XY model: Difference between revisions

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The XY model, also known as the O(2) model because of its symmetry group, is a Heisenberg ferromagnetic with an easy-plane anisotropy. The Hamiltonian is given by

${\displaystyle H=-J{\sum }_{\langle i,j\rangle }\mathbf {S} _{i}\cdot \mathbf {S} _{j}}$

in other words

${\displaystyle H=-J{\sum }_{\langle i,j\rangle }\cos(\theta _{i}-\theta _{j})}$

where the sum runs over all pairs of nearest neighbour spins, ${\displaystyle \mathbf {S} }$, and where ${\displaystyle J}$ is the coupling constant.

Random field XY model (RFXY)[edit]

XY universality class[edit]

(see: XY universality class)

See also[edit]

• Heisenberg model
• Kosterlitz-Thouless transition
• RP(n-1) model

References[edit]

Related reading

• L.A.S. Mól, A.R. Pereira, H. Chamati and S. Romano "Monte Carlo study of 2D generalized XY-models", European Physical Journal B 50 pp. 541-548 (2006)
• Dhagash Mehta, Ciaran Hughes, Mario Schröck and David J. Wales "Potential energy landscapes for the 2D XY model: Minima, transition states, and pathways", Journal of Chemical Physics 139 194503 (2013)
• D. Mehta, C. Hughes, M. Kastner and D. J. Wales "Potential energy landscape of the two-dimensional XY model: Higher-index stationary points", Journal of Chemical Physics 140 224503 (2014)