Classification of quasi-trigonometric solutions of the classical Yang-Baxter equation

We study right-invariant (respectively, left-invariant) Poisson quasi-Nijenhuis structures on a Lie group [Formula: see text] and introduce their infinitesimal counterpart, the so-called r-qn structures on the corresponding Lie algebra [Formula: see text]. We investigate the procedure of the classification of such structures on the Lie algebras and then for clarity of our results we classify, up to a natural equivalence, all [Formula: see text]-[Formula: see text] structures on two types of four-dimensional real Lie algebras. We mention some remarks on the relation between [Formula: see text]-[Formula: see text] structures and the generalized complex structures on the Lie algebras [Formula: see text] and also the solutions of modified Yang–Baxter equation (MYBE) on the double of Lie bialgebra [Formula: see text]. The results are applied to some relevant examples.

Download Full-text

Yang-Baxter and the Boost: splitting the difference

SciPost Physics ◽

10.21468/scipostphys.11.3.069 ◽

2021 ◽

Vol 11 (3) ◽

Author(s):

Marius de Leeuw ◽

Chiara Paletta ◽

Anton Pribytok ◽

Ana L. Retore ◽

Paul Ryan

Keyword(s):

Hilbert Space ◽

Sigma Model ◽

Spin Chains ◽

Baxter Equation ◽

Regular Solutions ◽

One Dimensional ◽

Difference Form ◽

The Difference ◽

The One

In this paper we continue our classification of regular solutions of the Yang-Baxter equation using the method based on the spin chain boost operator developed in [1]. We provide details on how to find all non-difference form solutions and apply our method to spin chains with local Hilbert space of dimensions two, three and four. We classify all 16\times1616×16 solutions which exhibit \mathfrak{su}(2)\oplus \mathfrak{su}(2)𝔰𝔲(2)⊕𝔰𝔲(2) symmetry, which include the one-dimensional Hubbard model and the SS-matrix of the {AdS}_5 \times {S}^5AdS5×S5 superstring sigma model. In all cases we find interesting novel solutions of the Yang-Baxter equation.

Download Full-text

Classification of indecomposable involutive set-theoretic solutions to the Yang–Baxter equation

Forum Mathematicum ◽

10.1515/forum-2019-0274 ◽

2020 ◽

Vol 32 (4) ◽

pp. 891-903

Author(s):

Wolfgang Rump

Keyword(s):

Fundamental Group ◽

Additive Group ◽

Baxter Equation ◽

Adjoint Orbit

AbstractUsing the theory of cycle sets and braces, non-degenerate indecomposable involutive set-theoretic solutions to the Yang–Baxter equation are classified in terms of their universal coverings and their fundamental group. The universal coverings are characterized as braces with an adjoint orbit generating the additive group. Using this description, all coverings of non-degenerate indecomposable cycle sets are classified. The method is illustrated by examples.

Download Full-text

Weak Hopf Algebra and Its Quiver Representation

Mathematical Problems in Engineering ◽

10.1155/2021/1483371 ◽

2021 ◽

Vol 2021 ◽

pp. 1-8

Author(s):

Muhammad Naseer Khan ◽

Ahmed Munir ◽

Muhammad Arshad ◽

Ahmed Alsanad ◽

Suheer Al-Hadhrami

Keyword(s):

Dynamical Systems ◽

Hopf Algebra ◽

Canonical Representation ◽

Weak Hopf Algebra ◽

Baxter Equation ◽

Quiver Representation ◽

Module Theory ◽

Cayley Digraph

This study induced a weak Hopf algebra from the path coalgebra of a weak Hopf quiver. Moreover, it gave a quiver representation of the said algebra which gives rise to the various structures of the so-called weak Hopf algebra through the quiver. Furthermore, it also showed the canonical representation for each weak Hopf quiver. It was further observed that a Cayley digraph of a Clifford monoid can be embedded in its corresponding weak Hopf quiver of a Clifford monoid. This lead to the development of the foundation structures of weak Hopf algebra. Such quiver representation is useful for the classification of its path coalgebra. Additionally, some structures of module theory of algebra were also given. Such algebras can also be applied for obtaining the solutions of “quantum Yang–Baxter equation” that has many applications in the dynamical systems for finding interesting results.

