Order parameters: Difference between revisions

Revision as of 13:21, 26 November 2007

Liquid crystals

The uniaxial order parameter is zero for an isotropic fluid and one for a perfectly aligned system. First one calculates a director vector (see Ref. 2)

Q_{\alpha \beta }={\frac {1}{N}}\sum _{j=1}^{N}\left({\frac {3}{2}}{\hat {e}}_{j\alpha }{\hat {e}}_{j\beta }-{\frac {1}{2}}\delta _{\alpha \beta }\right),~~~~~\alpha ,\beta =x,y,z,

where $Q$ is a second rank tensor, ${\hat {e}}_{j}$ is a unit vector along the molecular long axis, and $\delta _{\alpha \beta }$ is the Kronecker delta. Diagonalisation of this tensor gives three eigenvalues $\lambda _{+}$ , $\lambda _{0}$ and $\lambda _{-}$ , and $n$ is the eigenvector associated with the largest eigenvalue ( $\lambda _{+}$ ). From this director vector the nematic order parameter is calculated from (Ref. 5)

S_{2}={\frac {d\langle \cos ^{2}\theta \rangle -1}{d-1}}

where d is the dimensionality of the system.

i.e. in three dimensions (see Ref. 3)

S_{2}=\lambda _{+}=\langle P_{2}(n\cdot e)\rangle =\langle P_{2}(\cos \theta )\rangle =\langle {\frac {3}{2}}\cos ^{2}\theta -{\frac {1}{2}}\rangle

where $S_{2}$ is known as the uniaxial order parameter. Here $P_{2}$ is the second order Legendre polynomial, $\theta$ is the angle between a molecular axes and the director $n$ , and the angle brackets indicate an ensemble average.

References

@@ Line 1: / Line 1: @@
+==Liquid crystals==
 The '''uniaxial order parameter''' is zero for an isotropic fluid and one for
 a perfectly aligned system.
@@ Line 37: / Line 38: @@
 indicate an ensemble average.
+==See also==
+*[[Landau theory of second-order phase transitions]]
 ==References==
 #[http://dx.doi.org/10.1103/PhysRevA.10.1881   Joseph P. Straley "Ordered phases of a liquid of biaxial particles", Physical Review A '''10''' pp. 1881 - 1887 (1974)]

Order parameters: Difference between revisions

Revision as of 13:21, 26 November 2007

Liquid crystals

See also

References

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