Biased molecular dynamics: Difference between revisions
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''Biased molecular dynamics''' (MD) refers to advanced [[:Category:Molecular dynamics|MD-simulation methods]] that introduce a ''bias potential''. One of the most important purposes of using bias potentials is to enhance the sampling of phase space with low probability density (e.g., transition regions of chemical reactions). Depending on the type of sampling and in combination with the corresponding statistical methods one then has access to important thermodynamic quantities like, e.g., free energies. Biased molecular dynamics comes in very different flavors such as, e.g., umbrella sampling{{cite|torrie:jcp:1977}} and umbrella integration{{cite|kaestner:jcp:2005}}, to name a few. For a comprehensive description (especially about umbrella sampling), we refer the interested user to Ref. {{cite|frenkel:ap-book:2002}} written by D. Frenkel and B. Smit. | |||
The probability density for a geometric parameter ξ of the system driven by a Hamiltonian | The probability density for a geometric parameter ξ of the system driven by a Hamiltonian | ||
:<math> | :<math> | ||
H(q,p) = T(p) + V(q), \; | H(q,p) = T(p) + V(q), \; | ||
</math> | </math> | ||
with ''T''(''p''), and ''V''(''q'') being kinetic, and potential energies, respectively, can be written as | with ''T''(''p''), and ''V''(''q'') being kinetic, and potential energies, respectively, can be written as | ||
:<math> | :<math> | ||
P(\xi_i)=\frac{\int\delta\Big(\xi(q)-\xi_i\Big) \exp\left\{-H(q,p)/k_B\,T\right\} dq\,dp}{\int \exp\left\{-H(q,p)/k_B\,T\right\}dq\,dp} = | P(\xi_i)=\frac{\int\delta\Big(\xi(q)-\xi_i\Big) \exp\left\{-H(q,p)/k_B\,T\right\} dq\,dp}{\int \exp\left\{-H(q,p)/k_B\,T\right\}dq\,dp} = | ||
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The term <math>\langle X \rangle_H</math> stands for a thermal average of quantity ''X'' evaluated for the system driven by the Hamiltonian ''H''. | The term <math>\langle X \rangle_H</math> stands for a thermal average of quantity ''X'' evaluated for the system driven by the Hamiltonian ''H''. | ||
If the system is modified by adding a bias potential <math>\tilde{V}(\xi)</math> acting | If the system is modified by adding a bias potential <math>\tilde{V}(\xi)</math> acting on one or multiple selected internal coordinates of the system ξ=ξ(''q''), the Hamiltonian takes the form | ||
:<math> | :<math> | ||
\tilde{H}(q,p) = H(q,p) + \tilde{V}(\xi), | \tilde{H}(q,p) = H(q,p) + \tilde{V}(\xi), | ||
</math> | </math> | ||
and the probability density of ξ in the biased ensemble is | and the probability density of ξ in the biased ensemble is | ||
:<math> | :<math> | ||
\tilde{P}(\xi_i)= \frac{\int \delta\Big(\xi(q)-\xi_i\Big) \exp\left\{-\tilde{H}(q,p)/k_B\,T\right\} dq\,dp}{\int \exp\left\{-\tilde{H}(q,p)/k_B\,T\right\}dq\,dp} = \langle\delta\Big(\xi(q)-\xi_i\Big)\rangle_{\tilde{H}} | \tilde{P}(\xi_i)= \frac{\int \delta\Big(\xi(q)-\xi_i\Big) \exp\left\{-\tilde{H}(q,p)/k_B\,T\right\} dq\,dp}{\int \exp\left\{-\tilde{H}(q,p)/k_B\,T\right\}dq\,dp} = \langle\delta\Big(\xi(q)-\xi_i\Big)\rangle_{\tilde{H}}. | ||
</math> | </math> | ||
It can be shown that the biased and unbiased averages are related via | It can be shown that the biased and unbiased averages are related via | ||
:<math> | :<math> | ||
P(\xi_i)=\tilde{P}(\xi_i) \frac{\exp\left\{\tilde{V}(\xi)/k_B\,T\right\}}{\langle \exp\left\{\tilde{V}(\xi)/k_B\,T\right\} \rangle_{\tilde{H}}}. | P(\xi_i)=\tilde{P}(\xi_i) \frac{\exp\left\{\tilde{V}(\xi)/k_B\,T\right\}}{\langle \exp\left\{\tilde{V}(\xi)/k_B\,T\right\} \rangle_{\tilde{H}}}. | ||
</math> | </math> | ||
