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Publications of the Project F1310
September 27, 2008

Bibliography

1
F. Chyzak, P. Paule, O. Scherzer, A. Schoisswohl, and B. Zimmermann.
A computer algebra approach to orthonormal wavelets.
In T. Mulders, editor, Proc. of the 7th Rhine workshop on computer algebra, Bregenz, Austria, April 2000.
2
F. Chyzak, P. Paule, O. Scherzer, A. Schoisswohl, and B. Zimmermann.
The construction of orthonormal wavelets using symbolic methods and a matrix analytical approach for wavelets on the interval.
Experiment. Math., 10:67-86, 2001.
3
P. Deuflhard, H. W. Engl, and O. Scherzer.
A convergence analysis of iterative methods for the solution of nonlinear ill-posed problems under affinely invariant conditions.
Inverse Problems, 14:1081-1106, 1998.
4
H. W. Engl and O. Scherzer.
Convergence rates of iterative methods for solving nonlinear ill-posed problems.
In D. Colton, H. W. Engl, A. K. Louis, J. McLaughlin, and W. Rundell, editors, survey on solution methods for ill-posed problems, 2000.
5
I. Frigaard and O. Scherzer.
The effects of yield stress variation of uniaxial exchange flow in a pipe.
SIAM. Appl. Math., 2000.
to appear.
6
I. A. Frigaard and O. Scherzer.
Uniaxial exchange of two bingham fluids in a cylindrical duct.
IMA J. Appl. Math., 1998.
To appear.
7
C. W. Groetsch and O. Scherzer.
Nonstationary iterated Tikhonov-Morozov method and third order differential equations for the evaluation of unbounded operators.
Technical report, SFB-report 99-17, 1999.
8
M. Gullikson and O. Scherzer.
An adaptive strategy for updating the damping parameters in an iteratively regularized Gauss-Newton method.
Technical report, J. of Opt. Theory and Appl., 1998.
To appear.
9
M. Hanke and O. Scherzer.
Error analysis of an equation error method for the identification of the diffusion coefficient in a quasilinear parabolic differential equation.
SIAM Appl. Math, To appear, 1998.
10
M. Hanke and O. Scherzer.
Numerical differentiation as an example for inverse problems.
Submitted, 1998.
11
W. Hinterberger.
Generierung eines films mit hilfe des optischen flusses.
Master's thesis, Universität Linz, December 1999.
12
W. Hinterberger and O. Scherzer.
Models for image interpolation based on the optical flow.
Technical report, SFB report 00-1, 2000.
13
B. Hofmann and O. Scherzer.
Local ill-posedness and source conditions of operator equations in Hilbert spaces.
Inverse Problems, 14:1189-1206, 1998.
14
S. I. Kabanikhin, R. Kowar, and O. Scherzer.
On the Landweber iteration for the solution of a parameter identification problem in a hyperbolic partial differential equation of second order.
J. Inv. Ill-Posed Problems, 6(5):403-430, 1998.
15
S. I. Kabanikhin, R. Kowar, and O. Scherzer:.
On the Landweber iteration for the solution of a parameter identification problem in a hyperbolic partial differential equation of second order.
J. Inv. Ill-Posed Problems, 8:403-430, 1999.
appeared already 1998.
16
E. Radmoser.
Scale space properties of regularization methods.
Graz, Workshop on Image Processing and Analysis, May 1999.
17
E. Radmoser, O. Scherzer, and J. Schöberl.
A cascadic algorithm for bounded variation regularization.
Technical Report 00-23, SFB ``Numerical and Symbolic Scientific Computing'', 2000.
18
E. Radmoser, O. Scherzer, and J. Weickert.
Scale-space properties of nonstationary iterative regularization methods.
Technical Report 8, Universität Mannheim, 1999.
19
E. Radmoser, O. Scherzer, and J. Weickert.
Scale space properties of regularization methods.
In M. Nielsen, P. Johansen, O. F. Olsen, and J. Weickert, editors, Scale space theories in computer vision, volume 1682 of Lecture Notes in Computer Science, pages 211-222, Berlin, 1999. Springer.
20
E. Radmoser, O. Scherzer, and J. Weickert.
Scale-space properties of nonstationary iterative regularization methods.
Journal of Visual Communication and Image Representation, 2000.
To appear.
21
L. Rondi.
A new variational technique for the reconstruction of discontinuous conductivities by boundary measurements.
SFB Conference on Inverse Problems, Strobl, June 2000.
22
L. Rondi.
Reconstruction of discontinuous conductivities via a variational approach.
GAMM-Jahrestagung 2000, Göttingen, April 2000.
23
O. Scherzer.
A-posteriori estimates for nonlinear ill-posed problems.
AMS-SIAM Summer Research Conference on Inverse Problems in Partial Differential Equations, Boston, USA, July 1998.
24
O. Scherzer.
Inverse Problemen und deren numerische Lösung.
Universtät Halle, Deutschland, November 11th 1998.
25
O. Scherzer.
Inverse problems in nondestructive testing (with A. Neubauer.
SIAM Annual Meeting, Organisation Minisymposium, July 17th 1998.
26
O. Scherzer.
Iterative methods for the solution of nonlinear ill-posed problems.
IICP'98 (inversion conference), Kopenhagen, Dänemark, August 9-15 1998.
27
O. Scherzer.
An iterative multi level algorithm for solving nonlinear ill-posed problems.
Numer. Math., 80:579-600, 1998.
28
O. Scherzer.
Methoden zur Lösung von Inversen Problemen.
April 2nd 1998.
29
O. Scherzer.
Methoden zur Lösung von Inversen Problemen.
Universität Zürich, April 16th 1998.
30
O. Scherzer.
A posteriori estimates for nonlinear (ill-posed) operator equations.
Submitted, 1998.
31
O. Scherzer.
On oilfiled cementing and image processing.
Graz, Workshop on Image Processing and Analysis, May 1999.
32
O. Scherzer.
Scale-space properties of regularization methods.
Second International Conference on Scale-Space Theories in Computer Vision, September 1999.
33
O. Scherzer, A. Schoisswohl, and A. Kratochwil.
Wavelet compression of 3d ultrasound data.
Submitted, 1998.
34
O. Scherzer, A. Schoisswohl, and A. Kratochwil.
Compression of 3d ultrasound data using wavelet bases on intervals.
Technical Report 9-00, SFB 013, 2000.
35
O. Scherzer and J. Weickert.
Relations between regularization and diffusion filtering.
Submitted, 1998.
36
A. Schoisswohl.
Image matching.
ICIAM 1999, Edinburgh, Juli 1999.
37
A. Schoisswohl.
A computer algebra approach to orthonormal wavelets.
March 2000.
38
A. Schoisswohl.
Computer Algebra Methoden zur Konstruktion von Wavelets.
LMU Muenchen, June 2000.
39
A. Schoisswohl.
Computer algebraic methods for the construction of wavelets and applications to medical imaging.
PhD thesis, University of Linz, June 2000.
40
J. Weickert and O. Scherzer.
On regularization and diffusion filtering.
J. Math. Imag. Vision., 12:43-63, 2000.




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SpezialForschungsBereich SFB F013 | Special Research Program of the FWF - Austrian Science Fund