Supersymmetric $dS_n$ solutions for $n \geq 5$ in $D=11$ supergravity

TL;DR

This paper classifies supersymmetric warped de Sitter solutions in eleven-dimensional supergravity for dimensions 5 to 10, revealing that higher-dimensional solutions are trivial or flat, and providing a detailed characterization of lower-dimensional cases.

Contribution

It provides necessary and sufficient conditions for supersymmetric warped $dS_n$ solutions in $D=11$ supergravity without assuming Killing spinor factorization, and classifies solutions for $n=5,6$.

Findings

All solutions for $7 \,\leq n \leq 10$ are flat with vanishing 4-form.

The only $dS_6$ solutions are either $AdS_7 \times S^4$ or flat with hyperKahler space.

Supersymmetric $dS_5$ solutions correspond to generalized M5-brane configurations with hyperKahler transverse space.

Abstract

We determine the necessary and sufficient conditions for warped product $dS_n$ solutions, $5 \leq n \leq 10$, to preserve supersymmetry in $D=11$ supergravity, without assuming factorization of the Killing spinors. We prove that for $7 \leq n \leq 10$, all such solutions are flat, with vanishing 4-form. We also show that the only warped product $dS_6$ solutions are either the maximally supersymmetric $AdS_7 \times S^4$ solution, or $\mathbb{R}^{1,6} \times N_4$ where $N_4$ is hyperKahler, with vanishing 4-form. Supersymmetric warped product $dS_5$ solutions are then classified; it is shown that all such solutions are generalized M5-brane configurations, for which the transverse space is $\mathbb{R} \times N_4$, and $N_4$ is a hyperKahler manifold. If the 4-form is covariantly constant, then $N_4$ admits a hyperKahler potential.