C
Christian Miehe
Researcher at University of Stuttgart
Publications - 240
Citations - 16394
Christian Miehe is an academic researcher from University of Stuttgart. The author has contributed to research in topics: Finite element method & Homogenization (chemistry). The author has an hindex of 56, co-authored 240 publications receiving 13585 citations. Previous affiliations of Christian Miehe include Leibniz University of Hanover.
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A phase field model for rate-independent crack propagation: Robust algorithmic implementation based on operator splits
TL;DR: In this paper, a variational framework for rate-independent diffusive fracture was proposed based on the introduction of a local history field, which contains a maximum reference energy obtained in the deformation history, which may be considered as a measure for the maximum tensile strain obtained in history.
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Thermodynamically consistent phase‐field models of fracture: Variational principles and multi‐field FE implementations
TL;DR: In this article, a thermodynamically consistent framework for phase-field models of crack propagation in elastic solids, developed incremental variational principles and considering their numerical implementations by multi-field finite element methods is presented.
Thermodynamically-Consistent Phase Field Models of Fracture: Variational Principles and Multi-Field
TL;DR: In this paper, a thermodynamically consistent framework for phase field models of crack propagation in elastic solids, developed incremental variational principles and considered their numerical implementations by multi- field finite element methods.
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Computational homogenization analysis in finite plasticity Simulation of texture development in polycrystalline materials
TL;DR: In this paper, the deformation of a micro-structure is coupled with the local deformation at a typical material point of the macro-continuum by three alternative constraints of the microscopic fluctuation field.
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Computational micro-to-macro transitions of discretized microstructures undergoing small strains
Christian Miehe,A. Koch +1 more
TL;DR: In this paper, the Lagrangian multiplier method is used for the computation of equilibrium states and the overall properties of discretized microstructures, where the overall macroscopic deformation is controlled by three boundary conditions: linear displacements, constant tractions and periodic displacements.