- XY model
Like the famous Ising and Heisenberg models, the XY model is one of the many highly simplified models in
statistical mechanics . It is a special case of then-vector model . In the XY model, 2D classical spins are confined to some lattice. The spins are 2Dunit vector s that obeyO(2) (orU(1) ) symmetry, (as they are classical spins). Mathematically, the Hamiltonian of the XY modelwith the above prescriptions is given by the following::
where the -th spin phase is measured e.g. from the horizontal axis in the counter-clockwise direction and the sum runs over all pairs of neighboring spins. The dot denotes the standard dot product.
The continuous version of the XY model is often used to model systems that possess order parameters with the same kinds of symmetry, e.g.
superfluid helium ,hexatic liquid crystal s. Topological defects in the XY model leads to avortex-unbinding transition from the low-temperature phase to the high-temperaturedisordered phase . In two dimensions the XY model exhibits aKosterlitz-Thouless transition from the disordered high-temperature phase into the quasi-long range ordered low-temperature phase.ee also
*
Goldstone boson
*Ising model
*Potts model
*Kosterlitz-Thouless transition
*Topological defect
*superfluid film References
* Evgeny Demidov, " [http://ibiblio.org/e-notes/Perc/xy.htm Vorteces
[sic] in the XY model] " (2004)
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