The SFB program expired on September 30, 2008. For the link to the successor project click DK Computational Mathematics
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September 27, 2008

Bibliography

1
M. Burger.
Growth and impingement in polymer melts.
In P. Colli et al., editors, Free Boundary Problems, pages 65-74. Birkhäuser Basel, 2003.
2
M. Burger, V. Capasso, G. Eder, and H. W. Engl.
Modelling and parameter identification in nonisothermal crystallization of polymers.
In L. Arkeryd et al., editors, Progress in Industrial Mathematics at ECMI 98, pages 114-121. Teubner, Stuttgart, Leipzig, 1999.
3
M. Burger, V. Capasso, and A. Micheletti.
Mathematical modelling of the crystallization process of polymers.
In E. A. Lipitakis, editor, Proceedings of the 5th Helenic European Conference on Computer Mathematics and its Applications (LEA, Athens, 2002), pages 51-63, 2001.
Repreint in HERMIS International Journal 3(2003), 135-164.
4
M. Burger, V. Capasso, and A. Micheletti.
An extension of the Avrami-Kolmogorov formula to inhomogeneous birth-and-growth processes.
In G. Aletti et al., editors, Deterministic and Stochastic Modelling in Biomedicine, Economics and Industry, pages 63-76. Springer, 2006.
5
M. Burger, H. W. Engl, and P. Markowich.
Inverse doping problems for semiconductor devices.
In Recent Progress in Computational and Applied PDEs, pages 27-38. Kluwer Academic/Plenum Publishers, 2002.
6
H. Egger.
Recovering volatility in the Black-Scholes model.
In I. Troch and F. Breitenecker, editors, Proceedings of the 4th MATHMOD Vienna, 2003.
ARGESIM Report no. 24.
7
H. W. Engl.
Regularization methods for solving inverse problems.
In Proceedings of ICIAM 99, 1999.
8
H. W. Engl.
Inverse problems and their regularization.
In Proc. of a CIME Workshop on ``Mathematics motivated by industrial problems''. Springer, 2000.
9
H. W. Engl, G. Gökler, A. Schatz, and H. Zeisel.
Modelling and numerics for the transient simulation of the blast furnace process.
In R. Jeltsch, T.-T. Li, and I. H. Sloan, editors, Some Topics in Industrial and Applied Mathematics, Proceedings of Shanghai Forum on Industrial and Applied Mathematics, volume 8 of Series in Contemporary Applied Mathematics. World Scientific Publishing, 2006.
10
H. W. Engl and P. Kügler.
Parameter identification in industrial problems via iterative regularization methods.
In A. Fitt et al., editors, Progress in Industrial Mathematics at ECMI 02. ECMI, Springer, 2003.
11
H. W. Engl and P. Kügler.
Nonlinear inverse problems: theoretical aspects and some industrial applications.
In V. Capasso and J. Periaux, editors, Multidisciplinary methods for analysis, optimization and control of complex systems, Mathematics in Industry, pages 3-48. Springer, 2005.
12
H. W. Engl, J. Lu, R. Machné, and P. Schuster.
Inverse bifurcation analysis of a model for the mammalian G1/S regulatory module.
In S. Hochreiter and R. Wagner, editors, Proceedings of Bioinformatics in Research and Development, Lecture Notes in Bioinformatics, volume LNBI 4414, pages 168-184. BIRD 2007, Springer, 2007.
13
H. W. Engl and O. Scherzer.
Convergence rates results for iterative methods for solving nonlinear ill-posed problems.
In D. Colton, H. W. Engl, A. K. Louis, J. R. McLaughlin, and W. F. Rundell, editors, Solution Methods for Inverse Problems. Springer, 2000.
14
P. Favaro, M. Burger, and S. Soatto.
Scene and motion reconstruction from defocused and motion blurred images via anisotropic diffusion.
In T. Pajdla and J. Matas, editors, Proceedings of ECCV 2004, pages 257-269. Springer Berlin, April 2004.
15
H. Gu and M. Burger.
Preprocessing for finite element discretizations of geometric problems.
In Proceedings of The International Workshop of Symbolic and Numerical Computation, Xi'an, China., 2005.
16
T. Hohage.
Iterative regularization methods in inverse scattering.
In K. A. Woodbury, editor, Inverse Problems in Engineering: Theory and Practice, New York, 1999. The American Society of Mechanical Engineers.
17
B. Kaltenbacher.
A projection-regularized Newton method for nonlinear ill-posed problems and its application to parameter identification problems with finite element discretization.
In ZAMM (special issue on GAMM99), 2000.
18
P. Kügler.
Parameter identification in industrial problems via iterative regularization methods.
In A. Fitt, editor, Progress in Industrial Mathematics at ECMI 2002, pages 13-29. Springer, 2004.
19
R. Stainko and M. Burger.
A one shot approach to topology optimization with local stress constraints.
In M. P. Bendsoe, N. Olhoff, and O. Sigmund, editors, IUATM Symposium on Topology Design Optimization of Structures, Machines and Materials, volume 137 of Solid Mechanics and its Applications, pages 181-184. IUTAM, Springer, 2006.




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