Supersymmetric M3-branes and G2 Manifolds
Abstract
We obtain a generalisation of the original complete Ricci-flat metric of G2 holonomy on R4× S3 to a family with a non-trivial parameter λ. For generic λ the solution is singular, but it is regular when λ=-1,0,+1. The case λ=0 corresponds to the original G2 metric, and λ =-1,1 are related to this by an S3 automorphism of the SU(2)3 isometry group that acts on the S3× S3 principal orbits. We then construct explicit supersymmetric M3-brane solutions in D=11 supergravity, where the transverse space is a deformation of this class of G2 metrics. These are solutions of a system of first-order differential equations coming from a superpotential. We also find M3-branes in the deformed backgrounds of new G2-holonomy metrics that include one found by A. Brandhuber, J. Gomis, S. Gubser and S. Gukov, and show that they also are supersymmetric.
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