# nLab T-fold

Contents

### Context

#### Riemannian geometry

Riemannian geometry

duality

# Contents

## Idea

A T-fold (Hull 04) is supposed to be a kind of space that locally has charts which are Riemannian manifolds equipped with a B-field (i.e. a circle 2-bundle with connection or bundle gerbe with connection) but where the charts are glued together not just by diffeomorphisms (as an ordinary smooth manifold is) but also by T-duality transformations along some torus fibers.

The idea is that a T-fold is a target space for a string sigma-model that is only locally a Riemannian manifold but globally a more general kind of geometry, due due duality in string theory. In the literature sometimes the term non-geometric backgrounds is used for such “generalized geometric” backgrounds.

It is expected that T-folds should have a description in terms of spaces that locally are fiber products of one torus fiber bundle with its T-dual, as the correspondence spaces considered in topological T-duality. In the rational/infinitesimal approximation this is derived from analysis of super p-brane WZ-terms in FSS 16. A proposal for a (non-supersymmetric) global description of T-folds as total spaces of principal 2-bundles for the T-duality 2-group is in Nikolaus-Waldorf 18.

One may then consider local field theory on these double torus fibrations, and this should be closely related to what is called double field theory (Hull 06).

## References

The idea was originally introduced in

The relation to double field theory goes back to

Further developments are in

The local superspace supergeometry of T-folds is identified in