-
1
-
-
0038580000
-
Speckle suppression in ultrasonic images based on undecimated wavelets
-
F. Argenti and G. Torricelli, Speckle suppression in ultrasonic images based on undecimated wavelets, EURASIP J. Appl. Signal Process., 5 (2003), pp. 470-478.
-
(2003)
EURASIP J. Appl. Signal Process.
, vol.5
, pp. 470-478
-
-
Argenti, F.1
Torricelli, G.2
-
2
-
-
49449100276
-
A variational approach to removing multiplicative noise
-
G. Aubert and J.-F. Aujol, A variational approach to removing multiplicative noise, SIAM J. Appl. Math., 68 (2008), pp. 925-946.
-
(2008)
SIAM J. Appl. Math.
, vol.68
, pp. 925-946
-
-
Aubert, G.1
Aujol, J.-F.2
-
3
-
-
49949144765
-
The relaxation method for finding the common point of convex sets and its application to the solution of problems in convex programming
-
L.M. Bregman, The relaxation method for finding the common point of convex sets and its application to the solution of problems in convex programming, USSR Comput. Math. Math. Phys., 7 (1967), pp. 200-217.
-
(1967)
USSR Comput. Math. Math. Phys.
, vol.7
, pp. 200-217
-
-
Bregman, L.M.1
-
4
-
-
37249068651
-
Inverse total variation flow
-
M. Burger, K. Frick, S. Osher, and O. Scherzer, Inverse total variation flow, Multiscale Model. Simul., 6 (2007), pp. 366-395.
-
(2007)
Multiscale Model. Simul.
, vol.6
, pp. 366-395
-
-
Burger, M.1
Frick, K.2
Osher, S.3
Scherzer, O.4
-
5
-
-
85121572269
-
Nonlinear inverse scale space methods
-
M. Burger, G. Gilboa, S. Osher, and J. Xu, Nonlinear inverse scale space methods, Commun. Math. Sci., 4 (2006), pp. 179-212.
-
(2006)
Commun. Math. Sci.
, vol.4
, pp. 179-212
-
-
Burger, M.1
Gilboa, G.2
Osher, S.3
Xu, J.4
-
6
-
-
33646554522
-
Nonlinear inverse scale space methods for image restoration
-
Geometric, and Level Set Methods in Computer Vision, Lecture Notes in Comput. Sci. 3752, Springer, Berlin
-
M. Burger, S. Osher, J. Xu, and G. Gilboa, Nonlinear inverse scale space methods for image restoration, in Variational, Geometric, and Level Set Methods in Computer Vision, Lecture Notes in Comput. Sci. 3752, Springer, Berlin, 2005, pp. 25-36.
-
(2005)
Variational
, pp. 25-36
-
-
Burger, M.1
Osher, S.2
Xu, J.3
Gilboa, G.4
-
7
-
-
36549078210
-
Error estimation for Bregman iterations and inverse scale space methods in image restoration
-
M. Burger, E. Resmerita, and L. He, Error estimation for Bregman iterations and inverse scale space methods in image restoration, Computing, 81 (2007), pp. 109-135.
-
(2007)
Computing
, vol.81
, pp. 109-135
-
-
Burger, M.1
Resmerita, E.2
He, L.3
-
8
-
-
1242352408
-
An algorithm for total variation minimization and applications
-
A. Chambolle, An algorithm for total variation minimization and applications, J. Math. Imaging Vision, 20 (2004), pp. 89-97.
-
(2004)
J. Math. Imaging Vision
, vol.20
, pp. 89-97
-
-
Chambolle, A.1
-
9
-
-
15344346435
-
-
SIAM, Philadelphia
-
T.F. Chan and J. Shen, Image Processing and Analysis: Variational, PDE, Wavelet, and Stochastic Methods, SIAM, Philadelphia, 2005.
-
(2005)
Image Processing and Analysis: Variational, PDE, Wavelet, and Stochastic Methods
-
-
Chan, T.F.1
Shen, J.2
-
10
-
-
0032028980
-
Total variation blind deconvolution
-
T. Chan and C.K. Wong, Total variation blind deconvolution, IEEE Trans. Image Process., 7 (1998), pp. 370-375.
-
(1998)
IEEE Trans. Image Process.
