Veröffentlichungen 2013

2013

Bayerschen, E., Wulfinghoff, S., Böhlke, T.:‎
Some Remarks on the Numerical Solution of a Strain Gradient Plasticity Theory.
PAMM • Proc. Appl. Math. Mech. 13(1), 183-184 (2013)
DOI: 10.1002/pamm.201310087
http://onlinelibrary.wiley.com/doi/10.1002/pamm.201310087/abstract

Böhlke, T., Langhoff, T.-A., Lin, S., Gross, T.:
Homogenization of the Elastic Properties of Pyrolytic Carbon Based on an Image Processing Technique.
ZAMM · Z. Angew. Math. Mech. 93(5), 313-328 (2013)
DOI: 10.1002/zamm.201100180

Böhlke, T., Othmani, Y.:
A Two-Scale Weakest Link Model based on a Micromechanical Approach.
Computational Materials Science (2013)
DOI: 10.1016/j.commatsci.2013.04.018

Brylka, B., Böhlke, T., Henning, F., Wood, J.:
Anisotrope viskoelastische und temperaturabhängige Eigenschaften langfaserverstärkter ‎Thermoplaste.
DGM-Tagungsband: 19. Symposium Verbundwerkstoffe und Werkstoffverbunde, 634-‎‎639 (2013)

Fritzen, F., Forest, S., Kondo, D., Böhlke, T.:
Computational homogenization of porous materials of Green type.
Comput Mech 52, 121-134 (2013)
DOI: 10.1007/s00466-012-0801-z

Fritzen, F., Böhlke, T.:
Reduced basis homogenization of viscoelastic composites.
Composites Science and Technology 76, 84-91 (2013)

Fritzen, F., Leuschner, M.:
Reduced basis hybrid computational homogenization based on a mixed incremental formulation.
Computer Methods in Applied Mechanics and Engineering 260, 143–154 (2013)

Jöchen, K. (2013).
Homogenization of the linear and non-linear mechanical behavior of polycrystals.
Doctoral thesis, Schriftenreihe Kontinuumsmechanik im Maschinenbau Nr. 4, KIT Scientific Publishing, Karlsruhe (2013)
http://swb.bsz-bw.de/DB=2.1/PPN?PPN=381397416

Jöchen, K., Böhlke, T.:
Representative reduction of crystallographic orientation data.
Journal of Applied Crystallography 46, Part 4, 960-971 (2013)
DOI: 10.1107/S0021889813010972

Müller, V., Böhlke, T., Dillenberger, F., Kolling, S.
Homogenization of Elastic Properties of Short Fiber Reinforced Composites Based on Discrete Microstructure Data
PAMM - Proc. Appl. Math. Mech. 13(1), 269-270 (2013)
DOI: 10.1002/pamm.201310130
http://onlinelibrary.wiley.com/doi/10.1002/pamm.201310130/abstract

Rieger, F., Böhlke, T.:
Influence of the Homogenization on the Transient Behavior of Size ‎Distributed Polycrystals.
Proceedings in Applied Mathematics and Mechanics, 2013‎

Senn, M., Jöchen, K., Phan Van, T., Böhlke, T., Link, N.:
In-depth online monitoring of the sheet metal process state derived from multi-scale simulations.
International Journal of Advanced Manufacturing Technology, 65(5-8), 1-12 (2013)

Wippler, J., Fett, T., Böhlke, T., Hoffmann, M.J.:
A micromechanically motivated finite element approach to the fracture toughness of silicon nitride.
Journal of the European Ceramic Society 33, 1729-1736 (2013)

Wulfinghoff, S., Bayerschen, E., Böhlke, T.:‎
Micromechanical Simulation of the Hall-Petch Effect with a Crystal Gradient Theory including a Grain Boundary Yield Criterion.
PAMM • Proc. Appl. Math. Mech. 13(1), 15-18 (2013)
DOI: 10.1002/pamm.201310005
http://onlinelibrary.wiley.com/doi/10.1002/pamm.201310005/abstract

Wulfinghoff, S., Bayerschen, E., Böhlke, T.:
A gradient plasticity grain boundary yield theory.
International Journal of Plasticity 51, 33-46 (2013)

Wulfinghoff, S., Böhlke, T.:
Equivalent plastic strain gradient crystal plasticity - enhanced ‎power law subroutine.
GAMM-Mitteilungen 36(2), 134-148 (2013)

Wulfinghoff, S., Bayerschen, E., Böhlke, T.:‎
Modeling of the Hall-Petch Effect with a Gradient Crystal Plasticity Theory including a Grain ‎Boundary Yield Condition.‎
Proceedings of the XII International Conference on Computational Plasticity, COMPLAS XII, E. ‎Oñate, D.R.J. Owen, D. Peric and B. Suárez (Eds.), (2013)‎

 

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