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Projects Phase 1
Projects Phase 1
Adaptive isogeometric modeling of propagating strong discontinuities
Finite element approximation of functions of bounded variation
Generalized Mixed nonlinear FEM
High-order immersed-boundary methods
Hybrid discontinuous Galerkin methods
Isogeometric and stochastic collocation methods
Least Squares finite elements for finite elasto-plasticity
Modelling of 3D Crack Propagation
Novel finite elements for anisotropic media
Simulation of pneumatic and hydraulic fracture
Smooth discretization approach for elasto-plastic contact
Projects Phase 2
Projects Phase 2
Foundation and application of generalized mixed FEM towards nonlinear problems in solid mechanics
Approximation and reconstruction of stresses in the deformed configuration for hyperelastic material models
Robust and Efficient Finite Element Discretizations for Higher-Order Gradient Formulations
High-order immersed-boundary methods in solid mechanics for structures generated by additive processes
Reliability of Efficient Approximation Schemes for Material Discontinuities Described by Functions of Bounded Variation
Adaptive isogeometric modeling of discontinuities in complex-shaped heterogeneous solids
Advanced Finite Element Modelling of 3D Crack Propagation by a Phase Field Approach
Isogeometric and stochastic collocation methods for nonlinear probabilistic multiscale problems in solid mechanics
Hybrid discretizations in solid mechanics for non-linear and non-smooth problems
Novel finite elements - Mixed, Hybrid and Virtual Element formulations at finite strains for 3D applications
Structure Preserving Adaptive Enriched Galerkin Methods for Pressure-Driven 3D Fracture Phase-Field Models
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Bad Honnef
Annual Meeting 2017
Bad Honnef, 21 - 23 August 2017
Modern Finite Element Technologies 2017
www.mfet2017.de
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