1996
DOI: 10.1016/0370-2693(96)00025-1
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Poisson-Lie T-duality and loop groups of Drinfeld doubles

Abstract: A duality invariant first order action is constructed on the loop group of a Drinfeld double. It gives at the same time the description of both of the pair of σ-models related by Poisson-Lie T-duality. Remarkably, the action contains a WZW-term on the Drinfeld double not only for conformally invariant σ-models. The resulting actions of the models from the dual pair differ just by a total derivative corresponding to an ambiguity in specifying a two-form whose exterior derivative is the WZW three-form. This tota… Show more

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Cited by 228 publications
(423 citation statements)
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“…Starting from the model on the Drinfel'd double D [37,38] with D ≡ G C we identified a class of subgroups G 0 ⊂ G with respect to which it is possible to dualise. The corresponding Lie algebras g 0 = Lie(G 0 ) are constructed by picking a subset of the Cartan generators of G C along with the associated roots.…”
Section: Discussionmentioning
confidence: 99%
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“…Starting from the model on the Drinfel'd double D [37,38] with D ≡ G C we identified a class of subgroups G 0 ⊂ G with respect to which it is possible to dualise. The corresponding Lie algebras g 0 = Lie(G 0 ) are constructed by picking a subset of the Cartan generators of G C along with the associated roots.…”
Section: Discussionmentioning
confidence: 99%
“…In order to answer these questions we work with the first-order action on a Drinfel'd double D [37,38] and its generalisation to coset spaces [42,43]. As a vector space, the Lie algebra of the Drinfel'd double d = Lie(D) can be decomposed as…”
Section: Jhep11(2017)014mentioning
confidence: 99%
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“…Eq. (8) can be explicitely solved in that case [6,11] for the matrix E ij . If G is connected and simply connected, any cocycle on G (the Lie algebra of G) with values in G ⊗ G can be integrated to a cocycle in G with values in G ⊗ G. Given the cocommutator δ K on G, we denote by Π R : G → G ⊗ G the corresponding cocycle in G. It satisfies the relation…”
Section: Su(2) σ-Modelmentioning
confidence: 99%