Hopf Algebras, Quantum Groups and Yang-Baxter Equations 2016

A special issue of Axioms (ISSN 2075-1680).

Deadline for manuscript submissions: closed (31 December 2016) | Viewed by 8452

Special Issue Editor

Special Issue Information

Dear Colleagues,

The Yang-Baxter Equation first appeared in theoretical physics, in a paper of the Nobel laureate C.N. Yang, and in statistical mechanics, in R.J. Baxter's work. Later, it turned out that this equation plays a crucial role in: quantum groups, knot theory, braided categories, analysis of integrable systems, quantum mechanics, non-commutative descent theory, quantum computing, non-commutative geometry, etc.

Many scientists have used the axioms of various algebraic structures (quasitriangular Hopf algebras, Yetter-Drinfeld categories, Lie (super)algebras, algebra structures, Boolean algebras, brace structures, relations on sets, etc.) or computer calculations in order to produce solutions for the Yang-Baxter Equation. However, the full classification of its solutions remains an open problem.

Contributions related to the various aspects of the Yang-Baxter Equation, the related algebraic structures, and their applications are invited. We would like to gather together relevant reviews, research articles, and communications.

Dr. Florin Felix Nichita
Guest Editor

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Keywords

  • Yang-Baxter equation
  • quantum groups
  • link invariants
  • virtual knot theory
  • set-theoretical Yang-Baxter equation
  • brace structure
  • quasitriangular Hopf algebra
  • braid group
  • braided category
  • classical Yang-Baxter equation
  • Myhill-Nerode monoid
  • Yang-Baxter system

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Published Papers (2 papers)

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Research

463 KiB  
Article
Cuntz Semigroups of Compact-Type Hopf C*-Algebras
by Dan Kučerovský
Axioms 2017, 6(1), 1; https://doi.org/10.3390/axioms6010001 - 4 Jan 2017
Cited by 2 | Viewed by 3784
Abstract
The classical Cuntz semigroup has an important role in the study of C*-algebras, being one of the main invariants used to classify recalcitrant C*-algebras up to isomorphism. We consider C*-algebras that have Hopf algebra structure, and find additional structure in their Cuntz semigroups. [...] Read more.
The classical Cuntz semigroup has an important role in the study of C*-algebras, being one of the main invariants used to classify recalcitrant C*-algebras up to isomorphism. We consider C*-algebras that have Hopf algebra structure, and find additional structure in their Cuntz semigroups. We show that in many cases, isomorphisms of Cuntz semigroups that respect this additional structure can be lifted to Hopf algebra (bi)isomorphisms, up to a possible flip of the co-product. This shows that the Cuntz semigroup provides an interesting invariant of C*-algebraic quantum groups. Full article
(This article belongs to the Special Issue Hopf Algebras, Quantum Groups and Yang-Baxter Equations 2016)
278 KiB  
Article
Quantum Quasigroups and the Quantum Yang–Baxter Equation
by Jonathan Smith
Axioms 2016, 5(4), 25; https://doi.org/10.3390/axioms5040025 - 9 Nov 2016
Cited by 3 | Viewed by 4115
Abstract
Quantum quasigroups are algebraic structures providing a general self-dual framework for the nonassociative extension of Hopf algebra techniques. They also have one-sided analogues, which are not self-dual. The paper presents a survey of recent work on these structures, showing how they furnish various [...] Read more.
Quantum quasigroups are algebraic structures providing a general self-dual framework for the nonassociative extension of Hopf algebra techniques. They also have one-sided analogues, which are not self-dual. The paper presents a survey of recent work on these structures, showing how they furnish various solutions to the quantum Yang–Baxter equation. Full article
(This article belongs to the Special Issue Hopf Algebras, Quantum Groups and Yang-Baxter Equations 2016)
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