Please use this identifier to cite or link to this item: http://localhost:80/handle/1956/854
Title: The number of link and cluster states: the core of the 2D q state Potts model
Publisher: Institute of Physics Publishing
Description: Due to Fortuin and Kastelyin the q state Potts model has a representation as a sum over random graphs, generalizing the Potts model to arbitrary q is based on this representation. A key element of the random cluster representation is the combinatorial factor ΓG(C, E), which is the number of ways to form C distinct clusters, consisting of totally E edges. We have devised a method to calculate ΓG(C, E) from Monte Carlo simulations.
Peer reviewed
URI: http://localhost:80/handle/1956/854
More Information: Journal of physics. A, Mathematical, nuclear and general 2005 38: 10893-10904
0301-0015
http://hdl.handle.net/1956/854
10.1088/0305-4470/38/50/002
Appears in Collections:Department of Earth Science

Files in This Item:
Click on the URI links for accessing contents.
Title: The number of link and cluster states: the core of the 2D q state Potts model
Publisher: Institute of Physics Publishing
Description: Due to Fortuin and Kastelyin the q state Potts model has a representation as a sum over random graphs, generalizing the Potts model to arbitrary q is based on this representation. A key element of the random cluster representation is the combinatorial factor ΓG(C, E), which is the number of ways to form C distinct clusters, consisting of totally E edges. We have devised a method to calculate ΓG(C, E) from Monte Carlo simulations.
Peer reviewed
URI: http://localhost:80/handle/1956/854
More Information: Journal of physics. A, Mathematical, nuclear and general 2005 38: 10893-10904
0301-0015
http://hdl.handle.net/1956/854
10.1088/0305-4470/38/50/002
Appears in Collections:Department of Earth Science

Files in This Item:
Click on the URI links for accessing contents.
Title: The number of link and cluster states: the core of the 2D q state Potts model
Publisher: Institute of Physics Publishing
Description: Due to Fortuin and Kastelyin the q state Potts model has a representation as a sum over random graphs, generalizing the Potts model to arbitrary q is based on this representation. A key element of the random cluster representation is the combinatorial factor ΓG(C, E), which is the number of ways to form C distinct clusters, consisting of totally E edges. We have devised a method to calculate ΓG(C, E) from Monte Carlo simulations.
Peer reviewed
URI: http://localhost:80/handle/1956/854
More Information: Journal of physics. A, Mathematical, nuclear and general 2005 38: 10893-10904
0301-0015
http://hdl.handle.net/1956/854
10.1088/0305-4470/38/50/002
Appears in Collections:Department of Earth Science

Files in This Item:
Click on the URI links for accessing contents.