Avalanches and Bienaymé-Galton-Watson process

Goal: We solve the mean field version of the cellular automaton, derive its avalanche statistics and make a connection with the Bienaymé-Galton-Watson process used to describe an epidemic outbreak.

Fully connected (mean field) model for the cellular automaton

Let's study the mean field version of the cellular automata introduced in the previous lecture. We introduce two approximations:

Replace the Laplacian, which is short range, with a mean field fully connected interction

\sigma _{i}=h_{CM}-h_{i}+m^{2}(w-h_{i}),\quad

.

The local threshold are all equal. In particular we set

\sigma _{i}^{th}=1,\quad \forall i

.

As a consequence, in the limit $L\to \infty$ , the statistical properties of the system are described by the distribution of the local stresses $\sigma _{i}$ . For simplicity, instead of the stresses, we study the distance from threshold

x_{i}=1-\sigma _{i}

Our goal is thus to determine their distribution $P_{w}(x)$ , given their intial distribution, $P_{0}(x)$ , and a value of $w$ .

Dynamics

Let's rewrite the dynamics with the new variables

Drive: Increasing $w\to w+dw$ each point decreases its distance to threshold

x_{i}\to x_{i}-m^{2}dw

.

As a consequence

P_{w+dw}(x)=P_{w}(x+dw)\sim P_{w}(x)+m^{2}dw\partial _{x}P_{w}(x)

Instability 1: Stress drop The instability occurs when a point is at $x_{i}=0$ . Then, the point is stabilized (stress drop):

x_{i}=0\to x_{i}=\Delta

Increasing $w\to w+dw$ , a fraction $m^{2}dwP_{w}(0)$ of the blocks is unstable. Due to the stress drop, their distance to threshold becomes $m^{2}dwP_{w}(0)g(x)$ . Hence, one writes

\partial _{w}P_{w}(x)\sim m^{2}\left[\partial _{x}P_{w}(x)+P_{w}(0)g(x)\right]

Instability 2: Stress redistribution The stress drop of a single block induces a stress redistribution where all blocks approach threshold.

x_{i}\to =x_{i}-{\frac {1}{L}}{\frac {\Delta }{1+m^{2}}}

The total stress drop is $m^{2}dwP_{w}(0)\int dxxg(x)=m^{2}dwP_{w}(0){\overline {\Delta }}$ hence all points move to the origin of

m^{2}dwP_{w}(0){\frac {\overline {\Delta }}{1+m^{2}}}

part of them shifts, part of them become unstable... we can write

\partial _{w}P_{w}(x)=m^{2}\left[\partial _{x}P_{w}(x)+P_{w}(0)g(x)\right]\left[1+P_{w}(0){\frac {\overline {\Delta }}{1+m^{2}}}+(P_{w}(0){\frac {\overline {\Delta }}{1+m^{2}}})^{2}+\ldots \right]

and finally:

\partial _{w}P_{w}(x)={\frac {m^{2}}{1-P_{w}(0){\frac {\overline {\Delta }}{1+m^{2}}}}}\left[\partial _{x}P_{w}(x)+P_{w}(0)g(x)\right]

Stationary solution

Increasing the drive the distribution converge to the fixed point:

0=\partial _{x}P_{\text{stat}}(x)+P_{\text{stat}}(0)g(x)

Determne $P_{\text{stat}}(0)={\frac {1}{\overline {\Delta }}}$ using

1=\int _{0}^{\infty }dx\,P_{\text{stat}}(x)=-\int _{0}^{\infty }dx\,x\partial _{x}P_{\text{stat}}(x)

Show

P_{\text{stat}}(x)={\frac {1}{\overline {\Delta }}}\int _{x}^{\infty }g(z)dz

which is well normalized.

Critical Force

The average distance from the threshold gives a simple relation for the critical force, namely $1-f_{c}={\overline {x}}$ . Hence for the automata model we obtain:

f_{c}=1-\int _{0}^{\infty }dxxP_{\text{stat}}(x)=1-{\frac {1}{2}}{\frac {\overline {\Delta ^{2}}}{\overline {\Delta }}}

Exercise:

Let's assume an exponential distribution of the thresholds and show

$P_{\text{stat}}(x)=e^{-x/{\overline {\Delta }}}/{\overline {\Delta }}$
$f_{c}=1-{\overline {\Delta }}$

Avalanches or instability?

Given the initial condition and $w$ , the state of the system is described by $P_{w}(x)$ . For each unstable block, all the blocks receive a kick. The mean value of the kick is

x_{\text{kick}}={\frac {\overline {\Delta }}{(1+m^{2})L}}

Is this kick able to destabilize another block? The equation setting the average position of the most unstable block is

\int _{0}^{x_{1}}P_{w}(t)dt={\frac {1}{L}}

Hence, for large systems we have

x_{1}\sim {\frac {1}{LP_{w}(0)}},\;x_{2}\sim {\frac {2}{LP_{w}(0)}},\;x_{3}\sim {\frac {3}{LP_{w}(0)}},\ldots

L-6

Contents

Avalanches and Bienaymé-Galton-Watson process