Download Full-text

Asymmetric product of left braces and simplicity; new solutions of the Yang–Baxter equation

Communications in Contemporary Mathematics ◽

10.1142/s0219199718500426 ◽

2019 ◽

Vol 21 (08) ◽

pp. 1850042 ◽

Cited By ~ 4

Author(s):

D. Bachiller ◽

F. Cedó ◽

E. Jespers ◽

J. Okniński

Keyword(s):

Multiplicative Group ◽

Baxter Equation ◽

Derived Length

The problem of constructing all the non-degenerate involutive set-theoretic solutions of the Yang–Baxter equation (YBE) recently has been reduced to the problem of describing all the left braces. In particular, the classification of all finite left braces is fundamental in order to describe all finite such solutions of the YBE. In this paper, we continue the study of finite simple left braces with the emphasis on the application of the asymmetric product of left braces in order to construct new classes of simple left braces. We do not only construct new classes but also we interpret all previously known constructions as asymmetric products. Moreover, a construction is given of finite simple left braces with a multiplicative group that is solvable of arbitrary derived length.

Download Full-text

Parameter-dependent associative Yang–Baxter equations and Poisson brackets

International Journal of Geometric Methods in Modern Physics ◽

10.1142/s0219887814600366 ◽

2014 ◽

Vol 11 (09) ◽

pp. 1460036 ◽

Cited By ~ 3

Author(s):

Alexander Odesskii ◽

Vladimir Rubtsov ◽

Vladimir Sokolov

Keyword(s):

General Class ◽

Baxter Equation ◽

Poisson Brackets ◽

Poisson Structures ◽

One Dimensional ◽

All Solutions ◽

Parameter Dependent

We discuss associative analogues of classical Yang–Baxter equation (CYBE) meromorphically dependent on parameters. We discover that such equations enter in a description of a general class of parameter-dependent Poisson structures and double Lie and Poisson structures in sense of Van den Bergh. We propose a classification of all solutions for one-dimensional associative Yang–Baxter equations (AYBE).

Download Full-text

Classification of constant solutions of the associative Yang-Baxter equation on Mat3

Theoretical and Mathematical Physics ◽

10.1007/s11232-013-0096-z ◽

2013 ◽

Vol 176 (3) ◽

pp. 1156-1162 ◽

Cited By ~ 2

Author(s):

V. V. Sokolov

Keyword(s):

Baxter Equation

Download Full-text

Classification of eight-vertex solutions of the coloured Yang - Baxter equation

Journal of Physics A General Physics ◽

10.1088/0305-4470/29/9/035 ◽

1996 ◽

Vol 29 (9) ◽

pp. 2259-2277 ◽

Cited By ~ 10

Author(s):

Shi-kun Wang

Keyword(s):

Baxter Equation

Download Full-text

Braiding quantum gates from partition algebras

Quantum ◽

10.22331/q-2020-08-27-311 ◽

2020 ◽

Vol 4 ◽

pp. 311

Author(s):

Pramod Padmanabhan ◽

Fumihiko Sugino ◽

Diego Trancanelli

Keyword(s):

Statistical Mechanics ◽

Braid Group ◽

Quantum Gates ◽

Entangled States ◽

Baxter Equation ◽

Classical Communication ◽

Qubit System ◽

Partition Algebras

Unitary braiding operators can be used as robust entangling quantum gates. We introduce a solution-generating technique to solve the (d,m,l)-generalized Yang-Baxter equation, for m/2≤l≤m, which allows to systematically construct such braiding operators. This is achieved by using partition algebras, a generalization of the Temperley-Lieb algebra encountered in statistical mechanics. We obtain families of unitary and non-unitary braiding operators that generate the full braid group. Explicit examples are given for a 2-, 3-, and 4-qubit system, including the classification of the entangled states generated by these operators based on Stochastic Local Operations and Classical Communication.

Download Full-text