Supersymmetric Backgrounds, the Killing Superalgebra, and Generalised Special Holonomy

Abstract

We prove that, for M theory or type II, generic Minkowski flux backgrounds preserving N supersymmetries in dimensions D≥4 correspond precisely to integrable generalised GN structures, where GN is the generalised structure group defined by the Killing spinors. In other words, they are the analogues of special holonomy manifolds in Ed(d) ×R+ generalised geometry. In establishing this result, we introduce the Kosmann-Dorfman bracket, a generalisation of Kosmann's Lie derivative of spinors. This allows us to write down the internal sector of the Killing superalgebra, which takes a rather simple form and whose closure is the key step in proving the main result. In addition, we find that the eleven-dimensional Killing superalgebra of these backgrounds is necessarily the supertranslational part of the N-extended super-Poincar\'e algebra.