Umbrella sampling is a technique in

computational physics Computational physics is the study and implementation of numerical analysis to solve problems in physics for which a quantitative theory already exists. Historically, computational physics was the first application of modern computers in science, ...

and

chemistry Chemistry is the scientific study of the properties and behavior of matter. It is a natural science that covers the elements that make up matter to the compounds made of atoms, molecules and ions: their composition, structure, proper ...

, used to improve sampling of a system (or different systems) where ergodicity is hindered by the form of the system's

energy landscape An energy landscape is a mapping of possible states of a system. The concept is frequently used in physics, chemistry, and biochemistry, e.g. to describe all possible conformations of a molecular entity, or the spatial positions of interacting ...

. It was first suggested by Torrie and Valleau in 1977. It is a particular physical application of the more general importance sampling in statistics. Systems in which an

energy barrier In chemistry and physics, activation energy is the minimum amount of energy that must be provided for compounds to result in a chemical reaction. The activation energy (''E''a) of a reaction is measured in joules per mole (J/mol), kilojoules pe ...

separates two regions of configuration space may suffer from poor sampling. In Metropolis Monte Carlo runs, the low probability of overcoming the potential barrier can leave inaccessible configurations poorly sampled—or even entirely unsampled—by the simulation. An easily visualised example occurs with a solid at its melting point: considering the state of the system with an order parameter ''Q'', both liquid (low ''Q'') and solid (high ''Q'') phases are low in energy, but are separated by a free energy barrier at intermediate values of ''Q''. This prevents the simulation from adequately sampling both phases. Umbrella sampling is a means of "bridging the gap" in this situation. The standard Boltzmann weighting for Monte Carlo sampling is replaced by a potential chosen to cancel the influence of the energy barrier present. The

Markov chain A Markov chain or Markov process is a stochastic model describing a sequence of possible events in which the probability of each event depends only on the state attained in the previous event. Informally, this may be thought of as, "What happen ...

generated has a distribution given by: :

\pi(\mathbf^N) = \frac ,

with ''U'' the potential energy, ''w''(r^''N'') a function chosen to promote configurations that would otherwise be inaccessible to a Boltzmann-weighted Monte Carlo run. In the example above, ''w'' may be chosen such that ''w'' = ''w''(''Q''), taking high values at intermediate ''Q'' and low values at low/high ''Q'', facilitating barrier crossing. Values for a thermodynamic property ''A'' deduced from a sampling run performed in this manner can be transformed into canonical-ensemble values by applying the formula: :

\langle A \rangle = \frac,

with the ''

\pi

'' subscript indicating values from the umbrella-sampled simulation. The effect of introducing the weighting function ''w''(r^''N'') is equivalent to adding a biasing potential ''V''(r^''N'') to the potential energy of the system. :''

V(\mathbf^N) = -k_BT \ln w(\mathbf^N)

'' If the biasing potential is strictly a function of a reaction coordinate or order parameter ''

Q

'', then the (unbiased) free energy profile on the reaction coordinate can be calculated by subtracting the biasing potential from the biased free energy profile. :

F_0(Q) = F_\pi(Q) - V(Q)

where ''

F_0(Q)

'' is the free energy profile of the unbiased system and ''

F_\pi(Q)

'' is the free energy profile calculated for the biased, umbrella-sampled system. Series of umbrella sampling simulations can be analyzed using the weighted histogram analysis method (WHAM) or its generalization. WHAM can be derived using the

Maximum likelihood In statistics, maximum likelihood estimation (MLE) is a method of estimating the parameters of an assumed probability distribution, given some observed data. This is achieved by maximizing a likelihood function so that, under the assumed stat ...

method. Subtleties exist in deciding the most computationally efficient way to apply the umbrella sampling method, as described in Frenkel & Smit's book ''Understanding Molecular Simulation''. Alternatives to umbrella sampling for computing potentials of mean force or

reaction rate The reaction rate or rate of reaction is the speed at which a chemical reaction takes place, defined as proportional to the increase in the concentration of a product per unit time and to the decrease in the concentration of a reactant per uni ...

s are free energy perturbation and transition interface sampling. A further alternative which functions in full non-equilibrium is S-PRES.

References

Further reading