, vol.7
, pp. 370-375
-
-
Chan, T.1
Wong, C.K.2
-
11
-
-
33845482689
-
Image restoration with discrete constrained total variation. I. Fast and exact optimization
-
J. Darbon and M. Sigelle, Image restoration with discrete constrained total variation. I. Fast and exact optimization, J. Math. Imaging Vis., 26 (2006), pp. 261-276.
-
(2006)
J. Math. Imaging Vis.
, vol.26
, pp. 261-276
-
-
Darbon, J.1
Sigelle, M.2
-
12
-
-
37249091359
-
-
Technical report ENST 2006D006, Ecole Nationale Supérieure des Télécommunications, Paris, available online from
-
J. Darbon, M. Sigelle, and F. Tupin, A Note on Nice-Levelable MRFs for SAR Image Denoising with Contrast Preservation, Technical report ENST 2006D006, Ecole Nationale Supérieure des Télécommunications, Paris, 2006; available online from http://www.telecom-paristech.fr/ data/ files/docs/id 619 1159280203 271.pdf.
-
(2006)
A Note on Nice-Levelable MRFs for SAR Image Denoising with Contrast Preservation
-
-
Darbon, J.1
Sigelle, M.2
Tupin, F.3
-
13
-
-
0003725571
-
Convex analysis and variational problems
-
North-Holland, Amsterdam, Oxford
-
I. Ekeland and R. Temam, Convex analysis and variational problems, Stud. Math. Appl. 1, North-Holland, Amsterdam, Oxford, 1976.
-
(1976)
Stud. Math. Appl.
, pp. 1
-
-
Ekeland, I.1
Temam, R.2
-
14
-
-
84873291342
-
-
Master’s thesis, Massachusetts Institute of Technology, Cambridge, MA
-
A. Fan, Variational Approach to MR Bias Correction, Master’s thesis, Massachusetts Institute of Technology, Cambridge, MA, 2003.
-
(2003)
Variational Approach to MR Bias Correction
-
-
Fan, A.1
-
15
-
-
33645038355
-
Second-order cone programming methods for total variation-based image restoration
-
D. Goldfarb and W. Yin, Second-order cone programming methods for total variation-based image restoration, SIAM J. Sci. Comput., 27 (2005), pp. 622-645.
-
(2005)
SIAM J. Sci. Comput.
, vol.27
, pp. 622-645
-
-
Goldfarb, D.1
Yin, W.2
-
16
-
-
0034298994
-
Nonstationary iterated Tikhonov-Morozov method and third order differential equations for the evaluation of unbounded operators
-
C. Groetsch and O. Scherzer, Nonstationary iterated Tikhonov-Morozov method and third order differential equations for the evaluation of unbounded operators, Math. Methods Appl. Sci., 23 (2000), pp. 1287-1300.
-
(2000)
Math. Methods Appl. Sci.
, vol.23
, pp. 1287-1300
-
-
Groetsch, C.1
Scherzer, O.2
-
17
-
-
33751519761
-
Iterative total variation regularization with non-quadratic fidelity
-
L. He, M. Burger, and S. Osher, Iterative total variation regularization with non-quadratic fidelity, J. Math. Imaging Vision, 26 (2006), pp. 167-189.
-
(2006)
J. Math. Imaging Vision
, vol.26
, pp. 167-189
-
-
He, L.1
Burger, M.2
Osher, S.3
-
18
-
-
33846267334
-
Inverse scale spaces for nonlinear regularization
-
J. Lie and J.-M. Nordbotten, Inverse scale spaces for nonlinear regularization, J. Math. Imaging Vision, 27 (2007), pp. 41-50.
-
(2007)
J. Math. Imaging Vision
, vol.27
, pp. 41-50
-
-
Lie, J.1
Nordbotten, J.-M.2
-
20
-
-
0041874655
-
Interaction between noise suppression and inhomogeneity correction in MRI
-
A. Montillo, J. Udupa, L. Axel, and D. Metaxas, Interaction between noise suppression and inhomogeneity correction in MRI, Proc. SPIE, 5032 (2003), pp. 1025-1036.
