English

Lectures on the Spin and Loop $O(n)$ Models

Mathematical Physics 2019-07-04 v3 math.MP Probability

Abstract

The classical spin O(n)O(n) model is a model on a dd-dimensional lattice in which a vector on the (n1)(n-1)-dimensional sphere is assigned to every lattice site and the vectors at adjacent sites interact ferromagnetically via their inner product. Special cases include the Ising model (n=1n=1), the XY model (n=2n=2) and the Heisenberg model (n=3n=3). We discuss questions of long-range order and decay of correlations in the spin O(n)O(n) model for different combinations of the lattice dimension dd and the number of spin components nn. The loop O(n)O(n) model is a model for a random configuration of disjoint loops. We discuss its properties on the hexagonal lattice. The model is parameterized by a loop weight n0n\ge0 and an edge weight x0x\ge 0. Special cases include self-avoiding walk (n=0n=0), the Ising model (n=1n=1), critical percolation (n=x=1n=x=1), dimer model (n=1,x=n=1,x=\infty), proper 44-coloring (n=2,x=)n=2, x=\infty), integer-valued (n=2n=2) and tree-valued (integer n>=3n>=3) Lipschitz functions and the hard hexagon model (n=n=\infty). The object of study in the model is the typical structure of loops. We review the connection of the model with the spin O(n)O(n) model and discuss its conjectured phase diagram, emphasizing the many open problems remaining.

Keywords

Cite

@article{arxiv.1708.00058,
  title  = {Lectures on the Spin and Loop $O(n)$ Models},
  author = {Ron Peled and Yinon Spinka},
  journal= {arXiv preprint arXiv:1708.00058},
  year   = {2019}
}

Comments

71 pages, 11 figures; Various minor improvements to the text. The first version of these lectures was written for the School and Workshop on Random Interacting Systems at Bath, England, organized by Vladas Sidoravicius and Alexandre Stauffer in June 2016. To appear in "Sojourns in Probability Theory and Statistical Physics", celebrating Chuck Newman's 70th birthday

R2 v1 2026-06-22T21:02:49.951Z