(110-121).
WWW Version. 0505
Projections must go to image grid positions, but they don't always do that. BibRef

Svalbe, I.,
An Image Labeling Mechanism Using Digital Radon Projections,
ICIP01(III: 1015-1018).
IEEE Abstract. IEEE Top Reference. 0108
BibRef

Smeraldi, F., Rob, M.A.,
Ranklets on hexagonal pixel lattices,
BMVC03(xx-yy).
HTML Version. 0409
On square grid, similar to Haar. BibRef

Boussakta, S., Alshibami, O., Bouridane, A.,
Radix-4x4 for fast calculation of the 2-D NMNT,
ICIP03(I: 709-712).
IEEE Abstract. IEEE Top Reference. 0312
2D new Mersenne number transform. BibRef

Reichel, J., Ziliani, F.,
Controlled temporal Haar transform for video coding,
ICIP03(II: 767-770).
IEEE Abstract. IEEE Top Reference. 0312
BibRef

Crigoryan, A.M., Agaian, S.S., Manukyan, A.R.,
A novel method of splitting the 3-D discrete Hartley transform,
ICIP03(I: 1009-1012).
IEEE Abstract. IEEE Top Reference. 0312
BibRef

Ye, Q.[Qhighua], Huang, H.[Haining], He, X.[Xinyi], Zhang, C.H.[Chun-Hua],
A SR-based radon transform to extract weak lines from noise images,
ICIP03(I: 849-852).
IEEE Abstract. IEEE Top Reference. 0312
BibRef

Yarman, C.E., Yazici, B.,
Exponential Radon Transform Inversion Based on Harmonic Analysis of the Euclidean Motion Group,
ICIP05(III: 613-615).
IEEE DOI Link 0512
BibRef
Earlier:
Radon Transform Inversion via Wiener Filtering over the Euclidean Motion Group,
ICIP03(II: 811-814).
IEEE Abstract. IEEE Top Reference. 0312
BibRef

Lienhart, R., Maydt, J.,
An extended set of Haar-like features for rapid object detection,
ICIP02(I: 900-903).
IEEE Abstract. IEEE Top Reference. 0210
BibRef

Grigoryan, A.M.,
Three Algorithms for Computing the 2-d Discrete Hartley Transform,
ICIP00(Vol II: 359-362).
IEEE Abstract. IEEE Top Reference. 0008
BibRef

Siebert, A.,
A linear shift invariant multiscale transform,
ICIP98(III: 688-691).
IEEE DOI Link 9810
BibRef

Kazantsev, I.,
A New Formula of the Radon Transform Inversion,
ICIP97(I: 189-191).
IEEE DOI Link BibRef 9700

Sarukhanyan, H.G.[Hakob G.],
Decomposition of the Hadamard matrices and fast Hadamard transform,
CAIP97(575-581).
WWW Version. 9709
BibRef

Stiller, C., Konrad, J.,
Region-adaptive transform based on a stochastic model,
ICIP95(II: 264-267).
IEEE DOI Link 9510
BibRef

Maragos, P., Bovik, A.C.,
Demodulation of images modeled by amplitude-frequency modulations using multidimensional energy separation,
ICIP94(III: 421-425).
IEEE DOI Link 9411
BibRef

Baringer, W.B., Brodersen, R.W., Petkovic, D.,
Computer vision hardware using the Radon transform,
CVPR91(508-513).
IEEE Abstract. IEEE Top Reference. 0403
BibRef

Gindi, G.R., Gmitro, A.F.,
Optical Feature Extraction Via the Radon Transform,
ICPR84(702-704). BibRef 8400

Chapter on Image Processing, Restoration, Enhancement, Filters, Image and Video Coding continues in
Kalman Filtering, General .


Last update:Nov 16, 2009 at 19:35:14