Publications

S. Brdar, M. Baldauf, A. Dedner, und 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: Finite Density Discontinuous differences; Compressible current; Euler; gravity Navier???Stokes; Galerkin; Inertia flow; vorlaeufig] 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 convergence elements finite density vorlaeufig] URL

Pedro Morin, Kunibert G. Siebert, und Andreas Veeser. Convergence of Finite Elements Adapted for Weaker Norms. In V. Cutello, G. Fotia, und L. Puccio (Hrsg.), Applied and Industrial Matematics in Italy - II, (75):468-479, World Sci. Publ., Hackensack, NJ, 2007. [PUMA: elements; convergence finite Adaptivity; conforming vorlaeufig] URL

M. Köppel, I. Kröker, und C. Rohde. Stochastic Modeling for Heterogeneous Two-Phase Flow. In Jürgen Fuhrmann, Mario Ohlberger, und Christian Rohde (Hrsg.), 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

Alfred Schmidt, und Kunibert G. Siebert. ALBERT --- Software for Scientific Computations and Applications. Acta Mathematica Universitatis Comenianae, New Ser., (70)1:105-122, 2001. [PUMA: design software scientific Adaptive finite element software, methods, vorlaeufig] URL

Andreas Bamberger, Eberhard Bänsch, und Kunibert G. Siebert. Experimental and numerical investigation of edge tones. ZAMM Journal of Applied Mathematics and Mechanics, (84)9:632-646, 2004. [PUMA: equations;adaptive edge methods;Navier-Stokes investigation;numerical elements tones;experimental finite vorlaeufig] URL

Daniel Köster, Oliver Kriessl, und 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: design software scientific Adaptive finite element software, methods, vorlaeufig] URL

Ilja Kr�ker, Wolfgang Nowak, und 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

Christian Kreuzer, Christian Möller, Alfred Schmidt, und Kunibert G. Siebert. Design and Convergence Analysis for an Adaptive Discretization of the Heat Equation. IMA Journal of Numerical Analysis, 2012. [PUMA: parabolic problems, adaptive elements, convergence finite analysis vorlaeufig] URL

F. D. Gaspoz, C. Kreuzer, K. Siebert, und D. Ziegler. A convergent time-space adaptive $dG(s)$ finite element method for parabolic problems motivated by equal error distribution. Submitted, 2017. [PUMA: a equation estimators, convergence, error finite methods, posteriori adaptivity, element vorlaeufig heat] URL

F. D. Gaspoz, P. Morin, und 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: a Dirac estimators, error finite fractional methods, posteriori adaptivity, element spaces mass, Sobolev vorlaeufig] URL

Simon Aicher, Maren Hirsch, und Zachary Christian. Hybrid cross-laminated timber plates with beech wood cross-layers. CONSTRUCTION AND BUILDING MATERIALS, (124):1007-1018, ELSEVIER SCI LTD, THE BOULEVARD, LANGFORD LANE, KIDLINGTON, OXFORD OX5 1GB, OXON, ENGLAND, Oktober 2016. [PUMA: Finite (CLT); Compression Shear Spruce shear (Picea analysis; (Fagus abies); Rolling gamma-Method; method} {Cross-laminated analogy sylvatica); Beech element Bending test; timber wood strength; modulus;]

Andrea Barth, Raimund Burger, Ilja Kroeker, und 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, Juni 2016. [PUMA: Finite Uncertainty Polynomial quantification; chaos; Hybrid method} projection; Galerkin volume Galerkin; stochastic model; {Clarifier-thickener]

Andrea Barth, Santiago Moreno-Bromberg, und Oleg Reichmann. A Non-stationary Model of Dividend Distribution in a Stochastic Interest-Rate Setting. COMPUTATIONAL ECONOMICS, (47)3:447-472, SPRINGER, VAN GODEWIJCKSTRAAT 30, 3311 GZ DORDRECHT, NETHERLANDS, März 2016. [PUMA: Finite methods control; for Numerical differential method} Singular equations; distribution; stochastic element {Dividend partial]

Andrea Barth, und 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;]

M. Abbaszadeh, J. Kadkhodapour, S. Schmauder, und M. Hoseinpour. A study on the effect of grain dimension on the deformation of stent struts in tension, bending and unbending loading modes. INTERNATIONAL JOURNAL OF MECHANICAL SCIENCES, (118):36-44, PERGAMON-ELSEVIER SCIENCE LTD, THE BOULEVARD, LANGFORD LANE, KIDLINGTON, OXFORD OX5 1GB, ENGLAND, November 2016. [PUMA: Finite element} stents; {Coronary Crystal plasticity;]