Nose-Hoover-chain thermostat: Difference between revisions
No edit summary |
No edit summary |
||
Line 1: | Line 1: | ||
The standard Nose Hoover suffers from well known issues, such as the ergodicity violation in the case of simple harmonic oscillator. As proposed by Martyna and Klein, these problems can be solved by using multiple Nose Hoover thermostats connected in chain. | The standard Nose Hoover suffers from well known issues, such as the ergodicity violation in the case of simple harmonic oscillator. As proposed by Martyna and Klein, these problems can be solved by using multiple Nose Hoover thermostats connected in chain. Although the underlining dynamics is non-Hamiltonian, the corresponding equations of motion conserve the following energy term: | ||
::<math> | ::<math> | ||
\mathcal{ | \mathcal{H'} = \mathcal{H}(\bold{r},\bold{p}) + \sum\limits_{j=1}^{M} \frac{p_{\theta_j}^2}{2Q_j} + dNk_{B} T \theta_1 + k_{B} T \sum\limits_{j=2}^{M} \theta_j | ||
</math> | </math> |
Revision as of 13:45, 17 April 2023
The standard Nose Hoover suffers from well known issues, such as the ergodicity violation in the case of simple harmonic oscillator. As proposed by Martyna and Klein, these problems can be solved by using multiple Nose Hoover thermostats connected in chain. Although the underlining dynamics is non-Hamiltonian, the corresponding equations of motion conserve the following energy term: