Projects per year
Abstract
The exceptional Drinfel'd algebra (EDA) is a Leibniz algebra introduced to provide an algebraic underpinning with which to explore generalised notions of U-duality in M-theory. In essence it provides an M-theoretic analogue of the way a Drinfel'd double encodes generalised T-dualities of strings. In this note we detail the construction of the EDA in the case where the regular U-duality group is $E_{6(6)}$. We show how the EDA can be realised geometrically as a generalised Leibniz parallelisation of the exceptional generalised tangent bundle for a six-dimensional group manifold $G$, endowed with a Nambu-Lie structure. When the EDA is of coboundary type, we show how a natural generalisation of the classical Yang-Baxter equation arises. The construction is illustrated with a selection of examples including some which embed Drinfel'd doubles and others that are not of this type.
Original language | English |
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Article number | 20 |
Number of pages | 28 |
Journal | JHEP |
Volume | 2021 |
Issue number | 1 |
DOIs | |
Publication status | Published - 5 Jan 2021 |
Bibliographical note
27 pagesKeywords
- hep-th
- gr-qc
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SRP8: Strategic Research Programme: High-Energy Physics at the VUB
D'Hondt, J., Van Eijndhoven, N., Craps, B. & Buitink, S.
1/11/12 → 31/10/24
Project: Fundamental
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FWOAL903: Duality, Geometry and Spacetime
Sevrin, A., Blair, C. & Thompson, D.
1/01/19 → 31/12/22
Project: Fundamental