| # | Line 280 | Line 280 | g(z) =\frac{1}{\pi R^{2} \rho}< \delta (z-z_{ij})>_{ij | |
|---|---|---|
| 280 | also important to show the density correlation along the director | |
| 281 | which is given by : | |
| 282 | \begin{equation} | |
| 283 | < | g(z) =\frac{1}{\pi R^{2} \rho}< \delta (z-z_{ij})>_{ij} |
| 284 | < | \end{equation}, |
| 283 | > | g(z) =\frac{1}{\pi R^{2} \rho}< \delta (z-z_{ij})>_{ij}, |
| 284 | > | \end{equation} |
| 285 | where $ z_{ij} = r_{ij} \cdot \hat Z $ was measured in the | |
| 286 | director frame and $R$ is the radius of the cylindrical sampling | |
| 287 | region. The oscillation in density plot along the director in | |
| – | Removed lines |
| + | Added lines |
| < | Changed lines |
| > | Changed lines |