Quasi-classical expansion of the star-triangle relation and integrable systems on quad-graphs

Bazhanov, Vladimir V.; Kels, Andrew P.; Сергеев, С. М.

doi:10.1088/1751-8113/49/46/464001

Cited by 38 publications

(116 citation statements)

References 92 publications

(194 reference statements)

Supporting

Mentioning

109

Contrasting

Unclassified

Order By: Relevance

“…For this reason, we are free to disregard the quiver diagram and keep only the zig-zag paths. 23 If we do this for the left figure of Figure 12 and deform the paths (while keeping the topology of the graph), we arrive at the right figure of Figure 12, which is very similar to the picture for the YBE (recall Figure 1). We can also represent the SSR and the YBE in terms of the zig-zag paths, as in Figures 14 and 15.…”

Section: Zig-zag Paths and R-chargementioning

confidence: 63%

Integrability as duality: The Gauge/YBE correspondence

Yamazaki

2020

Physics Reports

View full text Add to dashboard Cite

The Gauge/YBE correspondence states a surprising connection between solutions to the Yang-Baxter equation with spectral parameters and partition functions of supersymmetric quiver gauge theories. This correspondence has lead to systematic discoveries of new integrable models based on quantum-field-theory methods. We provide pedagogical introduction to the subject and summarizes many recent developments. This is a write-up of the lecture at the String-Math 2018 conference.August 15, 2018

show abstract

Section: Zig-zag Paths and R-chargementioning

confidence: 63%

Integrability as duality: The Gauge/YBE correspondence

Yamazaki

2020

Physics Reports

View full text Add to dashboard Cite

show abstract

“…For the previously studied cases of the quasi-classical limit of scalar solutions of the startriangle relation [15][16][17][18][19], the equation for the critical point of the latter relation was always found to be equivalent to a 3D-consistent integrable quad equation from the ABS classification [7,28]. This connection means that the star-triangle relation itself has a natural interpretation as being a quantum counterpart (in a path integral sense) of a discrete integrable equation.…”

Section: Quad Equation Interpretationmentioning

confidence: 92%

“…The quasi-classical limit of the IRF model is also considered in this paper. This is an important limit that connects integrable models of statistical mechanics [15][16][17][18][19], with discrete integrable systems that satisfy an integrability condition known as 3D-consistency [7,20,21]. Through this connection, the Yang-Baxter equation itself may be interpreted as a quantum counterpart of a discrete integrable equation, where the latter equation is identified as the equation of the saddle-point of the YBE.…”

Section: Vertexmentioning

confidence: 99%

“…In the quasi-classical limit, the fluctuating variables of the model are taken to approach a fixed ground state configuration, which is determined as the solution of a classical discrete integrable equation. For integrable models that satisfy a star-triangle relation, this limit has been found [15][16][17][18][19] to always lead to a classical discrete integrable equation in the Adler-Bobenko-Suris (ABS) classification [7,28], where the latter equations are equivalent to the equations of the critical point of the star-triangle relation. This correspondence has recently been extended to the entire ABS list, with the use of star-triangle relations that are based on hypergeometric integrals [18,19].…”

Section: Quasi-classical Expansion and Classical Discrete Integrable mentioning

confidence: 99%

“…Interestingly, the hyperbolic-and elliptic-type equations in (69), and (70), don't require a point transformation of the components of the corner variables x, u, y, v, in terms of hyperbolic or elliptic functions respectively, in order to go from the four-leg form (63), to the affine-linear form (71). Particularly, such a point transformation is typically always required for the scalar cases, in order to relate a 3D-consistent quad equation to a Yang-Baxter equation [18,19] (or even simply for a three-leg equation [7]). The equations (69), and (70), are curious in this respect, and are unlikely to arise from a counterpart multi-component Yang-Baxter equation.…”

Section: Further Examplesmentioning

confidence: 99%

See 2 more Smart Citations

Extended Z-Invariance for Integrable Vector and Face Models and Multi-component Integrable Quad Equations

Kels

2019

J Stat Phys

View full text Add to dashboard Cite

In a previous paper [1], the author has established an extension of the Z-invariance property for integrable edge-interaction models of statistical mechanics, that satisfy the star-triangle relation (STR) form of the Yang-Baxter equation (YBE). In the present paper, an analogous extended Z-invariance property is shown to also hold for integrable vector models and interaction-round-a-face (IRF) models of statistical mechanics respectively. As for the previous case of the STR, the Z-invariance property is shown through the use of local cubic-type deformations of a 2-dimensional surface associated to the models, which allow an extension of the models onto a subset of next nearest neighbour vertices of Z 3 , while leaving the partition functions invariant. These deformations are permitted as a consequence of the respective YBE's satisfied by the models. The quasi-classical limit is also considered, and it is shown that an analogous Z-invariance property holds for the variational formulation of classical discrete Laplace equations which arise in this limit. From this limit, new integrable 3D-consistent multi-component quad equations are proposed, which are constructed from a degeneration of the equations of motion for IRF Boltzmann weights.

show abstract

Continuum limit of fishnet graphs and AdS sigma model

Basso

Zhong

2019

J. High Energ. Phys.

View full text Add to dashboard Cite

We consider the continuum limit of 4d planar fishnet diagrams using integrable spin chain methods borrowed from the N = 4 Super-Yang-Mills theory. These techniques give us control on the scaling dimensions of single-trace operators for all values of the coupling constant in the fishnet theory. We use them to study the thermodynamical limit of the BMN operator corresponding to the spin chain ferromagnetic vacuum. We find that its scaling dimension exhibits a critical behaviour when the coupling constant approaches Zamolodchikov's critical coupling. Analysis close to that point suggests that the continuum limit of the fishnet graphs is controlled by the two-dimensional AdS 5 non-linear sigma model. More generally, we present evidence that the fishnet diagrams define an integrable lattice regularization of the AdS 5 model. A system of massless TBA equations is derived for the tachyon energy by dualizing the TBA equations of the weakly coupled planar N = 4 SYM theory.arXiv:1806.04105v1 [hep-th]

show abstract

Quasi-classical expansion of the star-triangle relation and integrable systems on quad-graphs

Cited by 38 publications

References 92 publications

Integrability as duality: The Gauge/YBE correspondence

Integrability as duality: The Gauge/YBE correspondence

Extended Z-Invariance for Integrable Vector and Face Models and Multi-component Integrable Quad Equations

Continuum limit of fishnet graphs and AdS sigma model

Contact Info

Product

Resources

About