Shear band patterns by boundary integral equations

TL;DR

This paper develops boundary integral equations to analyze shear band formation and stress perturbations in anisotropic elastic solids under small deformations.

Contribution

It introduces a novel boundary integral equation approach for modeling shear band patterns in prestressed anisotropic materials.

Findings

Formulates boundary integral equations for shear band analysis.

Analyzes perturbations caused by shear bands in elastic solids.

Provides a framework for understanding shear localization in materials.

Abstract

Boundary integral equations are presented to analyze perturbations in terms of small elastic deformations superimposed upon an arbitrary, homogeneous strain. Plane strain deformations of an incompressible, prestressed, anisotropic, elastic solid are considered assuming the Biot constitutive framework. The special case of perturbations of stress/deformation incident wave fields, caused by a shear band of finite length formed inside the material at a certain stage of the deformation path, is formulated.