Kac ring

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In statistical mechanics, the Kac ring is a toy model^[1] introduced by Mark Kac in 1956^[2][3] to explain how the second law of thermodynamics emerges from time-symmetric interactions between molecules (see reversibility paradox). Although artificial,^[4] the model is notable as a mathematically transparent example of coarse-graining^[5] and is used as a didactic tool^[6] in non-equilibrium thermodynamics.

The Kac ring consists of Template:Mvar equidistant points in a circle. Some of these points are marked. The number of marked points is Template:Mvar, where ${\displaystyle 0<2M<N}$. Each point represents a site occupied by a ball, which is black or white. After a unit of time, each ball moves to a neighboring point counterclockwise. Whenever a ball leaves a marked site, it switches color from black to white and vice versa. (If, however, the starting point is not marked, the ball completes its move without changing color.)

An imagined observer can only measure coarse-grained (or macroscopic) quantities: the ratio

${\displaystyle \mu =\frac{M}{N}<0.5}$

and the overall color

${\displaystyle \delta =\frac{W-B}{N},}$

where Template:Mvar, Template:Mvar denote the total number of black and white balls respectively. Without the knowledge of detailed (microscopic) configuration, any distribution of Template:Mvar marks is considered equally likely. This assumption of equiprobability is comparable to Stosszahlansatz, which leads to Boltzmann equation.^[7]

Let ${\displaystyle {\eta }_k(t)}$ denote the color of a ball at point Template:Mvar and time Template:Mvar with a convention

${\displaystyle {\eta }_k=\{\begin{array}{cc}+1& \text{ball is white}\\ -1& \text{ball is black}\end{array}.}$

The microscopic dynamics can be mathematically formulated as

${\displaystyle {\eta }_k(t)={ϵ}_{k-1}{\eta }_{k-1}(t-1),}$

where

${\displaystyle {ϵ}_k=\{\begin{array}{cc}+1& \text{unmarked site}\\ -1& \text{marked site}\end{array}}$

and ${\displaystyle k-1}$ is taken modulo Template:Mvar. In analogy to molecular motion, the system is time-reversible. Indeed, if balls would move clockwise (instead of counterclockwise) and marked points changed color upon entering them (instead of leaving), the motion would be equivalent, except going backward in time. Moreover, the evolution of ${\displaystyle {\eta }_k(t)}$ is periodic, where the period is at most ${\displaystyle 2N}$. (After Template:Mvar steps, each ball visits all Template:Mvar marked points and changes color by a factor ${\displaystyle (-1{)}^M}$.) Periodicity of the Kac ring is a manifestation of more general Poincaré recurrence.^[6]

Assuming that all balls are initially white,

${\displaystyle {\eta }_k(t)={ϵ}_{k-1}{ϵ}_{k-2}\cdots {ϵ}_{k-t}=(-1{)}^X,}$

where ${\displaystyle X=X(k,t)}$ is the number of times the ball will leave a marked point during its journey. When marked locations are unknown (and all possibilities equally likely), Template:Mvar becomes a random variable. Considering the limit when Template:Mvar approaches infinity but Template:Mvar, Template:Mvar, and Template:Mvar remain constant, the random variable Template:Mvar converges to the binomial distribution, i.e.:^[5]

${\displaystyle \underset{N\to \mathrm{\infty }}{\lim }\text{Pr}(X=i)={\mu }^i(1-\mu {)}^{t-i}\left(\begin{array}{c}t\\ i\end{array}\right),}$

Hence, the overall color after Template:Mvar steps will be

${\displaystyle \begin{array}{cc}\underset{N\to \mathrm{\infty }}{\lim }⟨\delta (t)⟩& =\underset{N\to \mathrm{\infty }}{\lim }\frac{1}{N}\sum _k⟨{\eta }_k(t)⟩\\ & =\underset{N\to \mathrm{\infty }}{\lim }⟨{\eta }_1(t)⟩\\ & ={\displaystyle \sum _{i=0}^t}(-1{)}^i{\mu }^i(1-\mu {)}^{t-i}\left(\begin{array}{c}t\\ i\end{array}\right)\\ & =(1-2\mu {)}^t\end{array}.}$

Since ${\displaystyle 0<1-2\mu <1}$ the overall color will, on average, converge monotonically and exponentially to 50% grey (a state that is analogical to thermodynamic equilibrium). An identical result is obtained for a ring rotating clockwise. Consequently, the coarse-grained evolution of the Kac ring is irreversible.

It is also possible to show that the variance approaches zero:^[5]

${\displaystyle \underset{N\to \mathrm{\infty }}{\lim }\text{Var}(\delta (t))=0.}$

Therefore, when Template:Mvar is huge (of order 10²³), the observer has to be extremely lucky (or patient) to detect any significant deviation from the ensemble averaged behavior.

• Ehrenfest model

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