Q-tensor

In physics, $\mathbf {Q}$ -tensor is an orientational order parameter that describes uniaxial and biaxial nematic liquid crystals and vanishes in the isotropic liquid phase. The $\mathbf {Q}$ tensor is a second-order, traceless, symmetric tensor and is defined by

\mathbf {Q} =S\left(\mathbf {n} \otimes \mathbf {n} -{\tfrac {1}{3}}\mathbf {I} \right)+R\left(\mathbf {m} \otimes \mathbf {m} -{\tfrac {1}{3}}\mathbf {I} \right)

where $S=S(T)$ and $R=R(T)$ are scalar order parameters, $(\mathbf {n} ,\mathbf {m} )$ are the two directors of the nematic phase and $T$ is the temperature; in uniaxial liquid crystals, $P=0$ . The components of the tensor are

Q_{ij}=S\left(n_{i}n_{j}-{\tfrac {1}{3}}\delta _{ij}\right)+R\left(m_{i}m_{j}-{\tfrac {1}{3}}\delta _{ij}\right)

The states with directors $\mathbf {n}$ and $-\mathbf {n}$ are physically equivalent and similarly the states with directors $\mathbf {m}$ and $-\mathbf {m}$ are physically equivalent.

The $\mathbf {Q}$ -tensor can always be diagonalized,

\mathbf {Q} ={\frac {1}{3}}{\begin{bmatrix}2S-R&0&0\\0&2R-S&0\\0&0&-S-R\\\end{bmatrix}}

The following are the two invariants of the $\mathbf {Q}$ tensor,

\mathrm {tr} \,\mathbf {Q} ^{2}=Q_{ij}Q_{ji}={\frac {2}{3}}(S^{2}-SR+R^{2}),\quad \mathrm {tr} \,\mathbf {Q} ^{3}=Q_{ij}Q_{jk}Q_{ki}={\frac {1}{9}}[2(S^{3}+R^{3})-3SR(S+R)];

the first-order invariant $\mathrm {tr} \,\mathbf {Q} =Q_{ii}=0$ is trivial here. It can be shown that $(\mathrm {tr} \,\mathbf {Q} ^{2})^{3}\geq 6(\mathrm {tr} \,\mathbf {Q} ^{3})^{2}.$ The measure of biaxiality of the liquid crystal is commonly measured through the parameter

\beta =1-6{\frac {(\mathrm {tr} \,\mathbf {Q} ^{3})^{2}}{(\mathrm {tr} \,\mathbf {Q} ^{2})^{3}}}={\frac {27S^{2}R^{2}(S-R)^{2}}{4(S^{2}-SR+R^{2})^{3}}}.