Lebwohl-Lasher model

The Lebwohl-Lasher model is a lattice version of the Maier-Saupe mean field model of a nematic liquid crystal ^[1][2]. The Lebwohl-Lasher model consists of a cubic lattice occupied by uniaxial nematogenic particles with the pair potential

${\displaystyle \Phi _{ij}=-\epsilon _{ij}P_{2}(\cos \beta _{ij})}$

where ${\displaystyle \epsilon _{ij}>0}$, ${\displaystyle \beta _{ij}}$ is the angle between the axes of nearest neighbour particles ${\displaystyle i}$ and ${\displaystyle j}$, and ${\displaystyle P_{2}}$ is a second order Legendre polynomial.

Isotropic-nematic transition

Fabbri and Zannoni estimated the transition temperature ^[3] using Monte Carlo simulation:

${\displaystyle T_{NI}^{*}={\frac {k_{B}T_{NI}}{\epsilon }}=1.1232\pm 0.0006}$

More recently N. V. Priezjev and Robert A. Pelcovits ^[4] used a Monte Carlo cluster algorithm and got:

${\displaystyle T_{NI}^{*}={\frac {k_{B}T_{NI}}{\epsilon }}=1.1225\pm 0.0001}$

See also the paper by Zhang et al. ^[5]

Planar Lebwohl–Lasher model

The planar Lebwohl-Lasher appears when the lattice considered is two-dimensional. This system exhibits a continuous transition. The ascription of such a transition to the Kosterlitz-Touless type is still under discussion. ^{[6] [7] [8] [9]}

Lattice Gas Lebwohl-Lasher model

This model is the lattice gas version of the Lebwohl-Lasher model. In this case the sites of the lattice can be occupied by particles or empty. The interaction between nearest-neighbour particles is that of the Lebwohl-Lasher model. This model has been studied in ^[10].

References