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Publications 2010:

(Preprints are available on request. Interested? Please contact johannes.scherling"at"uni-graz.at ("at"=@))

  • A. Laurain and Y. Privat , On a Bernoulli problem with geometric constraints. IFB-Report No. 42 (10/2010), Institute of Mathematics and Scientific Computing, University of Graz. Accepted for publication in ESAIM: Control, Optimisation and Calculus of Variations (2010).

  • M. Hintermüller, S.L. Keeling, F. Knoll, D. Kraft, and A. Laurain , A Total Variation Based Approach to Correcting Surface Coil Magnetic Resonance Images. SFB-Report 2010-016. Published in: Applied Mathematics and Computation, Volume 218, Issue 2, 15 September 2011, pp. 219-232.

  • Y. Dong, M. Hintermüller, F. Knoll and R. Stollberger , Total Variation Denoising with Spatially Dependent Regularization. ISMRM 18th Annual Scientific Meeting and Exhibition 2010 Proceedings, p. 5088.

  • M. Hintermüller and V.A. Kovtunenko, From Shape Variation to Topology Changes in Constrained Minimization: A Velocity Method Based Concept. Optimization Methods and Software, Volume 26, Issue 4-5, 2011, pp. 513-532.

  • M. Hintermüller, M. Hinze, and R. H. W. Hoppe , Weak-Duality Based Adaptive Finite Element Methods for PDE-Constrained Optimization with Pointwise Gradient State-Constraints. IFB-Report No. 40 (08/2010), Institute of Mathematics and Scientific Computing, University of Graz. Published in: Journal of Computational Mathematics, Vol. 30 Issue 2 (2012), pp. 101-123.

  • M. Hintermüller and T. Surowiec, First Order Optimality Conditions for Elliptic Mathematical Programs with Equilibrium Constraints via Variational Analysis. SIAM J. on Optimization, Volume 21, Issue 4 (2011), pp. 1561-1593.

  • M. Hintermüller and M.M. Rincon-Camacho, An adaptive finite element method in L2-TV-based image denoising. IFB-Report No. 38 (08/2010), Institute of Mathematics and Scientific Computing, University of Graz. Accepted for publication in: Inverse Problems and Imaging.

  • K. Chen, Y. Dong and M. Hintermüller, A Nonlinear Multigrid Solver with Line Gauss-Seidel-Semismooth-Newton-Smoother for the Fenchel-Pre-Dual in Total Variation based Image Restoration. IFB-Report No. 37 (05/2010), Institute of Mathematics and Scientific Computing, University of Graz. Published in: Inverse Problems and Imaging, Volume 5, Issue 2 (2011), pp. 323-339.

  • M. Hintermüller, V. Kovtunenko and K. Kunisch, Obstacle problems with cohesion: A Hemi-variational inequality approach and its efficient numerical solution. IFB-Report No. 36 (01/2010), Institute of Mathematics and Scientific Computing, University of Graz. Published in: SIAM Journal on Optimization 21 (2), 2011, pp. 491-516. Download pdf-file.

  • M. Hintermüller and J.C. de los Reyes, A duality-based semismooth Newton framework for solving variational inequalities of the second kind. IFB-Report No. 35 (01/2010), Institute of Mathematics and Scientific Computing, University of Graz. Published in: Interfaces and Free Boundaries 13 (2011), 437-462.

  • M. Hintermüller and R.H.W. Hoppe, Goal-oriented adaptivity in pointwise state constrained optimal control of partial differential equations. SIAM J. Control and Optimization, Volume 48, Issue 8 (2010), pp. 5468-5487.

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