Abstract
AbstractThe starting point for this work is a static macroscopic model for a high-contrast layered material in single-slip finite crystal plasticity, identified in (Christowiak and Kreisbeck, Calc. Var. PDE, 2017) as a homogenization limit via Γ-convergence. First, we analyze the minimizers of this limit model, addressing the question of uniqueness and deriving necessary conditions. In particular, it turns out that at least one of the defining quantities of an energetically optimal deformation, namely the rotation and the shear variable, is uniquely determined. We further identify conditions that give rise to a trivial material response in the sense of rigid-body motions. The second part is concerned with extending the static homogenization to an evolutionary Γ-convergence-type result for rate-independent systems in specific scenarios: we work under certain assumptions on the slip systems and suitable regularizations of the energies, where energetic and dissipative effects decouple in the limit. Interestingly, when the slip direction is aligned with the layered microstructure, the limiting system is purely energetic. This can be interpreted as a loss of dissipation through homogenization.
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