Lebwohl-Lasher model: Difference between revisions

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==Planar Lebwohl–Lasher model ==
==Planar Lebwohl–Lasher model ==
The planar Lebwohl-Lasher appears when the lattice considered is two-dimensional.
The planar Lebwohl-Lasher appears when the lattice considered is two-dimensional.
This system exhibits a continuous transition. The adscription of such a transition to the
This system exhibits a continuous transition. The ascription of such a transition to the
[[Kosterlitz-Thouless transition|Kosterlitz-Touless]] type is still under discussion.
[[Kosterlitz-Thouless transition|Kosterlitz-Touless]] type is still under discussion.
<ref>[http://dx.doi.org/10.1016/S0375-9601(03)00576-0 Enakshi Mondal and Soumen Kumar Roy "Finite size scaling in the planar Lebwohl–Lasher model", Physics Letters A '''312''' pp. 397-410 (2003)]</ref>
<ref>[http://dx.doi.org/10.1016/S0375-9601(03)00576-0 Enakshi Mondal and Soumen Kumar Roy "Finite size scaling in the planar Lebwohl–Lasher model", Physics Letters A '''312''' pp. 397-410 (2003)]</ref>
<ref>[http://dx.doi.org/10.1016/0378-4371(88)90148-3 C. Chiccoli, P. Pasini, and C. Zannoni "A Monte Carlo investigation of the planar Lebwohl-Lasher lattice model", Pĥysica A '''148''' pp. 298-311 (1988)]</ref>
<ref>[http://dx.doi.org/10.1016/0378-4371(88)90148-3 C. Chiccoli, P. Pasini, and C. Zannoni "A Monte Carlo investigation of the planar Lebwohl-Lasher lattice model", Physica A '''148''' pp. 298-311 (1988)]</ref>
<ref> [http://link.aps.org/doi/10.1103/PhysRevB.46.662 H. Kunz, and G. Zumbach "Topological phase transition in a two-dimensional nematic n-vector model: A numerical study" Phys. Rev. B '''46''', 662 - 673 (1992) ]</ref>
<ref> [http://link.aps.org/doi/10.1103/PhysRevB.46.662 H. Kunz, and G. Zumbach "Topological phase transition in a two-dimensional nematic n-vector model: A numerical study" Physical Review B '''46''', 662-673 (1992) ]</ref>
<ref> [http://link.aps.org/doi/10.1103/PhysRevE.78.051706 Ricardo Paredes V., Ana Isabel Fariñas-Sánchez, and Robert Botet "No quasi-long-range order in a two-dimensional liquid crystal", Phys. Rev. E 78, 051706 (2008) [4 pages] ] </ref>
<ref>[http://link.aps.org/doi/10.1103/PhysRevE.78.051706 Ricardo Paredes V., Ana Isabel Fariñas-Sánchez, and Robert Botet "No quasi-long-range order in a two-dimensional liquid crystal", Physical Review  E 78, 051706 (2008)]</ref>


==Lattice Gas Lebwohl-Lasher model==
==Lattice Gas Lebwohl-Lasher model==

Revision as of 13:32, 9 April 2009

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

where , is the angle between the axes of nearest neighbour particles and , and is a second order Legendre polynomial.

Isotropic-nematic transition

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

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

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