English

Factorization in the multirefined tangent method

Mathematical Physics 2023-08-25 v1 Statistical Mechanics math.MP

Abstract

When applied to statistical systems showing an arctic curve phenomenon, the tangent method assumes that a modification of the most external path does not affect the arctic curve. We strengthen this statement and also make it more concrete by observing a factorization property: if Zn+kZ^{}_{n+k} denotes a refined partition function of a system of n+kn+k non-crossing paths, with the endpoints of the kk most external paths possibly displaced, then at dominant order in nn, it factorizes as Zn+kZnZkoutZ^{}_{n+k} \simeq Z^{}_{n} Z_k^{\rm out} where ZkoutZ_k^{\rm out} is the contribution of the kk most external paths. Moreover if the shape of the arctic curve is known, we find that the asymptotic value of ZkoutZ_k^{\rm out} is fully computable in terms of the large deviation function LL introduced in \cite{DGR19} (also called Lagrangean function). We present detailed verifications of the factorization in the Aztec diamond and for alternating sign matrices by using exact lattice results. Reversing the argument, we reformulate the tangent method in a way that no longer requires an extension of the domain, and which reveals the hidden role of the LL function. As a by-product, the factorization property provides an efficient way to conjecture the asymptotics of multirefined partition functions.

Cite

@article{arxiv.2105.02257,
  title  = {Factorization in the multirefined tangent method},
  author = {Bryan Debin and Philippe Ruelle},
  journal= {arXiv preprint arXiv:2105.02257},
  year   = {2023}
}

Comments

28 pages, 8 figures

R2 v1 2026-06-24T01:48:52.459Z