Upscaling and spatial localization of non-local energies with applications to crystal plasticity

Abstract

We describe multiscale geometrical changes via structured deformations (g,G) and the non-local energetic response at a point x via a function of the weighted averages of the jumps [un](y) of microlevel deformations un at points y within a distance r of x. The deformations un are chosen so that n ∞ un=g and n ∞ ∇ un= G. We provide conditions on under which the upscaling "n ∞" results in a macroscale energy that depends through on (1) the jumps [g] of g and the "disarrangment field" ∇ g-G, (2) the "horizon" r, and (3) the weighting function α r for microlevel averaging of [un](y). We also study the upscaling "n ∞" followed by spatial localization "r 0" and show that this succession of processes results in a purely local macroscale energy I(g,G) that depends through upon the jumps [g] of g and the "disarrangment field" ∇ g-G, alone. In special settings, such macroscale energies I(g,G) have been shown to support the phenomena of yielding and hysteresis, and our results provide a broader setting for studying such yielding and hysteresis. As an illustration, we apply our results in the context of the plasticity of single crystals.