Publications

Christina Lienstromberg, Tania Pernas-Casta\ no, and Juan J. L. Velázquez. Analysis of a two-fluid Taylor-Couette flow with one non-Newtonian fluid. J. Nonlinear Sci., (32)2:Paper No. 24, 55, 2022. [PUMA: Lienstromberg iadm two-fluid from:elkepeter flow Taylor-Couette] URL

Samuel Burbulla, and Christian Rohde. A finite-volume moving-mesh method for two-phase flow in fracturing porous media. J. Comput. Phys., 111031, 2022. [PUMA: Discrete Dynamic Finite Fracture Moving-mesh Two-phase algorithm am aperture flow fracture from:brittalenz ians in matrix media methods models porous propagation volume] URL

Tobias Köppl, Gabriele Santin, Bernard Haasdonk, and Rainer Helmig. Numerical modelling of a peripheral arterial stenosis using dimensionally reduced models and kernel methods. International Journal for Numerical Methods in Biomedical Engineering, (34)8:e3095, 2018. [PUMA: anm blood dimensionally flow from:britsteiner ians kernel methods, mixed‐dimension models, peripheral real‐time reduced simulations simulations, stenosis, surrogate] URL

S. Hoher, P. Schindler, S. G?ttlich, V. Schleper, and S. Röck. System Dynamic Models and Real-time Simulation of Complex Material Flow Systems. In Hoda A. ElMaraghy (Eds.), Enabling Manufacturing Competitiveness and Economic Sustainability, 316-321, Springer Berlin Heidelberg, 2012. [PUMA: Material Real-time System dynamic flow from:mhartmann ians models simulation; system; vorlaeufig] URL

M. Köppel, I. Kröker, and C. Rohde. Stochastic Modeling for Heterogeneous Two-Phase Flow. In Jürgen Fuhrmann, Mario Ohlberger, and Christian Rohde (Eds.), Finite Volumes for Complex Applications VII-Methods and Theoretical Aspects, (77):353-361, Springer International Publishing, 2014. [PUMA: Flow Galerkin Hybrid finite from:mhartmann ians in media; method porous stochastic volume vorlaeufig] URL

Tobias Köppl, Gabriele Santin, Bernard Haasdonk, and Rainer Helmig. Numerical modelling of a peripheral arterial stenosis using dimensionally reduced models and kernel methods. International Journal for Numerical Methods in Biomedical Engineering, (0)ja:e3095, 2018. [PUMA: blood dimensionally flow from:mhartmann ians kernel methods, mixed-dimension models, peripheral real-time reduced simulations simulations, stenosis, surrogate vorlaeufig] URL

F. Kissling, and K.H. Karlsen. On the singular limit of a two-phase flow equation with heterogeneities and dynamic capillary pressure. ZAMM - Journal of Applied Mathematics and Mechanics / Zeitschrift für Angewandte Mathematik und Mechanik, n/a--n/a, WILEY-VCH Verlag, 2013. [PUMA: Conservation capillarity, discontinuous dynamic flow flux from:mhartmann function, ians in law, limit, media. porous singular two-phase vorlaeufig] URL