On the relation between plasticity, friction, and geometry

TL;DR

This paper introduces a unified framework linking plasticity and friction through a multiplicative kinematic friction model, providing insights into deformation behaviors and rupture dynamics in materials.

Contribution

It presents a novel multiplicative form of kinematic friction compatible with viscoplastic theories, bridging the gap between distributed and localized deformation.

Findings

Regularizes behavior at vanishing velocity

Captures transition from 3D to 2D deformation

Implications for rupture dynamics

Abstract

Plasticity refers to thermodynamically irreversible deformation associated with a change of configuration of materials. Friction is a phenomenological law that describes the forces resisting sliding between two solids or across an embedded dislocation. These two types of constitutive behaviors explain the deformation of a wide range of engineered and natural materials. Yet, they are typically described with distinct physical laws that cloud their inherent connexion. Here, I introduce a multiplicative form of kinematic friction that closely resembles the power-law flow of viscoplastic materials and that regularizes the constitutive behavior at vanishing velocity, with important implications for rupture dynamics. Using a tensor-valued state variable that describes the degree of localization, I describe a constitutive framework compatible with viscoplastic theories that captures the continuum between distributed and localized deformation and for which the frictional response emerges when the deformed region collapses from three to two dimensions.