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Matti Schneider
Matti Schneider
University of Duisburg-Essen, Institute of Engineering Mathematics
Verified email at uni-due.de
Title
Cited by
Cited by
Year
Computational homogenization of elasticity on a staggered grid
M Schneider, F Ospald, M Kabel
International Journal for Numerical Methods in Engineering 105 (9), 693-720, 2016
1962016
Efficient fixed point and Newton–Krylov solvers for FFT-based homogenization of elasticity at large deformations
M Kabel, T Böhlke, M Schneider
Computational Mechanics 54 (6), 1497-1514, 2014
1942014
Use of composite voxels in FFT-based homogenization
M Kabel, D Merkert, M Schneider
Computer Methods in Applied Mechanics and Engineering 294, 168-188, 2015
1372015
A review of nonlinear FFT-based computational homogenization methods
M Schneider
Acta Mechanica 232 (6), 2051-2100, 2021
1342021
FFT‐based homogenization for microstructures discretized by linear hexahedral elements
M Schneider, D Merkert, M Kabel
International journal for numerical methods in engineering 109 (10), 1461-1489, 2017
1322017
The sequential addition and migration method to generate representative volume elements for the homogenization of short fiber reinforced plastics
M Schneider
Computational Mechanics 59, 247-263, 2017
1172017
Mixed boundary conditions for FFT-based homogenization at finite strains
M Kabel, S Fliegener, M Schneider
Computational Mechanics 57, 193-210, 2016
932016
Fiber orientation interpolation for the multiscale analysis of short fiber reinforced composite parts
J Köbler, M Schneider, F Ospald, H Andrä, R Müller
Computational Mechanics 61, 729-750, 2018
782018
On the micromechanics of deep material networks
S Gajek, M Schneider, T Böhlke
Journal of the Mechanics and Physics of Solids 142, 103984, 2020
592020
Fast implicit solvers for phase-field fracture problems on heterogeneous microstructures
F Ernesti, M Schneider, T Böhlke
Computer Methods in Applied Mechanics and Engineering 363, 112793, 2020
552020
An FFT-based fast gradient method for elastic and inelastic unit cell homogenization problems
M Schneider
Computer Methods in Applied Mechanics and Engineering 315, 846-866, 2017
552017
On the Barzilai‐Borwein basic scheme in FFT‐based computational homogenization
M Schneider
International Journal for Numerical Methods in Engineering 118 (8), 482-494, 2019
502019
The composite voxel technique for inelastic problems
M Kabel, A Fink, M Schneider
Computer Methods in Applied Mechanics and Engineering 322, 396-418, 2017
502017
Convergence of FFT‐based homogenization for strongly heterogeneous media
M Schneider
Mathematical Methods in the Applied Sciences 38 (13), 2761-2778, 2015
482015
Computational homogenization of sheet molding compound composites based on high fidelity representative volume elements
J Görthofer, M Schneider, F Ospald, A Hrymak, T Böhlke
Computational Materials Science 174, 109456, 2020
452020
An FE–DMN method for the multiscale analysis of short fiber reinforced plastic components
S Gajek, M Schneider, T Böhlke
Computer Methods in Applied Mechanics and Engineering 384, 113952, 2021
442021
On Quasi‐Newton methods in fast Fourier transform‐based micromechanics
D Wicht, M Schneider, T Böhlke
International Journal for Numerical Methods in Engineering 121 (8), 1665-1694, 2020
412020
A computational multi-scale model for the stiffness degradation of short-fiber reinforced plastics subjected to fatigue loading
J Köbler, N Magino, H Andrä, F Welschinger, R Müller, M Schneider
Computer Methods in Applied Mechanics and Engineering 373, 113522, 2021
402021
On polarization-based schemes for the FFT-based computational homogenization of inelastic materials
M Schneider, D Wicht, T Böhlke
Computational Mechanics 64, 1073-1095, 2019
402019
An efficient solution scheme for small-strain crystal-elasto-viscoplasticity in a dual framework
D Wicht, M Schneider, T Böhlke
Computer Methods in Applied Mechanics and Engineering 358, 112611, 2020
342020
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