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Division Algebras and Supersymmetry III

Published 16 Sep 2011 in hep-th, math.CT, math.DG, and math.RA | (1109.3574v3)

Abstract: Recent work applying higher gauge theory to the superstring has indicated the presence of higher symmetry'. Infinitesimally, this is realized by aLie 2-superalgebra' extending the Poincare superalgebra in precisely the dimensions where the classical supersymmetric string makes sense: 3, 4, 6 and 10. In the previous paper in this series, we constructed this Lie 2-superalgebra using the normed division algebras. In this paper, we use an elegant geometric technique to integrate this Lie 2-superalgebra to a Lie 2-supergroup' extending the Poincare supergroup in the same dimensions. Briefly, aLie 2-superalgebra' is a two-term chain complex with a bracket like a Lie superalgebra, but satisfying the Jacobi identity only up to chain homotopy. Simple examples of Lie 2-superalgebras arise from 3-cocycles on Lie superalgebras, and it is in this way that we constructed the Lie 2-superalgebra above. Because this 3-cocycle is supported on a nilpotent subalgebra, our geometric technique applies, and we obtain a Lie 2-supergroup integrating the Lie 2-superalgebra in the guise of a smooth 3-cocycle on the Poincare supergroup.

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