Dynamics of elastic boundaries

TL;DR

This paper investigates the complex dynamics of elastic boundaries like crack fronts and friction surfaces, revealing how elastic waves and disorder influence boundary motion, leading to critical behavior and velocity jumps.

Contribution

It introduces models that incorporate elastic wave effects and disorder interactions, providing new insights into boundary dynamics in fracture and friction.

Findings

Elastic waves cause velocity jumps in boundary motion.

Disorder leads to critical slip event distributions.

Boundary velocity exhibits threshold-dependent behavior.

Abstract

We study, both analytically and numerically, the dynamics of elastic boundaries such as crack fronts in fracture and surfaces of contact in solid on solid friction. The elastic waves in the solid give rise to kinks that move with a characteristic velocity along the boundary. As stopping kinks pass through they cause moving parts of the boundary to stop. Starting kinks cause stationary parts of the boundary to move. We study the interaction of these kinks with disorder that arises from the spatial variations of the friction constant or fracture energy. In the absence of elastic waves, elastic boundaries with disorder operate at a critical point leading to a power-law distribution of slip events and self-affine boundaries. Elastic waves result in relevant perturbations at this fixed point. Slip events beyond a critical size run away and the velocity of the boundary jumps to a nonzero value when the external load is increased above a threshold. We analyze in detail a class of simple models that capture the essential features of bulk vectorial elasticity and discuss the implications of our results for friction and fracture dynamics.