More generally, an observable | More generally, an observable | ||
:<math> | :<math> | ||
\langle A \rangle_{H} = \frac{\int A(q) \exp\left\{-H(q,p)/k_B\,T\right\} dq\,dp}{\int \exp\left\{-H(q,p)/k_B\,T\right\}dq\,dp} | \langle A \rangle_{H} = \frac{\int A(q) \exp\left\{-H(q,p)/k_B\,T\right\} dq\,dp}{\int \exp\left\{-H(q,p)/k_B\,T\right\}dq\,dp} | ||
</math> | </math> | ||
can be expressed in terms of thermal averages within the biased ensemble | can be expressed in terms of thermal averages within the biased ensemble as | ||
:<math> | :<math> | ||
\langle A \rangle_{H} =\frac{\langle A(q) \,\exp\left\{\tilde{V}(\xi)/k_B\,T\right\} \rangle_{\tilde{H}}}{\langle \exp\left\{\tilde{V}(\xi)/k_B\,T\right\} \rangle_{\tilde{H}}}. | \langle A \rangle_{H} =\frac{\langle A(q) \,\exp\left\{\tilde{V}(\xi)/k_B\,T\right\} \rangle_{\tilde{H}}}{\langle \exp\left\{\tilde{V}(\xi)/k_B\,T\right\} \rangle_{\tilde{H}}}. | ||
</math> | </math> | ||
One of the most popular methods using bias potentials is umbrella sampling{{cite|torrie:jcp:1977}}. This method uses a bias potential to enhance sampling of ξ in regions with low ''P''(ξ<sub>''i''</sub>), e.g., transition regions of chemical reactions. The correct distributions are recovered afterward using the equation for <math>\langle A \rangle_{H}</math> above. | |||
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== References == | == References == | ||
<references | <references/> | ||
[[Category: | [[Category:Advanced molecular-dynamics sampling]][[Category:Theory]] | ||
Latest revision as of 11:40, 16 October 2024
Biased molecular dynamics' (MD) refers to advanced MD-simulation methods that introduce a bias potential. One of the most important purposes of using bias potentials is to enhance the sampling of phase space with low probability density (e.g., transition regions of chemical reactions). Depending on the type of sampling and in combination with the corresponding statistical methods one then has access to important thermodynamic quantities like, e.g., free energies. Biased molecular dynamics comes in very different flavors such as, e.g., umbrella sampling[1] and umbrella integration[2], to name a few. For a comprehensive description (especially about umbrella sampling), we refer the interested user to Ref. [3] written by D. Frenkel and B. Smit.
The probability density for a geometric parameter ξ of the system driven by a Hamiltonian
with T(p), and V(q) being kinetic, and potential energies, respectively, can be written as
The term stands for a thermal average of quantity X evaluated for the system driven by the Hamiltonian H.
If the system is modified by adding a bias potential acting on one or multiple selected internal coordinates of the system ξ=ξ(q), the Hamiltonian takes the form
and the probability density of ξ in the biased ensemble is
It can be shown that the biased and unbiased averages are related via
More generally, an observable
can be expressed in terms of thermal averages within the biased ensemble as
One of the most popular methods using bias potentials is umbrella sampling[1]. This method uses a bias potential to enhance sampling of ξ in regions with low P(ξi), e.g., transition regions of chemical reactions. The correct distributions are recovered afterward using the equation for above.
References
- ↑ a b G. M. Torrie and J. P. Valleau, J. Comp. Phys. 23, 187 (1977).
- ↑ J. Kästner, and W. Thiel, Bridging the gap between thermodynamic integration and umbrella sampling provides a novel analysis method: “Umbrella integration”, J. Chem. Phys. 123, 144104 (2005).
- ↑ D. Frenkel and B. Smit, Understanding molecular simulations: from algorithms to applications, Academic Press: San Diego, 2002.