The Peridynamic Stress Tensors and the Non-local to Local Passage

Abstract

We re-examine the notion of stress in peridynamics. Based on the idea of traction we define two new peridynamic stress tensors Py and P which stand, respectively, for analogues of the Cauchy and 1st Piola-Kirchhoff stress tensors from classical elasticity. We show that the tensor P differs from the earlier defined peridynamic stress tensor ; though their divergence is equal. We address the question of symmetry of the tensor Py which proves to be symmetric in case of bond-based peridynamics; as opposed to the inverse Piola transform of (corresponding to the analogue of Cauchy stress tensor) which fails to be symmetric in general. We also derive a general formula of the force-flux in peridynamics and compute the limit of P for vanishing non-locality, denoted by P0. We show that this tensor P0 surprisingly coincides with the collapsed tensor 0, a limit of the original tensor . At the end, using this flux-formula, we suggest an explanation why the collapsed tensor P0 (and hence 0) can be indeed identified with the 1st Piola-Kirchhoff stress tensor.