The topology of Double Field Theory

被引:0
作者
Falk Hassler
机构
[1] University of North Carolina,Department of Physics and Astronomy
来源
Journal of High Energy Physics | / 2018卷
关键词
Effective Field Theories; String Duality;
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摘要
We describe the doubled space of Double Field Theory as a group manifold G with an arbitrary generalized metric. Local information from the latter is not relevant to our discussion and so G only captures the topology of the doubled space. Strong Constraint solutions are maximal isotropic submanifold M in G. We construct them and their Generalized Geometry in Double Field Theory on Group Manifolds. In general, G admits different physical subspace M which are Poisson-Lie T-dual to each other. By studying two examples, we reproduce the topology changes induced by T-duality with non-trivial H-flux which were discussed by Bouwknegt, Evslin and Mathai [1].
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  • [41] Hull CM(2006)Generalised T-duality and non-geometric backgrounds JHEP 05 158-undefined
  • [42] Hull CM(2012)T-folds, doubled geometry and the SU(2) WZW model JHEP 06 5784-undefined
  • [43] Reid-Edwards RA(1993)Four-dimensional black holes in string theory Phys. Rev. D 48 046-undefined
  • [44] Hull CM(2001)Geometrical interpretation of D-branes in gauged WZW models JHEP 07 016-undefined
  • [45] Reid-Edwards RA(2016)Perturbative Double Field Theory on General Backgrounds Phys. Rev. D 93 064-undefined
  • [46] Dall’Agata G(2010)Background independent action for double field theory JHEP 07 075-undefined
  • [47] Prezas N(2013)The gauge structure of generalised diffeomorphisms JHEP 01 1700048-undefined
  • [48] Hull CM(2011)Frame-like Geometry of Double Field Theory J. Phys. A 44 1123-undefined
  • [49] Reid-Edwards RA(2009)T-duality, Generalized Geometry and Non-Geometric Backgrounds JHEP 04 080-undefined
  • [50] Scherk J.(2017)Spheres, generalised parallelisability and consistent truncations Fortsch. Phys. 65 095-undefined
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