Publications

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: in method finite media; porous Flow ians Hybrid Galerkin from:mhartmann volume stochastic vorlaeufig] URL

Andrea Barth, Raimund Burger, Ilja Kroeker, and Christian Rohde. Computational uncertainty quantification for a clarifier-thickener model with several random perturbations: A hybrid stochastic Galerkin approach. COMPUTERS & CHEMICAL ENGINEERING, (89):11-26, PERGAMON-ELSEVIER SCIENCE LTD, THE BOULEVARD, LANGFORD LANE, KIDLINGTON, OXFORD OX5 1GB, ENGLAND, June 2016. [PUMA: Finite Uncertainty Polynomial quantification; chaos; Hybrid method} projection; Galerkin volume Galerkin; stochastic model; {Clarifier-thickener]

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: volume in method finite media; stochastic porous Flow vorlaeufig Hybrid Galerkin] URL

Andrea Barth, and Franz G. Fuchs. UNCERTAINTY QUANTIFICATION FOR HYPERBOLIC CONSERVATION LAWS WITH FLUX COEFFICIENTS GIVEN BY SPATIOTEMPORAL RANDOM FIELDS. SIAM JOURNAL ON SCIENTIFIC COMPUTING, (38)4:A2209-A2231, SIAM PUBLICATIONS, 3600 UNIV CITY SCIENCE CENTER, PHILADELPHIA, PA 19104-2688 USA, 2016. [PUMA: hyperbolic field; field} finite Carlo quantification; Monte method; differential uncertainty random Ornstein-Uhlenbeck {stochastic volume flux equation; spatiotemporal Gaussian partial process; function;]

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: Finite Two-phase models Dynamic in methods from:brittalenz Fracture porous am media fracture Moving-mesh ians matrix aperture volume propagation Discrete flow algorithm] URL

Ilja Kr�ker, Wolfgang Nowak, and Christian Rohde. A stochastically and spatially adaptive parallel scheme for uncertain and nonlinear two-phase flow problems. Comput. Geosci., (19)2:269--284, Springer International Publishing, 2015. [PUMA: Finite Nonlinear volume Galerkin; stochastic Stochastic vorlaeufig method; Hybrid] URL

Daniel Beinke, Christian Oberdorfer, and Guido Schmitz. Towards an accurate volume reconstruction in atom probe tomography. ULTRAMICROSCOPY, (165):34-41, ELSEVIER SCIENCE BV, PO BOX 211, 1000 AE AMSTERDAM, NETHERLANDS, June 2016. [PUMA: probe tessellation} Volume trajectories; tomography; Ion Delaunay reconstruction; {Atom]

Florian Bienert, Fangfang Li, Marina Fetisova, Petri Karvinen, Markku Kuittinen, Thomas Graf, and Marwan Abdou Ahmed. Diode stabilization with dual duty-cycle resonant waveguide grating. Laser Congress 2023 (ASSL, LAC), AW3A.5, Optica Publishing Group, 2023. [PUMA: myown Lithography Diode diffraction infrared Waveguide peer Volume Laser gratings operation lasers] URL