论文信息 - Geometric algebra and M-theory compactifications

Geometric algebra and M-theory compactifications

We show how supersymmetry conditions for flux compactifications of supergravity and string theory can be described in terms of a flat subalgebra of the Kahler-Atiyah algebra of the compactification space, a description which has wide-ranging applications. As a motivating example, we consider the most general M-theory compactifications on eight-manifolds down to AdS3 spaces which preserve N=2 supersymmetry in 3 dimensions. We also give a brief sketch of the lift of such equations to the cone over the compactification space and of the geometric algebra approach to `constrained generalized Killing pinors', which forms the technical and conceptual core of our investigation.

E. Babalic | C. Lazaroiu

[1] E. Babalic,et al. REVISITING EIGHT-MANIFOLD FLUX COMPACTIFICATIONS OF M-THEORY USING GEOMETRIC ALGEBRA TECHNIQUES , 2013, 1301.5106.

[2] E. Babalic,et al. Geometric algebra techniques in flux compactifications (II) , 2012, 1212.6918.

[3] A. Trautman. Connections and the Dirac operator on spinor bundles , 2008 .

[4] Kasper Peeters,et al. Introducing Cadabra: a symbolic computer algebra system for field theory problems , 2007, hep-th/0701238.

[5] D. Alekseevsky,et al. Polyvector Super-Poincaré Algebras , 2003, hep-th/0311107.

[6] K. Becker,et al. M theory on eight manifolds , 1996, hep-th/9605053.

[7] Pierre Cartier,et al. The algebraic theory of spinors and Clifford algebras , 1996 .

[8] D. Alekseevsky,et al. Classification of N-(Super)-Extended Poincaré Algebras and Bilinear Invariants of the Spinor Representation of Spin (p,q) , 1995, math/9511215.

[9] Christian Bär. Real Killing spinors and holonomy , 1993 .

[10] E. Bolinder,et al. Clifford numbers and spinors : with Riesz's private lectures to E. Folke Bolinder and a historical review by Pertti Lounesto , 1993 .