-
(2003)
Proc. SPIE
, vol.5032
, pp. 1025-1036
-
-
Montillo, A.1
Udupa, J.2
Axel, L.3
Metaxas, D.4
-
21
-
-
19844370110
-
An iterative regularization method for total variation-based image restoration
-
S. Osher, M. Burger, D. Goldfarb, J. Xu, and W. Yin, An iterative regularization method for total variation-based image restoration, Multiscale Model. Simul., 4 (2005), pp. 460-489.
-
(2005)
Multiscale Model. Simul.
, vol.4
, pp. 460-489
-
-
Osher, S.1
Burger, M.2
Goldfarb, D.3
Xu, J.4
Yin, W.5
-
22
-
-
4344584160
-
Multiplicative denoising and deblurring: Theory and algorithms
-
Vision, and Graphics, S. Osher and N. Paragios, eds., Springer, New York
-
L.I. Rudin, P.-L. Lions, and S. Osher, Multiplicative denoising and deblurring: Theory and algorithms, in Geometric Level Set Methods in Imaging, Vision, and Graphics, S. Osher and N. Paragios, eds., Springer, New York, 2003, pp. 103-119.
-
(2003)
Geometric Level Set Methods in Imaging
, pp. 103-119
-
-
Rudin, L.I.1
Lions, P.-L.2
Osher, S.3
-
23
-
-
44049111982
-
Nonlinear total variation based noise removal algorithms
-
L.I. Rudin, S. Osher, and E. Fatemi, Nonlinear total variation based noise removal algorithms, Phys. D, 60 (1992), pp. 259-268.
-
(1992)
Phys. D
, vol.60
, pp. 259-268
-
-
Rudin, L.I.1
Osher, S.2
Fatemi, E.3
-
24
-
-
24644476954
-
Explicit versus implicit relative error regularization on the space of functions of bounded variation
-
Image Analysis, and Medical Imaging, Contemp. Math. 313, AMS, Providence, RI
-
O. Scherzer, Explicit versus implicit relative error regularization on the space of functions of bounded variation, in Inverse Problems, Image Analysis, and Medical Imaging, Contemp. Math. 313, AMS, Providence, RI, 2002, pp. 171-198.
-
(2002)
Inverse Problems
, pp. 171-198
-
-
Scherzer, O.1
-
25
-
-
0013293203
-
Inverse scale space theory for inverse problems
-
Lecture Notes in Comput. Sci. 2106, M. Kerckhove, ed., Springer, Berlin
-
O. Scherzer and C. Groetsch, Inverse scale space theory for inverse problems, in Scale-Space and Morphology in Computer Vision, Lecture Notes in Comput. Sci. 2106, M. Kerckhove, ed., Springer, Berlin, 2001, pp. 317-325.
-
(2001)
Scale-Space and Morphology in Computer Vision
, pp. 317-325
-
-
Scherzer, O.1
Groetsch, C.2
-
27
-
-
84975594858
-
When is speckle noise multiplicative?
-
M. Tur, C. Chin, and J.W. Goodman, When is speckle noise multiplicative?, Appl. Optics, 21 (1982), pp. 1157-1159.
-
(1982)
Appl. Optics
, vol.21
, pp. 1157-1159
-
-
Tur, M.1
Chin, C.2
Goodman, J.W.3
-
28
-
-
0020748613
-
Statistics of speckle in ultrasound B-scans
-
R.F. Wagner, S.W. Smith, J.M. Sandrik, and H. Lopez, Statistics of speckle in ultrasound B-scans, IEEE Trans. Sonics Ultrasonics, 30 (1983), pp. 156-163.
-
(1983)
IEEE Trans. Sonics Ultrasonics
, vol.30
, pp. 156-163
-
-
Wagner, R.F.1
Smith, S.W.2
Sandrik, J.M.3
Lopez, H.4
-
29
-
-
33847715169
-
Regularization and nonlinear scale space applied to wavelet based denoising
-
J.J. Xu and S. Osher, Regularization and nonlinear scale space applied to wavelet based denoising, IEEE Trans. Image Process., 16 (2007), pp. 534-544.
-
(2007)
IEEE Trans. Image Process.
, vol.16
, pp. 534-544
-
-
Xu, J.J.1
Osher, S.2
|