nLab generalized Spin(7)-manifold

Contents

Idea

A generalized Spin(7)-structure on an 8-manifold $X$ is a reduction of the structure group of the generalized tangent bundle $T X \oplus T^\ast X$ along the inclusion of the direct product group of two copies of Spin(7) into the spin-Narain group, along

Spin(7) \times Spin(7) \longrightarrow Spin(8,8) \,.

This generalizes the reduction of the plain tangent bundle along the inclusion of Spin(7) into Spin(8)

Spin(7) \hookrightarrow Spin(8)

which goes with Spin(7)-manifolds, whence the name.

The concept was maybe first considered in

Frederik Witt, section 5 of Generalised $G_2$ -manifolds, Commun.Math.Phys. 265 (2006) 275-303 (arXiv:math/0411642)

Further discussion includes

Dimitrios Tsimpis, section 4.1. of M-theory on eight-manifolds revisited: $N=1$ supersymmetry and generalized $Spin(7)$ structures, JHEP 0604 (2006) 027 (arXiv:hep-th/0511047)
Mariana Graña, Carlos S. Shahbazi, Marco Zambon, Spin(7)-manifolds in compactifications to four dimensions, High Energ. Phys. (2014) 2014: 46 (arXiv:1405.3698)

Last revised on April 15, 2023 at 08:51:36. See the history of this page for a list of all contributions to it.