Cluster algorithms: Difference between revisions
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THIS RECIPE HAS TO BE COMPLETED, BE PATIENT | THIS RECIPE HAS TO BE COMPLETED, BE PATIENT | ||
== | == Wolff algorithm == | ||
See Ref 2 for details | |||
== Invaded Cluter Algorithm == | == Invaded Cluter Algorithm == |
Revision as of 18:46, 3 August 2007
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Cluster algorithms in Monte Carlo Simulation.
These algorithms are mainly used in the simulation of Ising-like models. The essential feature is the use of collective motions of particles (spins) in a single Monte Carlo step.
An interesting property of some of these application is the fact that the percolation analysis of the clusters can be used to study phase transitions.
As an introductory example we will discuss the Swendsen-Wang technique (Ref 1) in the simulation of Ising Models.
Sketches of the Swendsen-Wang algorithm
In one Monte Carlo step of the algorithm the following recipe is used:
- Consider every pair interacting sites (spins)
In the current configuration the pair interaction can be either negative: of positive , depending on the product: (See Ising Models for details on the notation)
- For pairs of interacting sites (nearest neighbors) with create a bond between the two spins with a given probability using random numbers)
- will be chosen to be a function of
- The bonds generated in the previous step are used to build up clusters of sites (spins).
- Build up the partition of the system in the corresponding clusters of spins.
In each cluster all the spins will have the same state (either or )
- For each cluster, independently, choose at random with equal probabilities whether to flip (invert the value of ) or not to flip the whole
set of spins belonging to the cluster.
THIS RECIPE HAS TO BE COMPLETED, BE PATIENT
Wolff algorithm
See Ref 2 for details