Goal : This is the first lecture about the dynamics of a disordered system. We will see that different systems display pinning until a critical threshold. We will revisit Larkin arguments and discuss the spectrum of excitation of the instabilities.

Pinning and depininng of a disordered material

In the first lectures we saw that a disorder system can be trapped in deep energy states and form a glass. Today we will see that it can be also pinned and resist external deformation. Indeed disorder is at the origin of a complex energy landscape characterized by many minima (more or less deep), maxima and saddle points. An external force tilts this multidimensional landscape in a direction, but local minima survives until a finite threshold that unveils spectacular critical dynamics.

Experiments

We will discuss two examples of transition induced by pinning:

The depinning transition: interfaces pinned by impurities are ubiquitous and range from magnetic domain walls to crack fronts, from dislocations in crystals or vortices in superconductors. Above a critical force, interfaces depin, their motion is intermittent and a Barkhausen noise is detected.

The yielding transition: Everyday amorphous materials such as mayonnaise, toothpaste or foams display a behaviour intermediate between solid and liquid. They deform at small stress (as a solid) and flow at large stress (as a liquid). In between we observe intermittent plastic events.

Equation of motion

We focus on zero temperature and on the overdamped regime. In presence of an external force $f$ the equation of motion of the interface is

\partial_{t} h (x, t) = \nabla^{2} h + f + F (x, h (x, t)), with F (x, h (x, t)) = - \frac{δ V (x, h (x, t))}{δ h (x, t)}

The disorder force $F (x, h (x, t))$ is a stochastic function:

\overline{F (x, h) F (x^{'}, h^{'})} = δ^{d} (x - x^{'}) Δ (h - h^{'})

There are usually two kind of disorder: (i) Random Bond (RB) if $V (x, h)$ is short range correlated. Hence, the area below $Δ (h)$ is zero, (ii) Random field if $V (x, h)$ is a Brownian motion along $h$ .Hence, $Δ (h)$ is short range corraleted.

The velocity - force characteristic

Existence of a unique critical force $f_{c}$ : no-passing rule and Larkin model

Large force behaviour

Scaling behaviour of the depinning transition

The order parameter of the transition is the velocity vanishing as

v \sim | f - f_{c} |^{β} .

The interface is rough at $f_{c}$

u (b x) \sim b^{ζ} u (x), {\hat{u}}_{b q} \sim b^{ζ - d} u_{q}

\overline{{\hat{u}}_{q} {\hat{u}}_{q^{'}}} = δ^{d} (q + q^{'}) S (q), S (q) \sim \frac{1}{| q |^{d + 2 ζ}}

above $f_{c}$ :

L-5

Contents

Pinning and depininng of a disordered material

Experiments

Equation of motion

Scaling behaviour of the depinning transition

Cellular automata

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L-5

Pinning and depininng of a disordered material

Experiments

Equation of motion

Scaling behaviour of the depinning transition

Cellular automata

Navigation menu

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