Quandles as pre-Lie skew braces, set-theoretic Hopf algebras & universal R-matrices
- Resource Type
- Working Paper
- Authors
- Doikou, Anastasia; Rybolowicz, Bernard; Stefanelli, Paola
- Source
- J. Phys. A: Math. Theor. 57 405203, 2024
- Subject
- Mathematics - Quantum Algebra
Mathematical Physics
Mathematics - Rings and Algebras
- Language
We present connections between left non-degenerate solutions of the set-theoretic braid equation and left shelves using Drinfel'd homomorphisms. We generalize the notion of affine quandle, by using heap endomorphisms and metahomomorphisms, and identify the underlying Yang-Baxter algebra for solutions of the braid equation associated to a given quandle. We introduce the notion of the pre-Lie skew brace and identify certain affine quandles that give rise to pre-Lie skew braces. Generalisations of the braiding of a group, associated to set-theoretic solutions of the braid equation are also presented. These generalized structures encode part of the underlying Hopf algebra. We then introduce the quasi-triangular (quasi) Hopf algebras and universal R-matrices for rack and set-theoretic algebras. Generic set-theoretic solutions coming from heap endomorphisms are also identified.
Comment: 36 pages LaTex. Some general comments added in the introduction section. Minor typos corrected