arXiv:2404.11501 Abstract | arXiv Analytics

arXiv:2404.11501 [hep-th]Abstract References Reviews Resources

Solving the Yang-Baxter, tetrahedron and higher simplex equations using Clifford algebras

Published 2024-04-17Version 1

Bethe Ansatz was discoverd in 1932. Half a century later its algebraic structure was unearthed: Yang-Baxter equation was discovered, as well as its multidimensional generalizations [tetrahedron equation and $d$-simplex equations]. Here we describe a universal method to solve these equations using Clifford algebras. The Yang-Baxter equation ($d=2$), Zamalodchikov's tetrahedron equation ($d=3$) and the Bazhanov-Stroganov equation ($d=4$) are special cases. Our solutions form a linear space. This helps us to include spectral parameters. Potential applications are discussed.

Comments: 58 pages, Includes Mathematica codes for verifying the solutions

Categories: hep-th, cond-mat.stat-mech, math-ph, math.MP, quant-ph

Keywords: higher simplex equations, clifford algebras, yang-baxter equation, zamalodchikovs tetrahedron equation, linear space

Related articles: Most relevant | Search more

arXiv:2410.20328 [hep-th] (Published 2024-10-27)

Majorana fermions solve the tetrahedron equations as well as higher simplex equations

Pramod Padmanabhan, Vladimir Korepin

arXiv:2306.10423 [hep-th] (Published 2023-06-17)

All regular $4 \times 4$ solutions of the Yang-Baxter equation

Luke Corcoran, Marius de Leeuw

arXiv:1012.2568 [hep-th] (Published 2010-12-12)

Linear space of spinor monomials and realization of the Nambu-Goldstone fermion in the Volkov-Akulov and Komargodski-Seiberg Lagrangians