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
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
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
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
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
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
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
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
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
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
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
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;]
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]
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]
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;]
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;]