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Poisson-Lie U-duality in exceptional field theory

Emanuel Malek, Daniel C. Thompson

2020Journal of High Energy Physics53 citationsDOIOpen Access PDF

Abstract

A bstract Poisson-Lie duality provides an algebraic extension of conventional Abelian and non-Abelian target space dualities of string theory and has seen recent applications in constructing quantum group deformations of holography. Here we demonstrate a natural upgrading of Poisson-Lie to the context of M-theory using the tools of exceptional field theory. In particular, we propose how the underlying idea of a Drinfeld double can be generalised to an algebra we call an exceptional Drinfeld algebra. These admit a notion of “maximally isotropic subalgebras” and we show how to define a generalised Scherk-Schwarz truncation on the associated group manifold to such a subalgebra. This allows us to define a notion of Poisson-Lie U-duality. Moreover, the closure conditions of the exceptional Drinfeld algebra define natural analogues of the cocycle and co-Jacobi conditions arising in Drinfeld double. We show that upon making a further coboundary restriction to the cocycle that an M-theoretic extension of Yang-Baxter deformations arise. We remark on the application of this construction as a solution-generating technique within supergravity.

Topics & Concepts

PhysicsAbelian groupDuality (order theory)Group (periodic table)Algebra over a fieldString theoryContext (archaeology)Pure mathematicsManifold (fluid mechanics)Theoretical physicsString (physics)T-dualityExtension (predicate logic)Field (mathematics)Quantum field theorySpace (punctuation)Algebraic structureAlgebraic numberQuantum groupClosure (psychology)String dualityAbelian extensionQuantumDual (grammatical number)Algebraic geometryVector spaceScheme (mathematics)M-theoryGroup theoryTruncation (statistics)Hopf algebraF-theoryS-dualitySymmetry groupCompactification (mathematics)Field theory (psychology)MathematicsNatural (archaeology)Derived categoryString field theoryHomotopy and Cohomology in Algebraic TopologyBlack Holes and Theoretical PhysicsAlgebraic structures and combinatorial models