E$_{6(6)}$ Exceptional Drinfel'd Algebras

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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 languageEnglish
Article number20
Number of pages28
JournalJHEP
Volume2021
Issue number1
DOIs
Publication statusPublished - 5 Jan 2021

Bibliographical note

27 pages

Keywords

  • hep-th
  • gr-qc

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