Topological Spherical T-duality -- Dimension change from higher degree H-flux
Abstract
Topological Spherical T-duality was introduced by Bouwknegt, Evslin and Mathai in [BEM15] as an extension of topological T-duality from S1-bundles to SU(2)-bundles endowed with closed 7-forms. This notion was further extended to sphere bundles by Lind, Sati and Westerland [LSW16] as a duality between S2n-1-bundles endowed with closed (4n-1)-forms. We generalise this relation one step further and define T-duality for S2n-1-bundles endowed with closed odd forms of arbitrary degree. The degree of the form determines the dimension of the fibers of the dual spaces. We show that T-duals exist and, as in the previous cases, T-dual spaces have isomorphic twisted cohomology. We finish by introducing a version of Courant algebroids which is compatible with spherical T-duality.
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