Martyna-Tuckerman-Tobias-Klein barostat: Difference between revisions

Latest revision as of 17:44, 31 January 2014

Martyna-Tuckerman-Tobias-Klein barostat ^[1] ^[2] has the following equations of motion (Eq.13):

{\dot {\mathbf {r} }}_{i}={\frac {{\mathbf {p} }_{i}}{m_{i}}}+{\frac {{\overline {\mathbf {p} }}_{g}}{W_{g}}}{\mathbf {r} }_{i}

{\dot {\mathbf {p} }}_{i}={\mathbf {F} }_{i}-{\frac {{\overline {\mathbf {p} }}_{g}}{W_{g}}}{\mathbf {p} }_{i}-\left({\frac {1}{N_{f}}}\right){\frac {\mathrm {Tr} [{\overline {\mathbf {p} }}_{g}]}{W_{g}}}-{\frac {p_{\xi }}{Q}}{\mathbf {p} }_{i}

{\dot {\overline {\mathbf {h} }}}={\frac {{\overline {\mathbf {p} }}_{g}{\overline {\mathbf {h} }}}{W_{g}}}

{\dot {\overline {\mathbf {p} }}}_{g}=V\left({\overline {\mathbf {p} }}_{\mathrm {int} }-{\overline {\mathbf {I} }}P_{\mathrm {ext} }\right)+\left[{\frac {1}{N_{f}}}\sum _{i=1}^{N}{\frac {{\mathbf {p} }_{i}^{2}}{m_{i}}}\right]{\overline {\mathbf {I} }}-{\frac {p_{\xi }}{Q}}{\overline {\mathbf {p} }}_{g}

{\dot {\xi }}={\frac {p_{\xi }}{Q}}

{\dot {p}}_{\xi }=\sum _{i=1}^{N}{\frac {{\mathbf {p} }_{i}^{2}}{m_{i}}}+{\frac {1}{W_{g}}}\mathrm {Tr} \left[{\overline {\mathbf {p} }}_{g}^{t}{\overline {\mathbf {p} }}_{g}\right]-(N_{f}+d^{2})kT

@@ Line 8: / Line 8: @@
 :<math>\dot{\overline{\mathbf {h}}} =  \frac{\overline{\mathbf {p}}_g {\overline{\mathbf {h}}} }{W_g}</math>
+:<math> \dot{\overline{\mathbf {p}}}_g = V \left({\overline{\mathbf {p}}}_{\mathrm {int}}  - {\overline{\mathbf {I}}} P_{\mathrm {ext}} \right) + \left[ \frac{1}{N_f}  \sum_{i=1}^N  \frac{{\mathbf {p}}_i^2 }{m_i}  \right] {\overline{\mathbf {I}}}  - \frac{p_{\xi}}{Q}{\overline{\mathbf {p}}}_g</math>
+:<math>\dot\xi= \frac{p_{\xi}}{Q}</math>
+:<math>\dot p_{\xi} =   \sum_{i=1}^N \frac{{\mathbf {p}}_i^2 }{m_i} + \frac{1}{W_g} \mathrm{Tr}\left[ {\overline{\mathbf {p}}}_g^t {\overline{\mathbf {p}}}_g \right] - (N_f + d^2) kT</math>
 ==References==
 <references/>
 [[category: molecular dynamics]]