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JOURNALS // Symmetry, Integrability and Geometry: Methods and Applications // Archive

SIGMA, 2021 Volume 17, 035, 30 pp. (Mi sigma1718)

This article is cited in 5 papers

Functional Relations on Anisotropic Potts Models: from Biggs Formula to the Tetrahedron Equation

Boris Bychkovab, Anton Kazakovabc, Dmitry Talalaevbca

a Centre of Integrable Systems, P.G. Demidov Yaroslavl State University, Sovetskaya 14, 150003, Yaroslavl, Russia
b Faculty of Mathematics, National Research University Higher School of Economics, Usacheva 6, 119048, Moscow, Russia
c Faculty of Mechanics and Mathematics, Moscow State University, 119991 Moscow, Russia

Abstract: We explore several types of functional relations on the family of multivariate Tutte polynomials: the Biggs formula and the star-triangle ($Y-\Delta$) transformation at the critical point $n=2$. We deduce the theorem of Matiyasevich and its inverse from the Biggs formula, and we apply this relation to construct the recursion on the parameter $n$. We provide two different proofs of the Zamolodchikov tetrahedron equation satisfied by the star-triangle transformation in the case of $n=2$ multivariate Tutte polynomial, we extend the latter to the case of valency 2 points and show that the Biggs formula and the star-triangle transformation commute.

Keywords: tetrahedron equation, local Yang–Baxter equation, Biggs formula, Potts model, Ising model.

MSC: 82B20, 16T25, 05C31

Received: July 6, 2020; in final form March 26, 2021; Published online April 7, 2021

Language: English

DOI: 10.3842/SIGMA.2021.035



Bibliographic databases:
ArXiv: 2005.10288


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