Publications

Klaus Deckelnick, and Kunibert G. Siebert. $W^1,ınfty$-Convergence of the Discrete Free Boundary for Obstacle Problems. IMA Journal of Numerical Analysis, (20)3:481-498, 2000. [PUMA: imported from:mhartmann vorlaeufig ians] URL

R. Eymard, G. Henry, R. Herbin, F. Hubert, R. Klöfkorn, and G. Manzini. 3D Benchmark on Discretization Schemes for Anisotropic Diffusion Problems on General Grids. In J. Fort, J. Fürst, J. Halama, R. Herbin, and F. Hubert (Eds.), Finite Volumes for Complex Applications VI Problems & Perspectives, (4):895-930, Springer Berlin Heidelberg, 2011. [PUMA: imported from:mhartmann vorlaeufig ians] URL

Pedro Morin, Kunibert G. Siebert, and Andreas Veeser. A Basic Convergence Result for Conforming Adaptive Finite Element Methods. 1705-1708, 2007. [PUMA: imported from:mhartmann vorlaeufig ians] URL

Pedro Morin, Kunibert G. Siebert, and Andreas Veeser. A Basic Convergence Result for Conforming Adaptive Finite Elements. Mathematical Models and Methods in Applied Science, (18):707-737, 2008. [PUMA: imported from:mhartmann vorlaeufig ians] URL

R. Backofen, H.-G. Borrmann, W. Deck, A. Dedner, L. De Raedt, K. Desch, M. Diesmann, M. Geier, A. Greiner, W.R. Hess, J. Honerkamp, S. Jankowski, I. Krossing, A.W. Liehr, A. Karwathi, R. Klöfkorn, R. Pesché, T.C. Potjans, M.C. Röttger, L. Schmidt-Thieme, G. Schneider, B. Voß, B. Wiebelt, P. Wienemann, and V.-H. Winterer. A Bottom-up approach to Grid-Computing at a University: the Black-Forest-Grid Initiative. Praxis der Informationsverarbeitung und Kommunikation, (29)2:81-87, 2006. [PUMA: imported from:mhartmann vorlaeufig ians]

Wolfgang Dreyer, Jan Giesselmann, and Christiane Kraus. A compressible mixture model with phase transition. Physica D, (273-274):1-13, 2014. [PUMA: imported from:mhartmann vorlaeufig ians] URL

D. Amsallem, B. Haasdonk, and G. Rozza. A Conference within a Conference for MOR Researchers. SIAM News, (46)6:8, July 2013. [PUMA: imported from:mhartmann vorlaeufig ians] URL

Holger Perfahl, and Anna-Margarete Sändig. A Continuum-Mechanical Approach to Avascular Solid Tumor Growth. 2008. [PUMA: imported from:mhartmann vorlaeufig ians] URL

Kunibert G. Siebert. A Convergence Proof for Adaptive Finite Elements without Lower Bound. IMA Journal of Numerical Analysis, (31)3:947-970, 2011. [PUMA: adaptivity from:mhartmann convergence elements finite density vorlaeufig ians] URL

Jan Giesselmann. A convergence result for finite volume schemes on Riemannian manifolds. M2AN Math. Model. Numer. Anal., (43)5:929-955, 2009. [PUMA: imported from:mhartmann vorlaeufig ians] URL