T-duality and closed string non-commutative (doubled) geometry
Abstract
We provide some evidence that closed string coordinates will become non-commutative turning on H-field flux background in closed string compactifications. This is in analogy to open string non-commutativity on the world volume of D-branes with B- and F-field background. The class of 3-dimensional backgrounds we are studying are twisted tori (fibrations of a 2-torus over a circle) and the their T-dual H-field, 3-form flux backgrounds (T-folds). The spatial non-commutativity arises due to the non-trivial monodromies of the toroidal Kahler resp. complex structure moduli fields, when going around the closed string along the circle direction. In addition we study closed string non-commutativity in the context of doubled geometry, where we argue that in general a non-commutative closed string background is T-dual to a commutative closed string background and vice versa. Finally, in analogy to open string boundary conditions, we also argue that closed string momentum and winding modes define in some sense D-branes in closed string doubled geometry.
Keywords
Cite
@article{arxiv.1010.1361,
title = {T-duality and closed string non-commutative (doubled) geometry},
author = {Dieter Lust},
journal= {arXiv preprint arXiv:1010.1361},
year = {2011}
}
Comments
31 pages, references added, extended version contains new sections 3.3., 3.4 and 4