Root mean square deviations in structure¶
(458)¶\[RMSD(t_1,t_2) ~=~ \left[\frac{1}{M} \sum_{i=1}^N m_i \|{\bf r}_i(t_1)-{\bf r}_i(t_2)\|^2 \right]^{\frac{1}{2}}\]
Instead of comparing the structures to the initial structure at time \(t=0\) (so for example a crystal structure), one can also calculate (458) with a structure at time \(t_2=t_1-\tau\). This gives some insight in the mobility as a function of \(\tau\). A matrix can also be made with the \(RMSD\) as a function of \(t_1\) and \(t_2\), which gives a nice graphical interpretation of a trajectory. If there are transitions in a trajectory, they will clearly show up in such a matrix.
Alternatively the \(RMSD\) can be computed using a fit-free method with the program gmx rmsdist:
where the distance r\(_{ij}\) between atoms at time \(t\) is compared with the distance between the same atoms at time \(0\).