English

The dimer and Ising models on Klein bottles

Mathematical Physics 2022-05-26 v2 math.MP

Abstract

We study the dimer and Ising models on a finite planar weighted graph with periodic-antiperiodic boundary conditions, i.e. a graph Γ\Gamma in the Klein bottle KK. Let Γmn\Gamma_{mn} denote the graph obtained by pasting mm rows and nn columns of copies of Γ\Gamma, which embeds in KK for nn odd and in the torus T2\mathbb{T}^2 for nn even. We compute the dimer partition function ZmnZ_{mn} of Γmn\Gamma_{mn} for nn odd, in terms of the well-known characteristic polynomial PP of Γ12T2\Gamma_{12}\subset\mathbb{T}^2 together with a new characteristic polynomial RR of ΓK\Gamma\subset K. Using this result together with work of Kenyon, Sun and Wilson [arXiv:1310.2603], we show that in the bipartite case, this partition function has the asymptotic expansion logZmn=mnf0/2+fsc+o(1)\log Z_{mn}=mn f_0/2 +\mathrm{fsc}+o(1), for m,nm, n tending to infinity and m/nm/n bounded below and above, where f0f_0 is the bulk free energy for Γ12T2\Gamma_{12}\subset\mathbb{T}^2 and fsc\mathrm{fsc} an explicit finite-size correction term. The remarkable feature of this later term is its universality: it does not depend on the graph Γ\Gamma, but only on the zeros of PP on the unit torus and on an explicit (purely imaginary) shape parameter. A similar expansion is also obtained in the non-bipartite case, assuming a conjectural condition on the zeros of PP. We then show that this asymptotic expansion holds for the Ising partition function as well, with fsc\mathrm{fsc} taking a particularly simple form: it vanishes in the subcritical regime, is equal to log(2)\log(2) in the supercritical regime, and to an explicit function of the shape parameter at criticality. These results are in full agreement with the conformal field theory predictions of Bl\"ote, Cardy and Nightingale.

Keywords

Cite

@article{arxiv.2010.11047,
  title  = {The dimer and Ising models on Klein bottles},
  author = {David Cimasoni},
  journal= {arXiv preprint arXiv:2010.11047},
  year   = {2022}
}

Comments

53 pages, 12 figures; minor changes in v2 following suggestions of referees; final version, to appear in Ann. Inst. Henri Poincar\'e D

R2 v1 2026-06-23T19:31:30.745Z