1-dimensional hard rods

1-dimensional hard rods are basically hard spheres confined to 1 dimension (not to be confused with 3-dimensional hard rods). The model is given by the intermolecular pair potential:

${\displaystyle \Phi (x_{i},x_{j})=\left\{{\begin{array}{lll}0&;&|x_{i}-x_{j}|>\sigma \\\infty &;&|x_{i}-x_{j}|<\sigma \end{array}}\right.}$

where ${\displaystyle \left.x_{k}\right.}$ is the position of the center of the k-th rod, along with an external potential; the whole length of the rod must be inside the range:

${\displaystyle V_{0}(x_{i})=\left\{{\begin{array}{lll}0&;&\sigma /2<x<L-\sigma /2\\\infty &;&{\mathrm {elsewhere} }.\end{array}}\right.}$

Canonical Ensemble: Configuration Integral

The statistical mechanics of this system can be solved exactly (see Ref. 1). Consider a system of length ${\displaystyle \left.L\right.}$ defined in the range ${\displaystyle \left[0,L\right]}$. The aim is to compute the partition function of a system of ${\displaystyle \left.N\right.}$ hard rods of length ${\displaystyle \left.\sigma \right.}$. Consider that the particles are ordered according to their label: ${\displaystyle x_{0}<x_{1}<x_{2}<\cdots <x_{N-1}}$; taking into account the pair potential we can write the canonical partition function (configuration integral) of a system of ${\displaystyle N}$ particles as:

${\displaystyle {\frac {Z\left(N,L\right)}{N!}}=\int _{\sigma /2}^{L+\sigma /2-N\sigma }dx_{0}\int _{x_{0}+\sigma }^{L+\sigma /2-N\sigma +\sigma }dx_{1}\cdots \int _{x_{i-1}+\sigma }^{L+\sigma /2-N\sigma +i\sigma }dx_{i}\cdots \int _{x_{N-2}+\sigma }^{L+\sigma /2-N\sigma +(N-1)\sigma }dx_{N-1}.}$

Variable change: ${\displaystyle \left.\omega _{k}=x_{k}-\left(k+{\frac {1}{2}}\right)\sigma \right.}$ ; we get:

${\displaystyle {\frac {Z\left(N,L\right)}{N!}}=\int _{0}^{L-N\sigma }d\omega _{0}\int _{\omega _{0}}^{L-N\sigma }d\omega _{1}\cdots \int _{\omega _{i-1}}^{L-N\sigma }d\omega _{i}\cdots \int _{\omega _{N-2}}^{L-N\sigma }d\omega _{N-1}.}$

Therefore:

${\displaystyle {\frac {Z\left(N,L\right)}{N!}}={\frac {(L-N\sigma )^{N}}{N!}}.}$

${\displaystyle Q(N,L)={\frac {(L-N\sigma )^{N}}{\Lambda ^{N}N!}}.}$

Thermodynamics

Helmholtz energy function

${\displaystyle \left.A(N,L,T)=-k_{B}T\log Q\right.}$

In the thermodynamic limit (i.e. ${\displaystyle N\rightarrow \infty ;L\rightarrow \infty }$ with ${\displaystyle \rho ={\frac {N}{L}}}$, remaining finite):

${\displaystyle A\left(N,L,T\right)=Nk_{B}T\left[\log \left({\frac {N\Lambda }{L-N\sigma }}\right)-1\right].}$

Equation of state

Using the thermodynamic relations, the pressure (linear tension in this case) ${\displaystyle \left.p\right.}$ can be written as:

${\displaystyle p=-\left({\frac {\partial A}{\partial L}}\right)_{N,T}={\frac {Nk_{B}T}{L-N\sigma }};}$

${\displaystyle Z={\frac {pL}{Nk_{B}T}}={\frac {1}{1-\eta }},}$

where ${\displaystyle \eta \equiv {\frac {N\sigma }{L}}}$; is the fraction of volume (i.e. length) occupied by the rods.

References

1. Lewi Tonks "The Complete Equation of State of One, Two and Three-Dimensional Gases of Hard Elastic Spheres", Physical Review 50 pp. 955- (1936)
2. L. van Hove "Quelques Propriétés Générales De L'intégrale De Configuration D'un Système De Particules Avec Interaction", Physica, 15 pp. 951-961 (1949)
3. L. van Hove, "Sur L'intégrale de Configuration Pour Les Systèmes De Particules À Une Dimension", Physica, 16 pp. 137-143 (1950)