Difference between revisions of "Multistate Bennett Acceptance Ratio"

From AlchemistryWiki
Jump to navigation Jump to search
m (Created page with "{{Fundamentals | cTopic=Theory}} The Multistate Bennett Acceptance Ratio (MBAR){{cite|Shrits2008|Shirts, M. R., and Chodera, J. D. (2008) Statistically optimal analysis of sampl...")
 
m
Line 7: Line 7:
 
=Download MBAR=
 
=Download MBAR=
 
MBAR may seem like a duanting set of equations to program yourself, so the authors have provided a Python implementation of MBAR for anyone to use, free of charge at [http://simtk.org/home/pymbar http:/simtk.org/home/pymbar]. The software comes with examples and uses cases. Also bundled with it are the tools to compute expectation values and an implementation of BAR.
 
MBAR may seem like a duanting set of equations to program yourself, so the authors have provided a Python implementation of MBAR for anyone to use, free of charge at [http://simtk.org/home/pymbar http:/simtk.org/home/pymbar]. The software comes with examples and uses cases. Also bundled with it are the tools to compute expectation values and an implementation of BAR.
 +
 +
=References=
 +
<references />

Revision as of 14:54, 25 September 2012



The Multistate Bennett Acceptance Ratio (MBAR)[1] is a direct extension to BAR as it allow for assessing data from all states, and predicting the free energy at an unsampled state. MBAR reduces to BAR in the limit that only two states are sampled. This equation of free energy calculations can also be seen as a zero-width bin WHAM.

Much like WHAM, the free energies provided by this method are only a statistical estimator, however, MBAR has been shown to have the lowest variance estimator to date.

Download MBAR

MBAR may seem like a duanting set of equations to program yourself, so the authors have provided a Python implementation of MBAR for anyone to use, free of charge at http:/simtk.org/home/pymbar. The software comes with examples and uses cases. Also bundled with it are the tools to compute expectation values and an implementation of BAR.

References

  1. Shirts, M. R., and Chodera, J. D. (2008) Statistically optimal analysis of samples from multiple equilibrium states. J. Chem. Phys. 129, 129105. - Find at Cite-U-Like