Star products on graded manifolds and [alpha]'-corrections to Courant algebroids from string theory

Courant algebroids, originally used to study integrability conditions for Dirac structures, have turned out to be of central importance to study the effective supergravity limit of string theory. The search for a geometric description of T-duality leads to Double Field Theory (DFT), whose gauge algebra is governed by the C-bracket, a generalization of the Courant bracket in the sense that it reduces to the latter by solving a specific constraint. Recently, in DFT deformations of the C-bracket and O(d, d)-invariant bilinear form to first order in the closed string sigma model coupling, ... were derived by analyzing the transformation properties of the Neveu-Schwarz B-field. By choosing a particular Poisson structure on the Drinfel'd double corresponding to the Courant algebroid structure of the generalized tangent bundle, we are able to interpret the Cbracket and bilinear form in terms of Poisson brackets. As a result, we reproduce the ...- deformations for a specific solution to the strong constraint of DFT as expansion of a graded version of the Moyal-Weyl star product. (ProQuest: ... denotes formulae/symbols omitted.)