Publications

F. D. Gaspoz, P. Morin, and A. Veeser. A posteriori error estimates with point sources in fractional sobolev spaces. Numerical Methods for Partial Differential Equations, (33)4:1018--1042, 2017. [PUMA: Dirac Sobolev a adaptivity, element error estimators, finite fractional from:mhartmann ians mass, methods, posteriori spaces vorlaeufig] URL

S. Brdar, M. Baldauf, A. Dedner, and R. Klöfkorn. Comparison of dynamical cores for NWP models: comparison of COSMO and Dune. Theoretical and Computational Fluid Dynamics, 1-20, Springer-Verlag, 2012. [PUMA: Compressible Density Discontinuous Euler; Finite Galerkin; Inertia Navier???Stokes; current; differences; flow; from:mhartmann gravity ians vorlaeufig] URL

Daniel Köster, Oliver Kriessl, and Kunibert G. Siebert. Design of Finite Element Tools for Coupled Surface and Volume Meshes. Numerical Mathematics: Theory, Methods and Applications, (1)3:245-274, 2008. [PUMA: Adaptive design element finite from:mhartmann ians methods, scientific software software, 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

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