Abstract
This paper concerns finite elasto-plasticity of crystalline materials with micro-structural defects. We revisit the basic concepts: plastic distortion and decomposition of the plastic connection. The body is endowed with a structure of differential manifold. The plastic distortion is an incompatible diffeomorphism. The metric induced by the plastic distortion on the intermediate configuration (considered to be a differential manifold) is a key point in the theory, in defining the defects related to point defects, or extra-matter. The so-called plastic connection is metric, with plastic metric tensor expressed in terms of the plastic distortion and its adjoint. We prove an appropriate decomposition of the plastic connection, without any supposition concerning the non-metricity of plastic connection. All types of the lattice defects, dislocations, disclinations, and point defects are described in terms of the densities related to the elements that characterize the decomposition theorem for plastic connection. As a novelty, the measure of the interplay of the possible lattice defects is introduced via the Cartan torsion tensor. To justify the given definitions, the proposed measures of defects are compared to their counterparts corresponding to a classical framework of continuum mechanics. Thus, their physical meanings can be emphasized at once.
Highlights
The study concerns finite elasto-plasticity of crystalline materials with micro-structural defects.The main objective of the paper is to revisit the basic concepts, the definition of plastic distortion and the decomposition of the plastic connection, and to introduce the measures of micro-structural defects in terms of the elements that characterize the plastic connection, emphasized through the decomposition theorem
Based on the theorem concerning the decomposition of the plastic connection, measures of lattice defect densities are introduced as third-order tensor fields
The definition of plastic distortion as an incompatible diffeomorphism is based on the existence of the intermediate configuration considered to be a differential manifold
Summary
The study concerns finite elasto-plasticity of crystalline materials (such as metals) with micro-structural defects. These plastic and elastic distortions are constitutive concepts, which cannot be reduced to their geometrical aspects (see Mandel [1], Teodosiu [2], and Cleja-Ţigoiu and Soós [3]) Both components are incompatible (i.e., anholonomic) diffeomorphisms, which means that they are not differentials of certain appropriate vector fields. Symmetry 2021, 13, 2340 configuration of the body at time t, Bt , is replaced by the so-called intermediate (plastically deformed) configuration, labeled Be. Under the mentioned hypotheses, we proved the decomposition theorem, that form was assumed in different versions by Bilby [29] and. The measures of the micro-structural defects are defined as third-order tensor fields, following [34], in terms of the elements that characterize the plastic connection, emphasized through the decomposition theorem. We mention the possible interplay between dislocations, disclinations, and extra-matter defects
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