Wang-Landau method

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The Wang-Landau method was proposed by F. Wang and D. P. Landau (Ref. 1) to compute the density of states, ${\displaystyle \Omega (E)}$, of Potts models; where ${\displaystyle \Omega (E)}$ is the number of microstates of the system having energy ${\displaystyle E}$.

The Wang-Landau method in its original version is a simulation technique designed to reach an uniform sampling of the energies of the system in a given range. In a standard Metropolis Monte Carlo in the canonical ensemble the probability of a given microstate, ${\displaystyle X}$ is given by:

${\displaystyle P(X)\propto \exp \left[-E(X)/k_{B}T\right]}$;

whereas for the Wang-Landau procedure we can write:

${\displaystyle P(X)\propto \exp \left[-f(E(x))\right]}$ ;

where ${\displaystyle f(E)}$ is a function of the energy. ${\displaystyle f(E)}$ changes during the simulation in order get a prefixed distribution of energies (usually a uniform distribution); this is done by modifying the values of ${\displaystyle f(E)}$ to reduce the probability of the energies that have been already visited.

References

1. Fugao Wang and D. P. Landau "Determining the density of states for classical statistical models: A random walk algorithm to produce a flat histogram", Physical Review E 64 056101 (2001)
2. D. P. Landau, Shan-Ho Tsai, and M. Exler "A new approach to Monte Carlo simulations in statistical physics: Wang-Landau sampling", American Journal of Physics 72 pp. 1294-1302 (2004)
3. Georg Ganzenmüller and Philip J. Camp "Applications of Wang-Landau sampling to determine phase equilibria in complex fluids", Journal of Chemical Physics 127 154504 (2007)
4. R. E. Belardinelli and V. D. Pereyra "Wang-Landau algorithm: A theoretical analysis of the saturation of the error", Journal of Chemical Physics 127 184105 (2007)
5. R. E. Belardinelli and V. D. Pereyra "Fast algorithm to calculate density of states", Physical Review E 75 046701 (2007)