The graded Hori map has been recently introduced by Han-Mathai in the context of T-duality as a Z-graded transform whose homogeneous components are the Hori-Fourier transforms in twisted cohomology associated with integral multiples of a basic pair of T-dual closed 3-forms. We show how in the rational homotopy theory approximation of T-duality, such a map is naturally realized as a pull-iso-push transform, where the isomorphism part corresponds to the canonical equivalence between the left and the right gerbes associated with a T-duality configuration.
A very short note on the (rational) graded Hori map / Coloma, Mattia; Fiorenza, Domenico; Landi, Eugenio. - In: COMMUNICATIONS IN ALGEBRA. - ISSN 0092-7872. - 50:5(2022), pp. 2250-2263. [10.1080/00927872.2021.2005076]
A very short note on the (rational) graded Hori map
Domenico Fiorenza;Eugenio Landi
2022
Abstract
The graded Hori map has been recently introduced by Han-Mathai in the context of T-duality as a Z-graded transform whose homogeneous components are the Hori-Fourier transforms in twisted cohomology associated with integral multiples of a basic pair of T-dual closed 3-forms. We show how in the rational homotopy theory approximation of T-duality, such a map is naturally realized as a pull-iso-push transform, where the isomorphism part corresponds to the canonical equivalence between the left and the right gerbes associated with a T-duality configuration.| File | Dimensione | Formato | |
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