Spheres, generalised parallelisability and consistent truncations
Abstract
We show that generalised geometry gives a unified description of maximally supersymmetric consistent truncations of ten- and eleven-dimensional supergravity. In all cases the reduction manifold admits a "generalised parallelisation" with a frame algebra with constant coefficients. The consistent truncation then arises as a generalised version of a conventional Scherk-Schwarz reduction with the frame algebra encoding the embedding tensor of the reduced theory. The key new result is that all round-sphere geometries admit such generalised parallelisations with an frame algebra. Thus we show that the remarkable consistent truncations on , , and are in fact simply generalised Scherk-Schwarz reductions. This description leads directly to the standard non-linear scalar-field ansatze and as an application we give the full scalar-field ansatz for the type IIB truncation on .
Cite
@article{arxiv.1401.3360,
title = {Spheres, generalised parallelisability and consistent truncations},
author = {Kanghoon Lee and Charles Strickland-Constable and Daniel Waldram},
journal= {arXiv preprint arXiv:1401.3360},
year = {2014}
}
Comments
42 pages