Search results for "Yang–Baxter equation"

showing 4 items of 4 documents

Left braces and the quantum Yang-Baxter equation

2019

[EN] Braces were introduced by Rump in 2007 as a useful tool in the study of the set-theoretic solutions of the Yang¿Baxter equation. In fact, several aspects of the theory of finite left braces and their applications in the context of the Yang¿Baxter equation have been extensively investigated recently. The main aim of this paper is to introduce and study two finite brace theoretical properties associated with nilpotency, and to analyse their impact on the finite solutions of the Yang¿Baxter equation.

BracesYang–Baxter equationGeneral MathematicsMathematics::Rings and Algebras010102 general mathematicsP-nilpotent groupYang-Baxter equationContext (language use)01 natural sciencesBraceAlgebraNonlinear Sciences::Exactly Solvable and Integrable SystemsMathematics::Quantum Algebra0103 physical sciences010307 mathematical physics0101 mathematicsMATEMATICA APLICADAQuantumMatemàticaMathematics
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The Structure Group and the Permutation Group of a Set-Theoretic Solution of the Quantum Yang–Baxter Equation

2021

We describe the left brace structure of the structure group and the permutation group associated to an involutive, non-degenerate set-theoretic solution of the quantum YangBaxter equation by using the Cayley graph of its permutation group with respect to its natural generating system. We use our descriptions of the additions in both braces to obtain new properties of the structure and the permutation groups and to recover some known properties of these groups in a more transparent way.

CombinatoricsSet (abstract data type)Cayley graphYang–Baxter equationGroup (mathematics)Mathematics::Quantum AlgebraGeneral MathematicsStructure (category theory)Permutation groupMatemàticaQuantumMathematicsMediterranean Journal of Mathematics
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Yang-Baxter equation and reflection equations in integrable models

1996

The definitions of the main notions related to the quantum inverse scattering methods are given. The Yang-Baxter equation and reflection equations are derived as consistency conditions for the factorizable scattering on the whole line and on the half-line using the Zamolodchikov-Faddeev algebra. Due to the vertex-IRF model correspondence the face model analogue of the ZF-algebra and the IRF reflection equation are written down as well as the $Z_2$-graded and colored algebra forms of the YBE and RE.

PhysicsHigh Energy Physics::TheoryReflection formulaReflection (mathematics)Integrable systemScatteringYang–Baxter equationMathematics::Quantum AlgebraInverse scattering problemLine (geometry)QuantumMathematical physics
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On finite involutive Yang–Baxter groups

2021

[EN] A group G is said to be an involutive Yang¿Baxter group, or simply an IYB-group, if it is isomorphic to the permutation group of an involutive, nondegenerate set-theoretic solution of the Yang-Baxter equation. We give new sufficient conditions for a group that can be factorised as a product of two IYB-groups to be an IYB-group. Some earlier results are direct consequences of our main theorem.

Yang–Baxter equationApplied MathematicsGeneral MathematicsYang-Baxter equationInvolutive nondegenerate solutionsInvolutive Yang-Baxter groupMATEMATICA APLICADAMatemàticaFinite left braceMathematical physicsMathematicsProceedings of the American Mathematical Society
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