English

Consistent truncations to 3-dimensional supergravity

High Energy Physics - Theory 2022-09-21 v1 General Relativity and Quantum Cosmology

Abstract

We show how to construct consistent truncations of 10-/11-dimensional supergravity to 3-dimensional gauged supergravity, preserving various amounts of supersymmetry. We show, that as in higher dimensions, consistent truncations can be defined in terms of generalised GG-structures in Exceptional Field Theory, with GE8(8)G \subset E_{8(8)} for the 3-dimensional case. Differently from higher dimensions, the generalised Lie derivative of E8(8)E_{8(8)} Exceptional Field Theory requires a set of "covariantly constrained" fields to be well-defined, and we show how these can be constructed from the GG-structure itself. We prove several general features of consistent truncations, allowing us to rule out a higher-dimensional origin of many 3-dimensional gauged supergravities. In particular, we show that the compact part of the gauge group can be at most SO(9)\mathrm{SO}(9) and that there are no consistent truncations on a 7-or 8-dimensional product of spheres such that the full isometry group of the spheres is gauged. Moreover, we classify which matter-coupled N4{\cal N} \geq 4 gauged supergravities can arise from consistent truncations. Finally, we give several examples of consistent truncations to three dimensions. These include the truncations of IIA and IIB supergravity on S7S^7 leading to two different N=16{\cal N}=16 gauged supergravites, as well as more general IIA/IIB truncations on Hp,7pH^{p,7-p}. We also show how to construct consistent truncations on compactifications of IIB supergravity on S5S^5 fibred over a Riemann surface. These result in 3-dimensional N=4{\cal N}=4 gauged supergravities with scalar manifold M=SO(6,4)SO(6)×SO(4)×SU(2,1)S(U(2)×U(1)){\cal M} = \frac{\mathrm{SO}(6,4)}{\mathrm{SO}(6) \times \mathrm{SO}(4)} \times \frac{\mathrm{SU}(2,1)}{\mathrm{S}(\mathrm{U}(2)\times\mathrm{U}(1))} with a ISO(3)×U(1)4\mathrm{ISO}(3)\times\mathrm{U}(1)^4 gauging and for hyperboloidal Riemann surfaces contain N=(2,2){\cal N}=(2,2) AdS3_3 vacua.

Keywords

Cite

@article{arxiv.2206.03507,
  title  = {Consistent truncations to 3-dimensional supergravity},
  author = {Michele Galli and Emanuel Malek},
  journal= {arXiv preprint arXiv:2206.03507},
  year   = {2022}
}

Comments

33 pages plus appendix

R2 v1 2026-06-24T11:42:36.530Z